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Geometry Geometry © Copyright, 2004 It is illegal to duplicate the contents of this manual under any circumstances. Authorization to use excerpts of the presentations and lectures for use in academic papers may be requested by writing to [email protected] The Institute for Montessori Education 37 Rockinghorse Road Christchurch 8062 New Zealand (643) 382-2023 Phone © Copyright, 2004 Page 2 Geometry Table of Contents I. Introduction .............................................................................................................. 6 Stories...................................................................................................................... 7 Why Study Geometry?............................................................................................. 9 II. Initial Presentations ............................................................................................... 13 Preliminary............................................................................................................. 14 “Geometry Cabinet” ............................................................................................... 15 Constructive Triangles – First Series..................................................................... 17 III. Congruency, Similarity and Equivalence ............................................................... 22 Congruency ........................................................................................................... 23 Similarity ................................................................................................................ 25 Equivalence ........................................................................................................... 27 Constructive Triangles – Second Series: Triangular and Two Hexagonal Boxes . 29 Equivalence with Metal Insets ............................................................................... 38 Equivalence with Pythagorean Insets.................................................................... 46 Pythagorean Theorem with Constructive Triangles............................................... 49 Pythagoras Three (Euclidean Logic) ..................................................................... 52 IV. Geometry Nomenclature........................................................................................ 57 Classified Nomenclatures ...................................................................................... 58 A) Fundamental Concepts ................................................................................. 60 B) Study of Lines ............................................................................................... 64 Positions of a Straight Line (space) ....................................................................... 66 Positions of a Straight Line on a Plane.................................................................. 68 Parts of a Straight Line .......................................................................................... 69 Parallel, Convergent & Divergent Lines................................................................. 70 Oblique and Perpendicular Lines........................................................................... 72 C) Study of Angles ............................................................................................. 73 Measuring Angles .................................................................................................. 75 Adjacent Angles..................................................................................................... 77 © Copyright, 2004 Page 3 Geometry Vertical Angles....................................................................................................... 78 Complementary Angles ......................................................................................... 80 Supplementary Angles........................................................................................... 81 Two Non-Parallel Lines Cut by a Transversal ....................................................... 82 Parallel Lines Cut by a Transversal ....................................................................... 83 D) Polygons ....................................................................................................... 86 E) Study of Triangles ......................................................................................... 88 Seven Triangles of Reality..................................................................................... 91 Triangle Nomenclature .......................................................................................... 92 Altitudes/Heights of Triangles ................................................................................ 93 Other Triangle Exercises ....................................................................................... 94 Nomenclature for the Right Angle Triangle............................................................ 96 F) Study of Quadrilaterals ................................................................................. 97 The Six Quadrilaterals of Reality ........................................................................... 98 The Trapezoid...................................................................................................... 101 G) Study of Polygons ....................................................................................... 102 Apothem .............................................................................................................. 103 Sum of the Angles of Plane Figures .................................................................... 104 Sum of the Angles of a Polygon Chart................................................................. 106 H) V. Study of The Circle ..................................................................................... 107 Area ..................................................................................................................... 112 Introduction .......................................................................................................... 113 Common Parallelogram ....................................................................................... 115 Triangles .............................................................................................................. 116 Right Angled Triangles ........................................................................................ 118 Obtuse Angled Triangles ..................................................................................... 120 Square ................................................................................................................. 122 Rhombus ............................................................................................................. 123 Trapezoid............................................................................................................. 126 Polygons .............................................................................................................. 128 © Copyright, 2004 Page 4 Geometry The Circle ............................................................................................................ 133 The Area of the Circle.......................................................................................... 137 The Area of the Sector......................................................................................... 140 Area of a Segment............................................................................................... 142 The Ellipsis (Ellipse) ............................................................................................ 144 The Tiling Game .................................................................................................. 148 VI. Volume................................................................................................................. 153 Volume................................................................................................................. 154 Volume of Other Figures –“Blue Solids” .............................................................. 158 Prisms.................................................................................................................. 159 Pyramids.............................................................................................................. 163 Solids of Rotation................................................................................................. 167 © Copyright, 2004 Page 5 Geometry I. Introduction © Copyright, 2004 Page 6 Geometry Stories A series of stories may be told to the six year old to generate interest. Source: “The Makers of Mathematics”, Chapter II “The Birth of Geometry and the Golden Age of Greek Mathematics.” How Geometry Got Its Name Picture a scene in ancient Egypt thousands of years ago. Life centered around the river Nile. The Nile River has been called the Mother of Geometry as well as the Mother of all Mathematics. For centuries the Nile overflowed its banks year by year and the floodwaters washed down the dark fertile mud of the nearby Abyssinian Mountains. The name Egypt is a Coptic word meaning “black earth”. So this black earth came down year after year covering up landmarks and forcing the Egyptians to make out their landholdings over and over again. Explain to students that the Egyptians were not interested in why it worked -- only that it produced the desired results. Presentation Demonstrate “Rope Measurement”. I need 3 slaves. “We are going to mark out our land also that it is the right size.” DEMONSTRATE. Ah! “This is where our land markings were!” The man who was in charge of the slaves was called a surveyor or harpedonapta. He was responsible for earth measurements in ancient Egypt. Thousands of years… See Thales pg 32 – 33 Some thirty-six years… See Pythagoras pg 37 – 42 © Copyright, 2004 Page 7 Geometry Our story of geometry… See pg 44 – 45 We have looked at four possible stories that could be told to the six year olds. There are others. Read the material and make up your own. © Copyright, 2004 Page 8 Geometry Why Study Geometry? The Historical Approach The teacher is searching for stories that create interest. There is an assumption that the child’s development follows the historical pattern of species’ development. Early humans through exploration discover how to satisfy their needs. Later they search for reason and rules that are based on their accumulated practical experiences and knowledge. Children must also follow this path. 6 – 12 Children from 6 – 12 are interested in analyzing and discovering relationships relevant to their factual knowledge. Hopefully the work in 3 – 6 has given them a love for geometric investigation. Children take great joy in intellectual activity. The Geometry materials at this level are creative in nature because they give ample opportunity for the children to create their own abstraction. The formal laws that govern geometry will principally be given at the secondary school with the theorems, but we work with the younger children to create demonstrations of these formal theorems – not using the formal wording, but preparing for the understanding of formal wording. Geometric knowledge is not being presented for its own sake but rather for the purpose of providing a stimulus for intellectual development… experience with logical reasoning experience with deduction experience with forming abstractions As we proceed through the presentations we see that manual activity continues to serve children’s intellectual development. One does not have to follow the same sequence with each child. All areas need not be covered – just as long as we keep in mind the public school curricula (minimum) standards. Review of the 3-6 year olds' experiences Everything in the environment contains lines, slopes, and angles. So children really experience Geometry from the moment of birth – these are impressions from the environment, stored in the mind. © Copyright, 2004 Page 9 Geometry Parents of three to six year olds are encouraged to use geometric terms (nomenclature) in the home environment. This forms the basis of a “remote” preparation before children enter the 3 – 6 class. But even if children are not given the terminology, they have “seen” geometry. The sensorial material helps children classify, clarify and make concrete the impressions already received. Children use the Geometry Cabinet quite early. Initially to trace the shapes. What are the advantages of tracing? It provides muscular memory at the sensorial level of the different shapes. (For example, 4 equal sides, 4 equal angles become engrained if the very young child experiences the tracing.) However, older children do not come to that level because their understanding is more visual. Somewhere between three and four years of age the children start working with the names. They start with the basics: triangle, circle, and square. Contrasting selections Why do we start with these three? “Square” – for measuring area “Circle” – for measuring angles “Triangle” – for universal constructor Subsequently we give the names for the other figures: Some of the regular polygons parallelograms trapezoid rhombus oval, ellipse, curvilinear triangle, quatrefoil, common quadrilateral, etc. Hopefully the children will be exposed to the language of the Geometry Cabinet in 3 – 6 class. As they move through the cabinet they work with the cards – generalizing the experience. More attuned to small differences between shapes Real Square Tracing Solid Picture Thick Lines Thin Tracing © Copyright, 2004 Page 10 Geometry Children are gradually led from a recognition using muscular memory to a point where they can recognize visually Geometry Cabinet also is an indirect preparation for “similarity”. With the pink tower, broad stair and geometric solids the child gains a beginning understanding of solid geometry—matches solids to base outlines to understand connections to plane figures. The constructive triangles enable the child to discover the constructive nature of the triangle. Although not exactly sensorial material the large metal insets are a sensorial preparation. The children draw around the inset, constructing the shapes themselves. When they superimpose insets they get the idea of proportion and the relation of shapes. There is also the work with the small metal insets used for making designs. Children take assorted pieces to their table and create designs at random. Later the children may trace, cut out and paste designs. If the children are left free to do these designs they come to see the difference between shapes, e.g., can’t inscribe pentagon in triangle. In the Geometric Cabinet the shape is made for the children whereas with the metal insets they draw around them and make for themselves. They may also work with the classified and relevant nomenclature at the 3 – 6 level. Gives language for parts of plane figures e.g. PARTS OF A SQUARE. Encourage children to make their own booklets. Children who have been in a Montessori school since an early age may have had some experience with a measuring ruler and compass to construct shapes. Geometric construction is a wonderful way to foster handwriting development. Making and labeling angles, etc. Some 3 – 6 children may be exposed to the knowledge of © Copyright, 2004 Page 11 Geometry similarity, congruency and equivalence. The above experiences for the 3-6 year old emerge from a fully developed class. Hopefully the child upon entering the 6-9 or 6-12 class will have experienced: 1. Sensorially based work. Familiarity with geometry cabinet and cards. Knowledge of basic language. 2. Work with geometric solids and names. 3. Work with geometric solids and bases. A factual relationship between plane figures and solid shapes. 4. Work with Constructive triangles (6 – 9 work is a direct outgrowth) 5. Some designs: superimposed geometric figures, large metal insets, small metal insets © Copyright, 2004 Page 12 Geometry II. Initial Presentations © Copyright, 2004 Page 13 Geometry Preliminary No matter how little the child’s exposure may have been at the 3–6 level it is important to see the 6-12 work as a continuation of knowledge for the child. Children have been seeing geometric shapes all their life – a remote preparation. The first task is to find out how much the new children know. It is done informally—perhaps by playing some games relating to the shapes in the environment. For example: “Close your eyes. Think of somewhere in the room where there is a square. Are you ready? Open your eyes and go find it.” Why do we teach the names of geometric shapes? To give the child access keys to language and maths. Not by testing or confrontation! Use any games that will allow one to point out the shapes. Other activities: • • • • Group design with small metal insets Talk about names of shapes Look in magazines for shapes Use shapes for art work, collage Informal not “TEACHING” names Start only with shapes found in the Geometry Cabinet. © Copyright, 2004 Page 14 Geometry “Geometry Cabinet” Presentation 1. This is a scalene triangle. Do you know what the word scalene means? It comes from the Latin “in the shape of a ladder”. What do you suppose is the relationship between a ladder and this scalene triangle? This is a ladder that farmers used to collect fruit from trees. It is what the Greeks called scalene. So the scalene triangle is formed by three of the steps of this ladder (3 of unequal length). We can say that the scalene triangle encloses our human experiences. In children’s house the geometry cabinet is given for aiding movement (eye). In 6-9 not for movement but to strike the imagination. Also necessary to give, not just the word, but its history and derivation. In 3-6 the child traced with concentration. In 69 the child would move quickly; no sensitivity to ‘touch’. In 6-9 we give the name followed by a modified three period lesson. 2. This is an isosceles triangle. Do you know what is means? It means, “having equal legs”. But, can a triangle have legs? If I said you have equal legs, how many legs would I be talking about? “2”. So, having equal legs means having two equal legs. Which two sides are equal in this triangle? Therefore we say an isosceles triangle has two equal sides, but we should say two equal legs. THESE ARE SAMPLES OF SOME OF THE WORD DERIVATIONS. 3. Repeat highpoints of 1 and 2 followed by three period lesson. Must have for all shapes! 4. The word trapezoid in Greek means “small table”. A Greek farmer had a table that looked like this. The legs were in this special position to give stability. © Copyright, 2004 Page 15 Geometry 5. Showing the rhombus, we say: this is called a rhombus. What does rhombus mean? Lets see what happens when we rotate it on one point. It spins like a top. It comes from the Greek “anything that can be spun around”. Greek priests created the top as a sacred symbol. So we have here part of the culture of the past. 6. Here is an ellipse. What does it mean? From the Latin meaning “that to which something is missing”. i.e. the circle. 7. Continue exploring the etymology of all the words. 8. Match the reading labels to the figures and/or loose figures on cards. 9. Commands Dramatize the command for polygons and bicycle demonstration…. Aim of which is to show that the circle is the limit of all polygons and that the more sides there are, the shorter they will be (within the same base). © Copyright, 2004 Available through several mail order services. Page 16 Geometry Constructive Triangles – First Series Material Description “First Box” Right Angle Scalene Triangles • • • • 2 each yellow with black line on minor leg 2 each green with black line along major leg 2 each gray with black line along hypotenuse 1 each red with black line along major leg Right Angle Isosceles Triangles • • 2 each yellow with black line on one of the = sides 2 each green with black line along hypotenuse Equilateral Triangles • 2 each yellow with black line along one side Obtuse Angle Triangle • 1 each red with black line along longest side (single triangle-companion of other red) Presentation 1st Box …for six year old 1. Holding the 2 yellow equilateral triangles… What is this? “An equilateral triangle” superimposing the child says they are “equal”. Placing one of the triangles on the table we point out the black line. Ask the child to unite the 2 triangles along their common black line by holding one in place and bringing the other next to it. What figure does it form? A rhombus 2. Same procedure for 2 yellow right-angle isosceles triangles. What is it? Unite it! A parallelogram 3. Same procedure for 2 green right-angle isosceles triangles. A square Constructive triangles called so because the “construct” new figures. 4. Now the 2 yellow right-angle scalene triangles. © Copyright, 2004 Page 17 Geometry A parallelogram 5. Now the 2 gray right angle scalene triangles. A rectangle 6. Now the 2 green right angle scalene triangles. A parallelogram 7. So, from the isosceles triangles we formed a rhombus or square. From the scalene triangles we formed the common parallelogram and rectangle. Child Can: Cut figures out of colored paper, paste and label them. Repeat what was done above. 8. After a period of time: Introduce 2 red triangles. What are they? Unite along black lines…. A trapezoid Aim: Give children the concept of construction of plane figures. Children will discover that by uniting 2 triangles, a quadrilateral can be formed. Material Description “Second Box” 2 blue equilateral triangles (no black line) 2 blue isosceles right-angel triangles 2 blue right angle scalene triangles 2 triangles with different shapes (similar to 2 red triangles in first box) Presentation 2nd Box 1. Display 2 blue equilateral triangles and repeat first part of lesson as in previous presentations. Name of figure? What kind? Then ask the children to put them together. How? As you want to! What is formed? A rhombus. Lets try to slide one of the figures around to see if we can form something © Copyright, 2004 Point out characteristics of each triangle. Page 18 Geometry else. Still a rhombus but on a different side. To emphasis, tell child to hold the other triangle and move this one around it. Same result! Indirect preparation for equivalence and area calculations. 2. Display two right angle isosceles triangles. Introduce as before … Then ask children to unite in any way. We want to form as many quadrilaterals as possible. Rotating one figure around the other the children discover they have formed a square and some parallelograms. 3. Display the two blue right angle scalene triangles. Introduce as before… Then ask children to unite in any way, of course, forming quadrilaterals. A rectangle and two common parallelograms. 4. Of course we have three sides in the equilateral triangle, but how many different lengths are there? “One”. How many quadrilaterals did we form? “One” 5. How many different lengths are there in the isosceles triangle? “Two”. How many quadrilaterals did we form? !!!! Was it two or three? Lets look closely. The first one is definitely a square. But what is your opinion about these other two? “They are identical because one is the reverse of the other; turn them over and see”. So we really only formed two different quadrilaterals. 6. And with the scalene triangles? We had three different lengths and formed three different quadrilaterals. Repeat: 1 length 1 quadrilateral 2 lengths 2 quadrilaterals 3 lengths 3 quadrilaterals 7. Now lets looks at these last two scalene triangles of different sizes. What can be formed? A trapezoid and (if formed) a concave quadrilateral. © Copyright, 2004 Page 19 Geometry Material Description “Third Box” 12 equal scalene triangles, very special in measurement and construction. Group Presentation I “Lets Construct the Stars” 1. Ask children to analyze triangle! Size? “Scalene” Angle? “Right angle”. Both together? “Right angle scalene triangle”. Demonstrate what happens when two are put together (one turned over). “An equilateral triangle”. We show that all these 12 triangles are half of the equilateral triangle. Lets call this angle the big angle (right); this one the medium size angle (60°); this one the small angle (30°). Small, medium and large angles… This is the long side; this is the short side and this is the medium size side. Now, we lay one triangle down on the table. Point out the small angle. Lets construct a star putting all the small angles together… How many points does it have? “12” How many triangles did we use? “12” Conclusion: We have constructed a star using all 12 triangles and it has 12 points. 2. Now lets form a star with the medium size angles. How many points does it have? “6”. How many triangles used? “6”. So we can construct another six-pointed star with the remaining triangles. 3. Now form a star with the big angles. How many points does it have? “4”. How many triangles used? “4”. So with the remaining triangles we can construct two more stars just like this one. © Copyright, 2004 Page 20 Geometry Presentation Group II “Lets Construct Diaphragms” 1. Starting with the first star constructed of 12 triangles, demonstrate what happens when we “open” the centre of the star and form a diaphragm (not for child: concentric dodecagons). This opening has a certain form! It has 12 sides as well as an outer edge. 2. Starting with the second star constructed of six triangles demonstrate what happens when we “open” the centre of the star and form a diaphragm (concentric hexagons). This opening has six sides, as does the outer edge! Minor leg forms outer perimeter. Major leg forms outer perimeter. 3. Starting with the third star constructed of four triangles demonstrate what happens when we “open” the centre of the star forming a diaphragm (concentric squares). This opening has four sides, as does the outer edge! Children should cut out triangles making stars and diaphragms… pasting and coloring. © Copyright, 2004 Page 21 Geometry III. Congruency, Similarity and Equivalence © Copyright, 2004 Page 22 Geometry Congruency Material Insets of the square and triangle. Need to describe to children. • • • • • • • • • Square divided into 2 parts (midpoints) Square divided into 4 parts (midpoints) Square divided into 8 parts (midpoints) Square divided into 16 parts (midpoints) Square divided into 2 parts (diagonal) Square divided into 4 parts (diagonal) Square divided into 8 parts (diagonals and midpoints) Square divided into 16 parts (diagonals and midpoints) Triangles divided into 2, 3 and 4 parts Presentation 1. Show material to children (3) 2. Today we are going to learn about shapes that are equal. Point out triangles to be used for follow up. 3. Remove two (1/4) triangles from square inset. “Are they exactly the same?” 4. When we have two figures that are exactly the same size and shape we call them congruent shapes. Congruent from the Latin “to meet together”. 5. The children find congruent shapes. The teacher asks why they are congruent. Return pieces. 6. Prepare label “Congruent”. Ask children to cover their eyes. Give a shape to each child. They find a congruent shape. How did you know they were congruent? 7. Children take turns giving each other shapes and finding congruent counterpart. Again: © Copyright, 2004 We went from sensorial to naming shapes. Most children can go right on/this is pretty simple Page 23 Geometry How did you know they were congruent? With most children you will go right on to next lesson on Similarity. © Copyright, 2004 Page 24 Geometry Similarity Material Same material as with congruency. • • • • • • • • • Square divided into 2 parts (midpoints) Square divided into 4 parts (midpoints) Square divided into 8 parts (midpoints) Square divided into 16 parts (midpoints) Square divided into 2 parts (diagonal) Square divided into 4 parts (diagonal) Square divided into 8 parts (diagonals and midpoints) Square divided into 16 parts (diagonals and midpoints) Triangles divided into 2, 3 and 4 parts Presentation 1. Invite three children. Remove two different squares. (E.g. 1/4 and 1/16) 2. Are they congruent? “No” 3. When we have two figures that are a different size but have the same shape they are called Similar. 4. Ask children to find similar shapes. What are they? “Name the shape” Are they the same size? 5. Prepare a ticket “Similar”. Children also have “Congruent” label. Children find shapes and determine if they are similar or congruent and place under appropriate label. Again: Question “How did you know?” Inspire follow up work: What can children do? • • • • My booklet of similar shapes My booklet of congruent shapes Make constructions with similar figures Try to get children to extend the work – designing with © Copyright, 2004 Handwork needed after lesson to solidify concepts. The material limits the choice to make it work. It is helpful to get specific names from the children so they don’t get the idea that all triangles are similar. This material is limited which is why rectangles work. Writing the labels is important because it gives the children a starting point. Page 25 Geometry • similar shapes Figures drawn at random on sheet of paper Find the congruent pairs. Find the similar pairs. © Copyright, 2004 Page 26 Geometry Equivalence Note After presenting congruency and similarity you can tell how much the child has understood. This is six-year-old work. – proportions are not yet understood. Equivalence is the most important concept. It is used throughout the work we do. e.g. Pythagorean theorem, study of area. Children really should have worked at the introductory level with fractions before this lesson (numerator, denominator, sensorial exchanging) Review with children what has been done. Don’t get upset if they don’t get it right away. Materials limit the concept of similarity. Also a more interesting concept: Find out what children know – not by testing – subtly. If children have not had fraction work it is still possible to do this lesson. Presentation 1. Invite three children and ask them to find congruent shapes. 2. Now ask them to find similar shapes. Now ask them to find equal shapes. Why did you choose these? Etc. 3. Teacher removes inset of whole and replaces it with two halves. Do they fit? “Yes” Now try with the other halves. Do they fit? “Yes” 4. This is worth half of the square! (The rectangle) This is worth half of the square! (The triangle) Both have the same value When two figures have the same value but are different shapes they are called EQUIVALENT – from Latin “equal” “value” (Try another equivalence – ask why they are) 5. Demonstrate their equivalence. Superimpose. Show that the left over part is the 1/8 triangle and converts the triangle to an equivalent rectangle. © Copyright, 2004 Informal Review We could say that each piece is worth how much of the square? Children cut out of paper and discover for themselves. Page 27 Geometry 6. Ask children to find equivalent shapes: Are they congruent? Do they look the same? 7. Give children a figure and ask them to find an equivalent shape. Children may do more of the above work or move into work with three labels. Congruent figure Similar figure Equivalent figure If the children have not had fractions we can say: This is one piece out of four and this also is one piece out of four. Write labels and children find The children may discover fractional equivalence. 1/2 = 1/4 + 1/8 + 1/16 + 1/16 Children may continue to work on their own – more exploration. Game I would like to find a square that is equivalent to this rectangle (1/2). Use two half squares by diagonals Extensions “My book of equivalent shapes”: trace, or trace, cut and paste. Equivalence with Non Geometric Shapes This “tree” is equivalent to this teapot. © Copyright, 2004 If you have not found anything that interests them. Page 28 Geometry Constructive Triangles – Second Series: Triangular and Two Hexagonal Boxes Note: This work does not necessarily follow right after the similar, equivalent, equal/congruent work with insets of square. The Classified Nomenclature is a concurrent activity. Another set of materials that we use to give concepts of equal, similar and congruent are the constructive triangles. In general if the children are working on their own with a particular concept it is not necessary to give new material with the same concept. Material Triangular Box Small Hexagonal Box Large Hexagonal Box Presentation Triangular Box (T) 1. Children remove triangles from box. Do you remember these? Name some of them. Are there any here that are congruent? 2. How did you know they were congruent? (Or equal) We are reviewing with children. 3. Can you find some that are similar? 4. Can you find some that are equivalent? • • • Place 3/3 over gray triangle and remove Place 4/4 over gray triangle and remove Place 2/2 over gray triangle and remove We also know that 1/2 = 2/4 (If they have studied fractions) © Copyright, 2004 Page 29 Geometry Try more arrangements: Don’t exhaust all possibilities. Leave some for children to discover. Are these equivalent? How do you know? Can you make some more equivalent shapes? Exercise It is not our purpose to show every possibility. Follow what children initiate. Give only examples. Children may draw some. However most of the time, just move on. Presentation Small Hexagonal Box (H1) 1. Remove contents from box with three invited children. Identify triangles. 2. Are there any congruent shapes? (Superimpose) Are there any similar shapes? Are there any equivalent figures? (Note to teacher: The yellow triangle and the six red obtuse triangles are new for 6-12; not used in 3-6. Underscore importance - going from rhombus. 3. Now the gray equilateral and the red isosceles are equivalent because they are both 1/2 of the equivalent rhombi. 4. Build hexagon with six gray triangles. Make equivalent figures with six red triangles or three red obtuse triangles and large yellow. © Copyright, 2004 Page 30 Geometry 5. What can be done with 1/2 of each shape? Split hexagon into two trapezoids. Is this trapezoid equivalent to the red triangle? (Yes) Because it is half of two equivalent shapes. 6. Demonstrate equivalence between yellow triangle and green trapezoid. (Use red obtuse triangle as mediator.) 7. How about this parallelogram and hexagon? Note pattern: Find congruencies Find similarities Find equivalence © Copyright, 2004 Page 31 Geometry Presentation Large Hexagonal Box (H2) Note: 1. Three children are invited and contents are removed. What are they? 2. Lets find congruent figures. Now find similar figures. Are there any equivalent shapes? Not as much to do with this box as with others. Review with students procedure 1. Congruent 2. Similar 3. Equivalencies (Whole hexagon; half hexagon; red parallelogram equals yellow rhombus. We are not teaching; we are letting the children explore. The yellow hexagon is found to be equivalent to • • • Yellow/red/gray hexagon Yellow parallelogram Three rhombi © Copyright, 2004 Page 32 Geometry Presentation Triangular and Small Hexagonal (T and H1) 1. Remove all pieces. 2. Find congruent shapes. Demonstrate all the congruent rhombi made with red obtuse triangles and equilateral triangles. Show that they are not the same as the yellow rhombus. 3. Find similar triangles. 4. Lets find out the relationship between the large yellow triangle (T) and large gray triangle (H1). How much smaller is the yellow? Superimpose two green halves over gray. Change green halves into deltoid (below) -- superimpose large yellow and red obtuse to show equivalence. Note: Interesting discoveries! The children notice (when shown similarity) that the yellow and gray triangles are not equivalent. We want them to find a measurable difference between the two. Large Gray Triangle = Yellow Triangle + Red Obtuse Triangle Demonstrate how above red obtuse triangle is equivalent to red equilateral triangle by showing how each is half of equivalent rhombi. Therefore: Large Gray Triangle = Yellow Triangle + Red Equilateral Triangle. (Illustration on next page) © Copyright, 2004 Page 33 Geometry 5. Searching for the exact difference! Substitute four gray equilateral for the large gray equilateral triangle. Substitute three red obtuse isosceles triangles for yellow triangle. Now: It takes three red obtuse triangles to make yellow triangle. The red equilateral triangle is equivalent to the red obtuse triangle (Step 4). But look the red equilateral is 1/4 of the large gray triangle and 1/3 of the yellow. (Through intermediary of red obtuse) How can 1/4 be the same as a 1/3? Three of the fourths of the large triangle can make the yellow triangle. Therefore the yellow triangle is 3/4 gray triangle and, it will take four of these thirds to make the gray triangle. Therefore the gray triangle is 4/3 yellow triangle. Note: Practice this on your own. 6. Double the three equilateral triangles as illustrated below: © Copyright, 2004 Page 34 Geometry Replace above small gray equilateral triangles with three yellow obtuse triangles (right illustration) and transform to hexagon (below). Replace one of the small equilateral triangles above with red obtuse triangle (equivalence already shown) and demonstrate equivalence to the right scalene. Note: There is a need to play with relationship between equilateral red and obtuse red. © Copyright, 2004 Page 35 Geometry Presentation Triangular and Large Hexagonal (T and H2) 1. Remove all pieces. Find congruent shapes. Find similar shapes. 2. Equivalent shapes. Look at all the possibilities for large equilateral triangles… Then: Set all them out Whatever we make out of two of these will be equivalent to what we make out of the other two. Try it! This can be converted to hexagon (below) by replacing red equilateral with three obtuse isosceles triangles (right column). 3. Add in a third triangle. Also: Various trapezoids with obtuse isosceles triangles. Try it! 4. Some other composite equivalences: Keep in mind we are not trying get children to memorize but to explore and reason – some talk about fractional parts. How to get children to work? © Copyright, 2004 Page 36 Geometry Suggest some hand work if they are not exploring templates. Manipulation first, handwork if not exploring significantly enough to reinforce concepts of similar, equivalent and specifically equal or congruent. Remember: • • © Copyright, 2004 Explore relationships with both hexagonal boxes with children. Explore relationships with all three boxes with children. Page 37 Geometry Equivalence with Metal Insets Material Description and Explanations. Some people number these plates for their albums. The first one is used by itself and shows the triangle on one side and rectangle on the other. The newer material shows a “whole” triangle -- thus both sides are filled. Briefly describe these insets to Students. Not for children!!! The next group is for rhombi. The new materials come with an extra plate the size of (4) with the whole rectangle. Later this one is added (5) Next is the trapezoid (6) Regular Polygons – Decagon We do this work in two stages. First is the sensorial. How do you think this is done? “By replacement” The second stage brings awareness about the relationships between various lines in these figures. …bases, heights and other names that are pertinent to the development of area formulae… major/minor base, major/minor diagonal, apothem, perimeter. Generally start by having the first two sets of plates ready on the table. Presentation “Triangle – Plate 1” 1. What have we got? “Triangle and rectangle” 2. I wonder if they are equivalent. Try it out. 3. Where is the base of the triangle? Where is the base of the rectangle? What is the height of the triangle? What is the height of the rectangle? Try to find a way to make the material demonstrate what you want to show. © Copyright, 2004 Page 38 Geometry Continuation of Plates 1 1. We know these figures (1) are equivalent. Identify base of triangle and rectangle. 2. What do you know about their length? “Equal” What do you know about their height? Demonstrate that the height of the triangle is twice the height of the rectangle. Demonstrate To students: Pull this out! 3. Try to summarize: We found out that a triangle and a rectangle are equivalent when their bases are equal and the height of the triangle is twice that of the rectangle. Presentation “Rhombus – Plates 2, 3 and 4” 1. Identify all the shapes. Are they equivalent? Exchange wherever you can to see. Note: You could do 1 – 3 above and then this one and stop. If children are ready to go ahead. Do until children feel confident that all figures are equivalent? © Copyright, 2004 Page 39 Geometry Bring out Plate 5 1. Are these figures here (5) equivalent to these others (2), (3) and (4). Note: Here you get an idea of children’s visual perception and deductive logic. 2. Now try to put the pieces back in their original spaces. 3. Let’s look at the relationship between the lines using this figure (5). Trial and error 4. Show me base of rectangle and rhombi. What about them? “They are all equal” (demonstrate) 5. Where is the height of the rectangle? Place the half of the rectangle into the rhombi to demonstrate. What do we find? Heights and bases of the rectangle equal heights and bases of rhombi”. 6. Therefore the rectangle and rhombi are equivalent. ”Rectangle and rhombus that have equal bases and heights are equivalent”. 7. I am going to take pieces of the rectangle and transform them into these two triangles. 8. Is each of these pieces equivalent? “Yes” Why? “Because they are 1/2 of equivalent figures” 9. What do we know about equivalent triangles? “They have equal bases and equal © Copyright, 2004 Page 40 Geometry heights” ”Triangles that have equal bases and equal heights are equivalent.” Extension: Draw a triangle and rectangle that are equivalent. Could be constructed and could be done sensorial. To students: All the answers are in the material. We have not only dealt with the rectangle and rhombus but the triangle as well. For the rest of the plates we will do the sensorial stage followed immediately by the relationship between lines. Presentation “Trapezoid – Plate 6” 1. Identify trapezoid. How many bases? “2” What are they called? “Minor base and major base” 2. Are they equivalent? Child exchanges: “yes” 3. Are the trapezoid and the rectangle equivalent? Child exchanges: “yes” 4. Let’s think about the relationship between the base and height of the trapezoid and the rectangle. 5. The trapezoid has a major base – show and place in rectangle opening. It also has a minor base – show and place in rectangle opening in special way. 6. What about the base of the rectangle? “It is equal to the major base + the minor base of the trapezoid. 7. What about their heights? Demonstrate by © Copyright, 2004 Page 41 Geometry aligning small triangles in trapezoid to show height; then remove one triangle and show that it is the height of the rectangle. “Therefore the height of the trapezoid is twice the height of the rectangle.” 8. What do we know about equivalent trapezoids and rectangles? “They are equivalent when the base of the rectangle equals the sum of the major and minor bases of the trapezoid and the height of the rectangle is half the height of the trapezoid. Pull it out. As you work with the materials try to find smooth wording that works for you. Presentation “Pentagon” – Plates 11 and 12” 1. Rotate (9) to demonstrate “regular” pentagon. 2. Demonstrate equivalence between (9) and (10) 3. What does inset 12 tell us? Any regular polygon may be divided into as many triangles as it has sides © Copyright, 2004 Page 42 Geometry Presentation “Decagon – Plates 7, 8, 9 and 10” 1. Demonstrate equivalence between (7) and (8) 2. (From 9) Show how two halves of this large rectangle are equivalent by superimposing. 3. Is the rectangle equivalent to the decagon? Demonstrate by moving the divided rectangle to inset (7). Put them back. Or, remove rectangle and slide pieces to left. 4. (Holding rectangle from 10) lets find out about this rectangle and these pieces. Superimpose and demonstrate equivalence. 5. I wonder if this rectangle is equivalent to the decagon. Move the divided rectangle into the decagon inset (7)… put them back. 6. Go over what equivalences have been found: (8) to (7) (9) to (7) (10) to (7) 7. Are the rectangles from 9 and 10 equivalent? “Yes”. Why? “Because they are both equivalent to the decagon”. You want the pieces of the perimeter to be along the base. Relationship between lines 8. Identify base and height in rectangle from (9). Identify perimeter and apothem in decagon. 9. The base of the rectangle equals how much of the perimeter? Demonstrate ½ by superimposing base of (9) over base composed of five triangles (half of them) from (8) or other part of (9). 10. Let’s look at the height of the rectangle (9). “The height of the rectangle is equal to the apothem.” DEMONSTRATE © Copyright, 2004 Page 43 Geometry 11. The decagon and rectangle are equivalent when the base of the rectangle equals half of the perimeter and the height of the rectangle equals the apothem. 12. We also know that the decagon is equivalent to this rectangle (10). How? This time the base equals (count: 1, 2, 3…10) the whole perimeter and the height of the rectangle equals half of the apothem. Demonstrate. The reason we found these specific relationships is to prepare for the study of area formulae. Presentation “Rhombus\Rectangle” – Plate 13 1. Interchange B and C to confirm congruency. Return to original frames. Objective: Triangles having the same altitude and base are equivalent. A C B 2. Take one part of A, B and C and classify: A/2 is a right-angled triangle; B/2 is an acute angled triangle; C/2 – obtuse angled triangle. 3. Take A/2, B/2 and C/2 and place in Frame D. The altitudes of the three triangles are the same. 4. How about their bases? Place A/2 in B and C; Place B/2 in A and C. All three triangles have the same base. 5. The three triangles are equivalent because they are 1/2 of equivalent figures © Copyright, 2004 D Draw this out from the children. Page 44 Geometry EXTENSIONS OF THE WORK WITH INSETS OF EQUIVALENCE. 1. Children individually repeat the presentation given by teacher. 2. Teacher prepares triangles, rhombi, parallelograms, trapezoids and polygons with more than four sides. Ask children to prepare a rectangle equivalent to each. © Copyright, 2004 Page 45 Geometry Equivalence with Pythagorean Insets Remember we have already mentioned Pythagoras’ name when we talked about the history of geometry, the rope. We have also explored right-angled triangles with the box of sticks: right isosceles with the neutral sticks and right scalene with special 3-4-5 combinations. Presentation “Pythagorean Plate I or Sensorial Plate” 1. Ask children to identify the white triangle: …right isosceles. Identify other shapes … squares. 2. We are going to discuss something about the relationship between these two (yellow and blue) whole squares and this whole one (red). 3. The sides of these two squares are the same as the legs of the triangle. 4. The length of the side of the large square is the same as the hypotenuse. 5. Demonstrate equivalences sensorial. Red triangles to red square and replace. Yellow triangles to yellow square and replace. Blue triangles to blue square and replace May have to review “leg” 6. Now let’s look at these divided squares … something interesting! Remove two red triangles – interchange with two blue triangles. 7. Remove other two red triangles – © Copyright, 2004 Page 46 Geometry interchange with yellow triangles Now what can we say about this red square? It is equal to the blue plus the yellow! Also, the blue equals half the red and the yellow equals half the red. Extension: Children can trace in their notebooks After some time of independent work try to draw out the Pythagorean Theorem: This is an early experience because it is demonstrated sensorially. In a right triangle (remove the white triangle) the sum of the squares built on the legs is equal to the square constructed on the hypotenuse. Explain to the children that this is the same as the early rope experiences of the Egyptians. © Copyright, 2004 Page 47 Geometry Presentation “Plate II – Numerical” The material: triangle 3cm leg – 9 4cm leg – 16 5cm leg - 25 1. Here we have another demonstration of the theorem of Pythagoras. In this inset all the squares are divided up so that we can use numbers of squares. 2. We are going to try to prove that this square plus this one equals this one… that the squares built on the legs equal to the square built on the hypotenuse. 3. The children interchange pieces. 4. Show the numerical value: 32 = 9 42 =16 52 = 25 Children may discover the proportions of the triangle. In that case you might introduce the idea of the Pythagorean triples. This is also a good time for work problems. For example: Given: length of two legs Find: the hypotenuse Given: length of leg and hypotenuse Find: length of other leg. If children can do this second example you know you have finished the work because they have internalized the process. It is your job to make sure that the children are ready to discard the material and work abstractly. © Copyright, 2004 Page 48 Geometry Pythagorean Theorem with Constructive Triangles Presentation… with plane figures other than squares Material: Constructive Triangles: hexagonal boxes H1 and H2, and triangle box T 1. Remove green right scalene from triangle box. Identify: leg, leg, hypotenuse. 2. What do we already know about the relationship between the length of the hypotenuse and the length of the legs. ”The sum of the squares is equal to the length of the hypotenuse” SHOW PYTHAGOREAN TEMPLATE 1 The square built on the legs is equal to the square built on the hypotenuse. 3. This theorem is usually expressed in terms of squares. Have you ever wondered since the square is a regular polygon, if there is also was a relationship with other regular polygons built on the legs of a right angle triangle? Place gray equilateral (T box) on hypotenuse Small red equilateral on shorter leg Yellow equilateral (H1 box) on longer leg 4. We already know something about the relationship between these equilateral triangles. Demonstrate equivalences you may have done before: © Copyright, 2004 Page 49 Geometry 5. Exchange four gray equilaterals for the large one. Exchange three red obtuse isosceles for the yellow equilateral. 6. All these little triangles are equivalent. 7. Remember we said that maybe these would equal this one? Let’s see… Here we have one and three, which equals four, and here we also have four!! 8. So it also works for equilateral triangles. 9. I wonder what else we could make. What if we doubled the equilateral triangles? Do it! We get another series of regular polygons … rhombi 2+6=8 10. What if we added a third equilateral triangle? (add wholes) … trapezoids 3 + 9 =12 11. Doubling this (with paper yellow equilaterals) makes hexagons: 6 + 18 = 24 12. Another way to look at these is to treat the large gray equilateral triangle as the unit of measure. Then in the first case we would have: 1/4 + 3/4 = 4/4 © Copyright, 2004 Page 50 Geometry In the case of the rhombi: 2/4 + 6/4 = 8/4 The trapezoids: 3/4 + 9/4 = 12/4 The hexagons: (6 x 1/4) + (18 x 1/4) = 24/4 © Copyright, 2004 Page 51 Geometry Pythagoras Three (Euclidean Logic) The Pythagoras three plate Note: The children have already worked with the Pythagorean theorem, which states that the sum of the squares built on the legs of a right triangle equal the square built on the hypotenuse. Presentation 1. Introduce the plate. Do you remember the Pythagorean theorem? “Yes: The sum of the squares built on the legs of a right angled triangle equals the square built on the hypotenuse.” We are going to use this plate and try to prove that these red rectangles equal the blue square plus the yellow square. 1 2 2. Remove the red rectangles. Slide the white triangle down and place the yellow and blue parallelograms in the space. Replace pieces as in 1. 3 3. The sum of the blue and yellow parallelograms is equivalent to the sum of the two red rectangles – (that form the square built on the hypotenuse). Return pieces as in 1. 4 4. Remove the yellow square and slide white triangle up as shown in (4). Replace space with yellow parallelogram. Does this © Copyright, 2004 Page 52 Geometry demonstrate that the yellow parallelogram is equivalent to the yellow square? Return pieces as in 1. 5. Remove the blue square and slide the triangle up as shown in 5. Replace space with blue parallelogram. Does this demonstrate that the blue parallelogram is equivalent to the blue square? Return pieces as in 1. 5 6. Therefore, we can see that the yellow parallelogram is equal to the yellow square and the blue paralegal is equal to the blue square. (6). 6 7. Take the small red rectangle and the blue parallelogram. Considering the longer sides as base, identify the altitude and base of each figure… sensorially show that they are the same. 8. These two figures are equivalent because b=b and h=h. Now take the small red rectangle and place in the frame (You can turn plate vertically) as shown. Note that the altitudes are equal and that the length of the whole opening will hold both pieces perfectly! © Copyright, 2004 Page 53 Geometry 9. Take large red rectangle and yellow parallelogram. Demonstrate that b=b and h=h and are therefore equivalent to each other! Place large red rectangle in frame as shown we did in (1) above. Note that the altitudes are equal and that the length of the whole opening will hold both pieces perfectly! 10. ANOTHER WAY. Take blue parallelogram and place in frame as shown; also place yellow parallelogram in frame as shown. Note that the bases are the short sides! Show that the blue square is equivalent to the blue parallelogram because b=b and h=h. Similarly show equivalence of yellow square and yellow parallelogram. 11. We have shown that small red rectangle = blue parallelogram and blue parallelogram = blue square 12. We have also shown that large red rectangle = yellow parallelogram and yellow parallelogram = yellow square © Copyright, 2004 Page 54 Geometry 13. Therefore: This could not be shown directly because their measurements are not commensurable… cannot be measured with same unit! The study of areas and metric system will fall between these two ages. Also in that time frame will be the arithmetic demonstration of the extensions of Pythagorean Theorem will also be after the areas. Summarize: We have show that the square built on the shorter leg is equivalent to the smaller rectangle, which makes up the square of the hypotenuse; the square built on the longer leg makes up the larger rectangle, which forms part of the square of the hypotenuse. The sum of the squares of the legs is equal to the square of the hypotenuse. Ages For presentation of first two Pythagorean Frames 8 1/2 + For third (Euclidean) Frame 11 1/2 © Copyright, 2004 Page 55 Geometry Algebraic Demonstration of Euclidean Theorem Using the third Box of Constructive Triangles from Series1: 1. Child takes one triangle, identifies it: right-angle scalene… hypotenuse, major leg, minor leg. 2. Take three more of the triangles and show congruency. 3. Isolate one of the triangles and apply the letter “a” to the major leg, “b” to the minor leg, and “c” to the hypotenuse. Show that the same nomenclature applies to all four triangles. The area of the whole square = c2 The area of each triangle is 1/2ab; of the 4, = 2ab The inner square is = (a-b)2 Therefore c2 = (a-b)2 + 4 ab/2 c2 = (a2-2ab+b2) + 2ab c2 = a2 + b2 Another demonstration of the same procedure… (a + b)2 – 4 ab/2 = c2 or, (a + b)2 = 4 ab/2 + c2 a2 + 2ab + b2 = 2ab + c2 a2 + b2 = c2 Age: 12 © Copyright, 2004 Page 56 Geometry IV. Geometry Nomenclature © Copyright, 2004 Page 57 Geometry Classified Nomenclatures The classified nomenclatures are also a work for reading. Material Description Series of eight nomenclatures A through H A) Basic Ideas … point, line, surface/beginning of the whole geometrical world. They constitute plane and solid geometry. (Folder is Gold) B) Study of lines C) Study of Angles D) Plane figures … to define, it is necessary to have concepts learned in B and C above. Nomenclatures divided into two sections: those limited by curves and those limited by straight-line segments. E) Triangles F) Quadrilaterals G) Regular Polygons H) Circle Each series contains the following: 1. Folder containing picture cards with no words. Corresponding reading labels (at level of words). Definitions without subject (at sentence reading level) 2. Wall chart with names on each picture: This is the ‘control’ used at level of word reads. 3. Booklets with pictures and definitions: Control for sentence reading level. Typical activity with geometry nomenclature… Children read definitions and place label on dotted lines checking their work with control book. Matches labels to pictures. Read definitions and matches to label and picture by removing the label and placing it on the definition…reconstruction control book! © Copyright, 2004 Page 58 Geometry Children can write definitions, cut them up, and try to reconstruct. Definition cards can be used with or without pictures but always with labels. Other Materials • • • A box of sticks. There are 10 different sizes of sticks that are designed to attract two sensorial stimuli: color and length. All are in increments of 2cm beginning with 2cm and ending with 20cm. Another series of sticks. 10 “neutral” sticks representing the hypotenuse of each isosceles triangle formed with the other sticks. Wooden Tack Board covered by several pieces of paper representing the “plane”. © Copyright, 2004 Also used for diagonals of some regular polygons. Page 59 Geometry A) Fundamental Concepts Material for 1st Presentation “Fundamental Concepts” • • • • • • • • Any box A ball Plane insets from Geometry Cabinet Series of small geometric solids Paper Sharpened pencil Sharpener Decimal system material: 10 units, 10 tens, 10 hundreds, 1 thousand cube Presentation “Fundamental Concepts” 1. Ask children to place rectangular box on table. Give them the ball and say “put it in the same place”. “But I did not say to move the box, or put it on top of the box or next to it; I asked you to do it right there where the box is”. “Impossible”. “You can see that every THING occupies a space!” “When I go out of the room and you are in my way, I must ask you to move!” 2. Let’s go into a more precise analysis. Picking up the sphere from the small solids: This was my ball! (remove the original box and ball). This was my box (holding the quadrangular prism). Now look at this object; it has a curved surface like the sphere and a plane surface like the prism. It is called a cone. Now this one; it has a curved surface and two plane surfaces and is called a cylinder. Here we have another prism (triangular). And a cube, a pyramid, and another pyramid. This one looks like and egg and is called an ovoid; notice how it is all curved. This one is also curved but it looks different and is called and ellipsoid. © Copyright, 2004 Two opposite objects: One limited by a curved surface and the other by a straight surface. Use of the word “thing” as opposed to the technically correct “body” is easier to understand, at this level. Sphere and prism represent opposite extremes. (Line up as shown) Page 60 Geometry 3. Let’s use some more refined words for each solid: cube OK st 1 prism quadrangular prism nd 2 prism triangular prism 1st pyramid triangular pyramid nd 2 pyramid quadrangular pyramid With this presentation we have given the concept of ‘solid”, and they occupy space, can have curved, plane or a combination of curved and plane surfaces. 4. Bring back ball and box. Let’s see how this box is limited: It has plane surfaces and is stable. The ball: It has curved surfaces and is not stable. These two objects are limited by a straight plane surface and a curved surface! What is a surface? It is like a very very thin layer of paint. Teacher takes figure(s) from geometry cabinet. The surface would be this thin layer of paint that covers this shape. 5. Taking the plane square inset: Is this a surface, and how is it limited? ”by a line”. Holding the circle inset: How is it limited? “by a line; a curved line”. 6. Look! We can draw a line. Take a piece of paper and red pencil. This can be the image of a line; but it actually is too thick, it must be much thinner! Note how the concepts of very thin surface and very thin line are emphasized. We start with solid and work back to point! 7. Teacher gives concept of ‘point’ by marking a dot with the sharpened pencil. This is a point, but it is really much smaller than this. The point is like the mark left by a very sharp pencil! © Copyright, 2004 We have given the concept of surface, line and point at the sensorial level. Page 61 Geometry First nomenclature Material Inside the folder: • • • • a red (folded cube) a red square on paper a red line on paper a red point on paper 1. Form the cube! It is a solid that occupies space. This is a surface; it goes on and one in all directions. The line also goes on and on…. Children match labels Three period lesson 2. Try to form definitions with children. ’A solid’ It is what occupies space. ‘A surface’ It is like a layer of paint; it can be straight or curved. ‘A line’ It is like a very thin hair and can be straight or curved. ’A point’ It is like a dot left by a very sharp point. Bend picture of line to show curved line! Solid: 3 dimensions Surface: 2 dimensions Line: 1 dimension Point: none Note: The point, line and surface can only be described with terms prefaced by ‘like’. The solid can be defined accurately. To emphasize the basic ideas of geometry we use the decimal system material to illustrate the four concepts 1. This is a bead, a bar, a square, and a cube. Nothing new! Now, this is a point, a line, a surface and a solid. 2. Now lay out 10 beads forming a “line” of beads. As © Copyright, 2004 Page 62 Geometry we add more “points” we make a line! We can say that the point is the constructor of the line. [Alternative would be to “move” one bead in a path forming a line. By moving a bead (a point) we create a line.] Take a ten bar and say “Moving as line in any way creates a surface.” The line is the constructor of the surface. (Flashlight is dark room) In reality, the point is the constructor of everything. Can be demonstrated with paintbrush. Now, what happens when I move a surface? It creates a solid. 3. Now we display folder with pictures. Point … line….surface… solid. Hold up and show to children how we have a point; then by moving the line we form the square; and the square forms the cube! Age: 6 years Aim: Give “so called” basic ideas based on reality as we use common objects and then the decimal system material. © Copyright, 2004 Page 63 Geometry B) Study of Lines Presentation One 1. Take out all (or some) of the Geometry Cabinet drawers and have children follow the contour of the shapes. Review that the figures are limited by lines. Straight and curved line terminology should be given to the children. 2. Now take all of the insets. Form two columns. First column for those figures limited by straight lines and the other limited by curved lines. Children can make lists of each series. The explorations of curved and straight lines linked to objects. It is necessary to go from object to concept. Material • Two spools with one string attached Presentation Two 1. Holding spool of string (inside hands so the spools can not be seen by children) with clenched fists, teacher pulls hands apart while still grasping string demonstrating a ‘line’ by keeping the string taught. “This is a line” (moving arms in all directions maintaining tightness). “ This is a line.” “This is a line.” “This is a straight line.” Laying string down on table forming a curve (but still holding spool in fists): “This is a curved line.” Repeating several variations of curved and straight lines and getting response from children. At first we use the word ‘line’ along, adding ‘straight’ and ‘curved’ adjectives later. 2. Three period lesson: Show me a straight line! A curved line! What is it when it is like this (bunched up)… curved. Like this? Like this? © Copyright, 2004 Page 64 Geometry Game: Ask children to look for straight and curved lines in the environment. 3. It is evident that the line stopped where the string ended (our hands limited it) but it could go on and on forever. Ask children to draw a line on the blackboard… At both ends we draw three dots or points, which means these lines, go on to infinity. When we identify this concept of infinity we have to imagine that it has no end. We give the concepts of infinity of a line in this way: 4. Ask children to grammatically analyze these expressions: ”the line”; ”the straight line”; ”the curved line”. Match with grammar symbols. © Copyright, 2004 Page 65 Geometry Positions of a Straight Line (space) Material • • • • • • • • Box of sticks and supplies Two beakers Red coloring Spoon Piece of cloth Globe Water Plumb Line Presentation 1. Take teaspoon of red coloring and add to opaque pitcher of water. Pour an equal amount into both beakers. Shake one of the beakers and announce that we must wait for the second one to come “to rest”. 2. We say that the position of the water is horizontal. (from the word horizon…imaginary line dividing the earth from the sky). Taking red stick from box: This is a straight line. Let’s see what position this straight line takes. Placing it carefully on the surface of the water in beaker two… Now we can say that the position of this stick is horizontal. The horizontal straight line is lying on the surface of the water forming part of its surface. 3. Holding stick outside the beaker match to water level on horizontal plane: I know that the surface of the water gives me the horizontal position. 4. Ask children to take the plumb line and not to move it. When it is perfectly still: It is the image of a straight line in vertical position. With the weight of the plumb line resting on table match red stick to plumb line string: this straight line follows the vertical line of the string and it is a vertical line! Game: Take globe and ask children to find where they live. The plumb line is the imaginary line that passes through centre of © Copyright, 2004 Page 66 Geometry the Earth from any point to another on its surface. 5. The horizontal is only one position as is the vertical, but there are many many more. Demonstrate the stick in horizontal position (compared to water in beaker) and slowly move it up to vertical position (compared to plumb line. “One horizontal and one vertical and in between an infinite number of positions”. When a line is not vertical or horizontal it is oblique. Game: Say the positions as you are moving the stick… horizontal, oblique, oblique, oblique, oblique, oblique, oblique, vertical, oblique, oblique, oblique, oblique, oblique, horizontal! (next to the water) © Copyright, 2004 First the two opposite concepts of vertical and horizontal. Now the gradations in between. Children love this. Page 67 Geometry Positions of a Straight Line on a Plane Material • Geometry tack board covered in paper Presentation 1. Take three sticks that are the same and pin the first on the board. This is a straight line; look at its position. Tell me what it is! “Horizontal”. Teacher moves entire board to various positions and children respond: “oblique, oblique, oblique, vertical, oblique, oblique, etc. When we look at something that is vertical we look up and down. When it is in the position of still water, horizontal, we look left and right or right and left. When it is not vertical or horizontal it is oblique. 2. Place the other two sticks on the board. One in the oblique position and one in the vertical position. Three period lesson. Which is vertical? Horizontal? Oblique? 3. Take nomenclature for horizontal, vertical and oblique and review with children. Children can now draw horizontal, vertical and oblique lines on paper. Games: Look for straight lines in the environment with the different positions. In relation to space they are all horizontal but in relation to plane they are different. 4. Ask children to grammatically analyze these expressions: ”The straight horizontal line”; “The straight vertical line”; “The straight oblique line”. Place grammar symbols next to words. We can leave out the word “straight” and it will still be understood! © Copyright, 2004 Page 68 Geometry Parts of a Straight Line Material • Same plus two pairs of scissors Presentation 1. As before, take spools of string and pull apart to form straight line! Take a red felt pen and mark one point on this string: This is a straight line (cut it at the point). Now it is in two parts. This is a “ray” and so is the other part. It has a beginning on one side and no end on the other. The beginning is called the origin. 2. Now we mark two points with the red felt tip pen on a straight line. Two children cut string simultaneously at both points. This is a line segment. It has a beginning and an end: _________________________ segment __ __ __ _________________________ ray _________________________ __ __ __ ray Let child cut it A third child says “1, 2, 3 cut” 3. All these sticks in the box are line segments because they have a beginning and an end. Now we take the string and show how it can form an arc. Show with semicircle from stick box. 4. Children draw straight line, ray, and segment. Review the differences. © Copyright, 2004 Use classified nomenclature. Page 69 Geometry Parallel, Convergent & Divergent Lines Material • • • • Two plumb lines Two strings on two spools each Geometry accessory box Happy, sad and indifferent children’s pictures Presentation One Using plumb lines, dramatize the meaning of parallel. Parallel comes from the Greek word parallelus meaning beside one another. Play games with positions of string asking if parallel. Then two children hold two strings in fists on floor. One holds hands steady on top of each other while the other spreads hands (arms) apart while pulling the string and forms divergent lines. From the Latin “to bend apart”. Opposite procedure for convergent lines. From the Latin “to bed together”. Three period lesson. Presentation Two Take two sticks of same size and place one on the plane setting the other one aside. Now take two more sticks (as shown) and place them perpendicular to the one already pinned down. Take the second stick that you had set aside and place it perpendicular to the two others (as shown) – demonstrating these two original sticks are the exact same distance apart. Remove the “spacer” sticks. Take two “indifferent” children and demonstrate how they walk the line not caring if they will ever meet. Replace them with red arrows in both directions. © Copyright, 2004 Page 70 Geometry Form two convergent lines with sticks. (Use two different sizes of sticks to separate the lines.) Take two “smiling children” and show how they walk together towards one another. Then replace the children with red arrows. Form two divergent lines with sticks. Take two “sad” children and show how they walk apart. Then replace the children with red arrows. © Copyright, 2004 Page 71 Geometry Oblique and Perpendicular Lines Material • Two balls of yarn divided into two balls each. Presentation Children form a circle sitting on floor. Take one ball of year and roll it across so that two children on opposite sides are holding each end. Take the second ball and do the same with two different children. While the first string is held stationary, rotate the second piece of yarn by having the children pass it in clockwise direction. Do this very very slowly noting how the groups in the different sections of the circle get smaller and larger. Then notice when all the groups seem to be the same size. When they are the same size we have four equal groups and the lines are called perpendicular. Perpendicular comes from the Latin meaning “plumb line”. A plumb line that hangs true against the horizon is called perpendicular. When they are not perpendicular, they are oblique. Three period lesson. Form perpendicular and oblique lines on a plane by fixing one stick and rotating its bisector using the measuring angle. © Copyright, 2004 Page 72 Geometry C) Study of Angles Presentation: Angles 1. Work on the plane by requesting two sticks -- the second one longer and with holes all along. Fasten the second one thru the first at one end to from the vertex on the angle. Now: This is a whole angle because we have made a whole (trip around the circle is made by placing a pencil in the last hole as if it were a compass). Slowly opening the angle we say… “angle, angle, angle, straight angle.” 2. Go back to beginning and rotate top stick again saying, “angle angle, right angle. We will call this the measuring angle! (Introduce it to children.) It is our point of reference.” Now… angle, angle, angle, acute angle. This is acute because it is smaller than the measuring angle. Same procedure for obtuse angle. 3. Demonstrate that two “measuring angle” equal one straight angle; and four equal one whole angle. 4. Give the nomenclature: SIDES of an angle. SIZE of and angle. VERTEX of an angle. Three period lesson. 5. Demonstrate that the acute angle is less than the right and that the obtuse is greater than…. “Acute, acute, acute, right… Obtuse, obtuse, straight.” © Copyright, 2004 Size is also amplitude Exercise Take all the figures in the Geometry Cabinet and using the measuring angle, classify all the angles. Why?... Children will realize that as the number of sides increase the size of the angle increases. Page 73 Geometry Presentation Convex Angles / Reflex Angles As in angle presentation above, superimpose two sticks. Rotate saying acute, acute… right, obtuse, obtuse…straight, greater than straight…whole. “We have seen many acute angles, one right angle, many obtuse angles, one straight angle etc. Now: rotate again, this time as children repeat the same nomenclature but say “convex, convex…straight angle” (coinciding with children’s straight angle). Continuing past the straight angle, “reflex, reflex,…whole angle” (to coincide with children saying "whole angle”). We now point out that the acute, right and obtuse angles are CONVEX. That the straight angle is neither convex nor reflex. That the angles greater than the straight angle are REFLEX (but less than the whole angle). Teacher asks children to form any obtuse angle. The children then color one angle in red and other in blue (any color). The obtuse angle is red; the reflex angle is blue. Now we can classify these angles according to their size (amplitude). The convex angle is less than 180°; the reflex angle is greater than 180°. Etymology Concave – Latin meaning “hollow” Convex – Latin meaning “harsh” Reflex – Latin meaning “to reflect” or “to think back” Comment: A spoon represents both convex and reflex. © Copyright, 2004 If they have had the lesson on measuring angles. Page 74 Geometry Measuring Angles Materials • • • • • • • Fraction Insets Geometry Cabinet Two boxes of geometric surfaces and outlines Measuring Angle Montessori & Regular Protractor A stick A compass Presentation Teacher dramatizes task by saying we are going to measure angles and tries to do so with a regular ruler. First we measure this side, then this one and now the angle??? We must use a circle to measure and angle. The Sumerians were interested in Astronomy and studied the solar system. They were very good at measuring and kept records of everything in the form of pictography (picture writing). On a particular day they were studying one star. So they observed it here (draw dot on board) in the night sky— and every night they marked where the star was until it returned to its original position. They ended up with 360 marks and concluded that the star must have gone around in a circle. They divided the circle in these 360 parts. We call them degrees, symbolized by a little °. The stars walk around the sky. Degree comes from the Latin word meaning “step”. To measure an angle we draw an arc representing the movement of the star and write the ° representing degree. If we took this whole circle inset, we could mark 360 lines representing the star’s movement. But we use a special instrument to measure these 360 divisions called a protractor. It comes from the Latin word meaning “to substitute for, or trace”. Describe Montessori Protractor to children. 20° intervals; red dot in centre called vertex; vertical line called side. Show Montessori protractor. Show how the “whole” fraction fits in the protractor. Taking the measuring angle show how many measuring angles are © Copyright, 2004 Page 75 Geometry in the circle protractor. “4” This measuring angle was used to measure right angles and tell us about acute and obtuse angles, but with this protractor we can be more precise. Organize fraction insets as follows: 1 /3 1 /6 1 /9 1 /4 1 /5 1 /8 1 /2 1 1 /7 1 /10 (Grouping determined by increasing difficulty is reading. We start with the circle because there is only one angle making it simple) Place each fractional piece in Montessori protractor: … read the degree. Holding the 1/4 fraction: It can be called 1/4 or now we know it is 90°. Teacher measures a square inset in the protractor and reads 90°. With the 1/16 square inset it is necessary to take a stick to prolong the side in order to read the angle size. Activities: Children can measure the insets and any figures with straight sides. Now we take the regular circular protractor. Ask children to find vertex and side. Identify divisions in 10° increments. Now one can measure the surfaces and outlines of the geometric shapes. Operations with Protractor Addition is accomplished by placing two insets in the Montessori Protractor and seeing the total. Multiplication, similarly. Subtraction is accomplished as follows: 120° - 30°. Place 120° inset in protractor and move it 30° past 0 to the left and read “what is left” from the original place. AGE (for protractor operations): 7 1/2 + © Copyright, 2004 Division can be demonstrated by teaching how to bisect an angle with compass. (See any geometry book to learn how to do this with a compass and a ruler.) Page 76 Geometry Adjacent Angles Presentation Child selects four sticks – two must be the same length. Create two angles making sure that the stick that is the same length is in each one. Repeat nomenclature: sides, size, vertex. Unite the two angles on the common side. Since the common sides are the same we can eliminate one of them. Give nomenclature: side, common side, side, vertex. Adjacent angles have one vertex and one side in common. Activities: Children may construct their own adjacent angles; find adjacent angles in the environment; exercises with the geometry nomenclature Adjacent means “near or close”. It comes from the Latin “to adjoin.” © Copyright, 2004 Page 77 Geometry Vertical Angles Presentation Child selects four sticks and forms two angles. Unite the angles in such a way that the vertices are common and each side is the prolongation of the other. Remove one of the pins in the vertices and unite all four sticks with one pin. One stick is now the prolongation of the other. Nomenclature: sides, vertex, vertex, angle, angle. But these two other vertex angles (obtuse) are also angles. We have actually formed four angles that are opposite from each other. Mark each angle with a colored tack. We call each angle that is opposite from each other vertical angles. Two angles are vertical if the prolongation of the sides of one angle forms the sides of the other. Show this by replacing the individual sides with two sticks. Ask child to select one angle and find its opposite (vertical). Presentation: Vertical Angles are equal Form vertical angles on board over a letter size or A4 slip of paper. Ask child to select a pair of vertical angles and color them in. Remove the paper and cut apart in such a way that the colored angles may be superimposed. Both angles are equal. Therefore opposite vertical angles are equal. © Copyright, 2004 Page 78 Geometry © Copyright, 2004 Page 79 Geometry Complementary Angles Presentation Child selects four sticks and forms two angles. Join the angles and eliminate the “extra” common side. Fix one side and its common side to the board leaving the other side free to move. Child moves the remaining side until it forms a right angle – using the measuring angle to make sure. When two angles together form an angle equal to a right angle and therefore equal to 90°, they are called complementary angles. Complement means to “complete.” What are they completing? © Copyright, 2004 Page 80 Geometry Supplementary Angles Presentation Ask children to select four sticks and form two right angles using the measuring angle. Fasten one to the board and move the other along side it so that one side forms the prolongation of the other. Eliminate the common side and replace the two sticks with one stick. Take the measuring angle and show that we have formed two right angles, which is a straight angle. Then move the common side in either direction and show that these other angles also form a straight angle (measuring angle can be flopped at vertex). When two angles form a straight angle, and therefore equal to 180°, they are called supplementary. Supplementary comes form the Latin that means “that which is made full”. © Copyright, 2004 Page 81 Geometry Two Non-Parallel Lines Cut by a Transversal Material • • • Board Box of sticks Geometry supply box Presentation “Concepts and Terminology” Take two straight lines and attach to board. We know that these are not parallel and they go on to infinity on in both direction. This plane is subdivided by the two lines into three parts. The parts above and below are called the “external” parts and are colored in red. The part that lies between both lines is the “interior” and we color it blue. Take a third straight line (choosing stick with many holes). Fix it to the board in such a way that it “cuts” through the first two sticks. This line is called a transversal. How many angles are formed when two straight lines are cut by a third one? Lets count: 1,2,….8. Teacher places small tacks in each angle. Therefore, two straight lines cut by a transversal form eight angles. Which are the interior and exterior angles? Remember, the red area was the exterior side and the blue was the interior side! Lets count them. 1, …4 external angles. This is an interior angle. There are 1, 2, …4. Therefore, two non-parallel straight lines cut by a transversal form four exterior and four interior angles. © Copyright, 2004 Page 82 Geometry Parallel Lines Cut by a Transversal Material • • • • Two crayons Paper/newsprint Box of sticks Different colored push pins Preparation for theorems having to do with intersecting lines. Presentation 1. Set out two long parallel lines with sticks. We have interior space. We have exterior space. 2. Color interior one color and exterior, another. 3. Intersect both with a transversal (as shown.) 4. We have angles here and here. Some are interior, some are exterior. 5. Show me interior angles, exterior angles. Give derivation of “alternate”. From the Latin alternus "to do first one thing, then the other." 6. I am going to mark alternate pairs of interior angles (Each pair in a different color). Teacher makes one pair; children make the other pair. Why are they alternate? 7. We can also mark alternate pairs of exterior angles (do same as above) 8. Remove all push pins and ask children to repeat: Find exterior and interior alternate angles and mark with pins. One at a time – What have you made? Children ask each other. Follow up a) Show and mark angles in notebook b) Geometry nomenclature Another Day “Corresponding Angles” 1. Set up parallel lines but by a transversal. © Copyright, 2004 Page 83 Geometry 2. There are other relationships. Lets mark two angles on the same side of the transversal – one interior and the other exterior (e.g. yellow tacks). These are called corresponding angles. Are there other corresponding angles? Who can find the corresponding angle to this? or Teacher can set up corresponding angles and ask children – “How would you describe these angles?” ...then name them. Presentation: Exercises with Sizes of Angles 1. Draw two parallel lines across entire paper. Color exterior space one color and interior space another. 2. Draw transversal to edge of paper. 3. Lets find some alternate angles (or corresponding angles). Using two colored crayons mark either alternate interior/exterior or corresponding angles – generate the questions so that desired result is obtained. 4. Cut along transversal with scissors and remove first angle with dramatic “snip”. Can you find other places that it fits? Cut further and remove the next angle. See if it fits anywhere. Repeat with next angle. Repeat with next angle. 5. Place all cutout angles on uncut side of transversal. What do we know about all the angles? – Only two sizes. © Copyright, 2004 If they draw the transversal Page 84 Geometry 6. Children can make their own drawings. © Copyright, 2004 perpendicular– another discovery. Page 85 Geometry D) Polygons Material • • • • • Board Box of sticks Geometry supply box Piece of red string Last drawer of the Geometry Cabinet Presentation I: Introduction 1. Holding the red string: Remember this was a line segment. Here are the two end points of the line segment. Teacher places string on the “plane”. It is no longer a line segment but a curved line. 2. Take any three sticks and unite them. We have three line segments and each is separate and not the continuation of the other. Now we bend one segment as if we had broken one segment of a straight line. Now lets see if this curved line (string) is “open” or “closed”. I can go from the outside to the inside so it is opened. Now how about this broken line? It is also open. 3. Now we take this string and unite the end points (tie). How is it now? External, external, external… no way for me to get to the inside. Take the broken line and close it. External, external … no way to get inside! Show “as if” you are breaking it. Therefore we say that when we close our curve we obtain a simple curved closed region. And when we close our broken line we obtain a figure called a polygon. 4. If we chose two segments we could not make a polygon (of course one wouldn’t either). We choose three because it is the minimum possible number to form a polygon. Error! 5. Teacher takes red paper: My hand now Recall formation of geometric © Copyright, 2004 Page 86 Geometry represents the red string! Cut out the simple curved closed region with scissors. This is a region limited by a curved line. figures with chains from 1 – 9. The three chain formed first polygon. Now we cut the red paper to form the three-sided figure. This region limited by a broken line is called a polygon. 6. Exercises with geometry nomenclature. Presentation II - The Structure of Polygons 1. Ask children to choose a stick and then tell them to close a region with it. “impossible” Choose two new sticks and unite them. Do they form a region? Choose three other sticks and unite them. I have finally limited a region! All regions limited by three sticks (sides) are called Triangles. Now we choose any four sticks of any length. We can make another closed region limited by four sides. We say that all figures limited by four sides are called quadrilaterals. Continue with 5, 6, 7, 8, and 9 sticks. 2. Review what one stick forms, two sticks, three, four…nine. 3. Remove one stick and the two sticks: All these we constructed have a last name “polygon” and a first name, triangle, quadrilateral, pentagon etc. © Copyright, 2004 Page 87 Geometry E) Study of Triangles Triangles According to Sides Material • Box of Sticks Presentation 1. Ask child to give you three sticks of different lengths. Then ask for three more, two of which must be equal to (same color) one of the other three. Then ask for three more, all of which are the same as the two equal ones just obtained. 2. Ask children to construct the triangles! This triangle is scalene because… This triangle is isosceles because… This triangle is equilateral because… 3. Review the derivation of the words followed by a Three Period Lesson. Triangles According to Angles Material • • Box of Sticks Measuring triangle Presentation Lets construct triangles according to their angles. Teacher chooses the 6 cm and 8 cm sticks to make an angle exactly like this angle here, in red. (Measuring triangle). Tell children to unite the first two sticks. Then we take © Copyright, 2004 Page 88 Geometry the measuring triangle and adjust the sticks in order to form the right angle by matching. Place the black colored stick in such a way to complete the triangle. (10 cm) Now we chose two more sticks that we know will form an obtuse angle triangle when ‘closed’. Use the measuring triangle to form the obtuse angle and have children find the third stick that will close the triangle. In the same way construct an acute angled triangle. Now: What is this triangle? “Right angle”. How many right angles “one” and it has two other smaller acute angles. But the most important aspect is that it has one right angle. This triangle has three acute angles -- we can verify it with the measuring triangle. It is an acute triangle because it has all three acute angles. This triangle is obtuse angle triangle because is has one obtuse angle. Ask questions relevant to all three triangles. How many right angles, obtuse angles, etc. Try to form. Repeat: “This is a right angle triangle because….” “This is an obtuse angle triangle because….” “This is an acute angle triangle because….” We have three triangles formed by sides and three triangles formed by angles. Take the triangle drawer from the Geometry Cabinet and match the plane figures to the stick triangles. Scalene-isosceles-equilateral right angle-acute angle-obtuse angle © Copyright, 2004 Page 89 Geometry Note characteristics: One acute angle Two acute angles Three acute angles Union of the Two Characteristics Presentation Classify all previously made six triangles by sides and angles writing labels for each one. Exact the correct nomenclature in the process and give the name of acute angle isosceles equilateral triangle to the equilateral triangle. “I as the teacher know there is one missing”. Now we construct the right angle isosceles using a neutral stick. Label it. This will vary due to the nature of the children’s selections. Now we take the geometry cabinet drawer with the plane triangle figures and match them to the prepared stick triangles. Have the children identify them. We have proven beyond a shadow of a doubt that there are only seven triangles humans can construct. Exercise: Have children construct their own “Seven Triangles of Reality” and label. © Copyright, 2004 Page 90 Geometry Seven Triangles of Reality Note: The above is the ideal “seven”. The children in selecting their own sticks will probably not construct these same triangles. Number one could be an acute angles scalene. Number two could be an obtuse angle isosceles. Number 6 could be an acute angle Isosceles. We may find that it is necessary to construct other triangles to “complete” the presentation and clarify the learning experience. © Copyright, 2004 Page 91 Geometry Triangle Nomenclature Material • Box of Sticks Presentation Ask child to choose any triangle from the Geometry Cabinet. The painted area is called the “surface” of the triangle. This is a vertex of the triangle. And this is a vertex of the triangle. And this is a vertex of the triangle. How many vertices does a triangle have? These are the sides of the triangle. Let’s learn another new element. Watch as I change the position of this triangle. Each time the bottom rests on the table we call that the “base” of the triangle. The distance around the sides of the triangle is called its perimeter. © Copyright, 2004 Note. This is the nomenclature for the triangle as appears in the Geometry Nomenclature. Every nomenclature may not be the same. We use a similar process for naming the parts of quadrilaterals and regular polygons. Page 92 Geometry Altitudes/Heights of Triangles Material • • • Plane triangles form geometry cabinet Triangle Box of Constructive Triangles Altitude Stand Presentation I – “Constructive Triangles” 1. Place large grey equilateral triangle in stand. 2. Hold plumb line. What kind of line? “Vertical” 3. Move plumb line in front of table so that the line coincides with triangles vertex. We call this line the “height” ”a vertical lines connecting the vertex with the base” 4. Try with the right scalene triangle. Move the triangle to show the different bases and corresponding heights. 5. Try with obtuse isosceles triangle. Identify special case of the external height and show how dotted line is drawn. Presentation II – “Triangles from the Geometry Cabinet” Take a few triangles and explore the various altitudes of each when the base changes. © Copyright, 2004 Page 93 Geometry Other Triangle Exercises Presentation– “Orthocenter” 1. Prepare multiple paper copies of the seven triangles of reality. 2. Take one of the triangles and draw the three altitudes. 3. Where they meet is called the orthocenter. Color the intersection in red. Exercises for “Orthocenter”: Ask children to take the drawings of the seven triangles of reality and find the orthocenter for each. Etymology: orthos meaning straight centre meaning point of concurrency the point where all the straight things meet! What straight things? altitudes Concurrence of Medians Median: A line segment from the vertex to the mid point of the opposite side. All the medians of a triangle meet at a point called Centroid. © Copyright, 2004 Page 94 Geometry Concurrence of Axes The perpendicular straight line drawn from the midpoint of a line segment (in this case, each side of the triangle) is given the name axis of the line segment. The point where all the axes of the sides of a triangle meet is called the circumcenter. Concurrence of Angle Bisectors A ray that divides an angle into two equal parts is called a bisector. © Copyright, 2004 Page 95 Geometry Nomenclature for the Right Angle Triangle Presentation Ask children to construct the two right-angled triangles of reality with the sticks. They identify them: right-angled isosceles and right angled scalene. Lets add something new…. The names of the sides of a right-angled triangle are special. The two sides constituting the sides of the “measuring triangle” (demonstrate) are called legs. Leg, leg, leg, leg. When they are equal it is an isosceles triangle. When they are not equal they are referred to as major and minor legs of the scalene triangle. The third side is the hypotenuse. © Copyright, 2004 Page 96 Geometry F) Study of Quadrilaterals Introduction There are six quadrilaterals of reality. Here they are listed from the most general to specific: • • • • • • Common Quadrilateral Trapezoid Parallelogram Rectangle Rhombus Square © Copyright, 2004 Page 97 Geometry The Six Quadrilaterals of Reality Presentation 1. Ask children to choose four sticks and unite them. We count the sides; 1, 2, 3, 4. It is a common quadrilateral. We take another set of the same sticks and unite them similarly. This time we twist it slowly to form a trapezoid. Then we compare to the first one showing it is the same and then the difference. We repeat; common quadrilateral, trapezoid! So, a trapezoid is a common quadrilateral with two parallel sides. 2. Now ask the children to choose any two pairs of sticks and unite. The figure formed has two pair of parallel dies and is called the common parallelogram. Take two more identical pairs and unite. (Then “knock” slowly to form a rectangle.) This time the sides are not only parallel but they form four equal angles. That is, four right angles. Check with measuring angle. 3. Ask children to take four equal sticks. What figure? A Rhombus. Now “knock” a second set of four equal sticks into position forming a square… four equal sides, four right angles. Check with measuring angle. 4. Count the figures and repeat terminology. Then pose interpretive questions. What is this? “square” But a rhombus also has four equal sides! “The angles are all equal” etc. 5. Line up the figures according to their specificity. Begin analysis of figures as they compare to each other. Any four sided figure – common quadrilateral At least one pair of parallel sides – trapezoid © Copyright, 2004 Page 98 Geometry This one has two pairs of parallel sides and that is why it is called a parallelogram. Without looking at the angles this figure with four equal sides is a rhombus. A rectangle has four right angles. A square has two main characteristics: equal sides and equal angles. 6. What is this? “A common quadrilateral”. Is this a common quadrilateral? Continue asking this question down to the square. What is this? “A trapezoid” Is the common parallelogram a trapezoid? Yes, because it has two pair of parallel sides some call it “twice a trapezoid” Is this a trapezoid? etc down to square Is this rhombus a square? A rectangle? Is this rectangle a rhombus? A square? Is the square a rhombus? A rectangle? ”Give me” the quadrilaterals ”Give me” the trapezoid ”Give me” the parallelograms ”Give me” the rhombuses square ”Give me” the rectangles square all from here down from here down rhombus and rectangle and 7. To prove that this Note was not so with triangles we go back to the three boxes of constructive triangles. Ask the children what were these called? “Constructive triangles”. Why called “constructive”? “They construct other figures”. The triangle constructs all other figures or reality. The Diagonal 8. Take all six quadrilaterals and join two opposite vertices on each in the order to obtain a “stable” figure. What do we see? “Two triangles”. © Copyright, 2004 Note: At the end of all this work the children discover that the quadrilateral figures are not stable. It is possible to make more than one figure with the Page 99 Geometry The line segment that joins the opposite vertices is called a diagonal. same sticks. 9. Now ask the children to take their drawings of the seven triangles of reality. “I want to unite two vertices”. They will see that there are already lines (triangle’s sides) that unite the vertices. The triangle does not have a diagonal. It is only present in the figures starting with the quadrilaterals. 10. Now looks at the six quadrilaterals, each with a diagonal stick. Ask the children what they observe: “each quadrilateral has been divided into two triangles”. 11. Separate the square and the rhombus. Place both diagonals on each. What do you notice? “The diagonals of the square are the same size.” The diagonals of the rhombus are different sizes. 12. What happens when we flatten out the rhombus? ”One diagonal becomes longer, the other shorter.” 13. We have special names for the diagonals of a rhombus” longer diagonal: Major Diagonal shorter diagonal: Minor Diagonal © Copyright, 2004 Page 100 Geometry The Trapezoid Presentation 1. There are six quadrilaterals of reality. One is the trapezoid that has four different shapes according to the position of the sides and angles. 2. Nomenclature; major base, minor base, oblique side, oblique side, etc. We will see this is a scalene trapezoid. When we used the word scalene to describe the triangle we said that all the sides were different lengths. The trapezoid is scalene when the oblique sides (which can never be the bases) are different. 3. Form an isosceles trapezoid. The two opposite sides (non-parallel) are equal and this is why it is called isosceles. Take the plane inset and rotate it in its frame to prove. We have used the sides to give the name to this trapezoid. 4. Using the measuring angle, construct a right-angled trapezoid. It is a right-angled trapezoid because is has one right angle. 5. Construct an obtuse angle trapezoid. Point out that the first two trapezoids had two obtuse angles but that they were next to each other on the same side. But this time the obtuse angles must be opposite! We call this an obtuse angled trapezoid because it has two obtuse angles that are opposite. 6. Children match reading labels to figures; draw the trapezoids and writes their name. © Copyright, 2004 Page 101 Geometry G) Study of Polygons From Irregular to Regular Polygon Presentation 1. Choose any five sticks and fasten together. Since none of the sides and angles are equal we call this an irregular pentagon. 2. Choose six sticks of the same size and pin to board making sure angles are equal. (Use specially prepared cardboard angle). This is a regular hexagon. 3. Have the children construct other regular polygons. 4. Name all the regular polygons. Match them to the plane figures from the Geometry Cabinet. 5. Name the parts of the polygons. Presentation 6. Construct the diagonals for the different polygons in notebooks. © Copyright, 2004 Page 102 Geometry Apothem Presentation Demonstrate with children that a line from the centre of a regular polygon to the midpoint of one of the sides is called the Apothem. The Radius is the distance from the centre to one of the vertices. © Copyright, 2004 Page 103 Geometry Sum of the Angles of Plane Figures Material • • • • Selection of plane figures; triangles, quadrilaterals, polygons Envelope 1: Different triangles with angles marked in red. Note: All the angles of a particular triangle must have the same radius marking. Envelope 2: Quadrilaterals similarly marked. Envelope 3: Regular and irregular polygons similarly marked. OR, children can make their own by placing shape on paper and putting a dot at the vertices – then connecting them. If they make their own they need to color in the size of the angles with the same arc. Presentation 1. Choose a triangle. I am going to try to find out what the sum of the angles of this triangle is. 2. “RIP” off angles and place them together. What kind of angle did I make? “Straight angle” How many degrees? 180° Some child might say they know – “protractor” What will the children discover? “Always get 180° Ripping as opposed to cutting emphasizes angles, not triangles. They can write in their notebook: “The sum of the angles of this triangle is a straight angle or 180°.” Repeat for as many triangles as they like. © Copyright, 2004 Page 104 Geometry 3. What about four sided figures? Take one out and RIP. What did we get? Two straight angles… one whole angle 360° In their notebook: “The sum of the angles of this quadrilateral is equal to a whole angle or 360°.” 4. They can do the same for regular polygons with more than four sides and make their own discoveries. 5. Some children may want to go further with this exploration by working on the Table that follows this presentation. Through this kind of research children may come to this conclusion: 6. “The sum of the angles of a plane figure is equal to the number of sides minus 2 times 180.” N = (s-2)*180 © Copyright, 2004 Page 105 Geometry Sum of the Angles of a Polygon Chart n … … 10 9 8 7 6 5 4 3 1. How many sides have your polygon? 2. How many diagonals can you draw from one vertex? 3. How many triangles have you formed? 4. How many straight angles does your polygon contain? 5. How did you obtain the number of straight angles? 6. How many degrees make up the sum of the interior angles of your polygon? 7. How many degrees does each interior angle of your regular polygon have? 8. Is this interior angle of your regular polygon contained exactly in a whole angle? (yes/no) 9. With the corresponding tile why is it possible or is it not possible to cover a surface? © Copyright, 2004 Page 106 Geometry H) Study of The Circle In three subdivisions a) Nomenclature and Properties b) Reciprocal Relationships between a straight line and a circle c) Relationships between the position of two circles a) Nomenclature of Circle and its Properties Material • • • Board Sticks Fraction insets Note: Children already know that a circle has no end and no beginning. They have also identified circles according to size in the sixth drawer. Presentation 1. Choose any stick from box. Fasten it to the board using a red tack, which will represent the centre. Rotate, marking the circle with a red pencil. “This is a circle!” “A circular region” Teacher colors the interior of the circle red: “The circle is that part of the plane colored in red”. Compare to metal inset. 2. The center of this circle is my red tack and the radius is the stick. The circular red line that I made by rotation the radius is called the circumference. 3. Lets think in terms of distances. The radius is the distance from the centre to any point on the closed curved line… the circumference. What about the centre? It is an interior point equidistant from all the points on the circumference. To define center we need the concept of circumference. To define circumference we need concept of centre! 4. Ask children for another stick the same as the first one. Superimpose at the centre point forming a prolongation. This is called the diameter. Rotating © Copyright, 2004 Page 107 Geometry both sticks together: “all these are diameters”. What is a diameter? A line segment that unites two points on the circumference and passes through the centre. Two equal sticks form this diameter. That means D = 2 R. 5. Take a different colored pencil and draw an arc on the circumference (pencil goes through both radii superimposed). This is an arc. And so is the other part of the circumference an arc. What is and arc? A part of a circumference. 6. Unite the end points of the arc. We say this line segment is called a chord. The arc designated by the diameter is called the semi-circumference. It divides the circle in two semicircles. 7. Now we must give a name to that part of the circle cut by the chord. It is called the segment of the circle. Each part of the circle divided by the chord is a segment of the circle. 8. The part of the circle enclosed by an arc and two radii is called the sector of a circle. Not only this part, but also this other part is also a sector. Three period lesson – reinforced with classified nomenclatures This special inset can be used to describe segments of a circle. Game Take four metal insets from fraction material: ”whole” What is this? circle ” 1/3” What is this? sector ” 1/2“ What is this? semicircle ”segment” What is this? segment © Copyright, 2004 Page 108 Geometry b) Reciprocal Relationship between a Straight Line and Centre of a Circle Material • • Sticks Wooden ‘circumference’ Presentation Level 1 Case 1: “External” Stick and circle on plane. Move the stick to various external positions. Then move the circle to various external positions. They are external because they do not touch. The straight line is “external” to the circle and vice versa. Case 2: “Tangent” External, external, external…..tangent! First moving the stick towards the circle and then moving the circle towards the stick. They are tangent because they are touching, or better, because they have one point in common. Case 3: “Secant” External, external, external, tangent, secant! First moving stick towards circle and then moving the circle toward the stick. They are secant because they have two points in common. Level 2 Case 1: “External” Using a stick for a radius. Lets consider the distance between the straight line and the centre of the circle. Is the distance less than, equal to, or greater than the radius? “Greater” Now we can say that the position of a straight line is external when the distance is greater than the radius. If r=radius and d=distance then: d > r Case 2: “Tangent” Using a stick for a radius and the measuring angle. First we show that when they are tangent the radius is perpendicular © Copyright, 2004 Page 109 Geometry to the straight line (use measuring angle). They are tangent when d = r. Case 3: “Secant” The line is a secant when the distance between it and the circle is less than the radius. d < r © Copyright, 2004 Page 110 Geometry c) Relationships between the Positions of Two Circles Material • • • Two circumferences with different diameters Box of sticks New measuring angle (2) Presentation Level 1 Case 1: “External” Both circles are on plane. Move one of the other showing the external positions. How are these circles? “External”. They are external because they have no points in common. Case 2: “Internal” Place the small circle inside the large circle. They are internal because one is internal to the other and they have no points in common. Case 3: “Externally Tangent” External, external, external… tangent! They are external tangent when one is outside the other and they have one point in common. Case 4: “Internally Tangent” Now we flip the smaller circle inside the larger. They are internally tangent when one is inside the other and they have one point in common. Case 5: “Secant” Intersecting External, external, external, tangent, secant! They are secant when they have two points in common. Case 6: “Concentric” Move one circle inside the other so that they have a common centre. They are concentric when they have no points in common and have the same centre. © Copyright, 2004 Page 111 Geometry V. Area © Copyright, 2004 Page 112 Geometry Introduction “The difference between concept of Surface and concept of Area” Area is the not the same as surface. A surface is that part of the plane limited by a closed line… straight or curved. In this sense all the plane insets represent surfaces. The area is the measurement of surface. You cannot calculate “surface”, but only the area of the surface. The children are well prepared to face this subject and its concepts. They have had direct and indirect preparations for both surface and area concepts. (Red cardboard, 100 square...for surface concept; preparation through multiplication for area, insets of equivalence). When, for example, we say 9*3 it means the 9 bar taken 3 times and the answer is represented by 27 (two golden 10 bars plus 7). The surface is 9*3; the area is the result 27. Material • • “The Yellow Material” Box with 20 pieces that form: 4 rectangles 2 parallelograms 3 acute angled triangles 2 right angled triangles 2 obtuse angled triangles Segment The Rectangles Presentation “How to measure Area of a Surface” 1. What is this? “Rectangle” Nomenclature: sides, perimeter, surface, base, and altitude or base altitude. 2. How can we measure surface? We must establish a unit of surface! Draw a short segment on piece of paper, (Equal to the distance between the lines on the first rectangle.) Cut paper off at segment. Transfer this unit of measurement to two consecutive sides of this rectangle (demonstrate on reverse side of appropriate rectangle). We obtain 10 divisions on this © Copyright, 2004 Remember that in the chapter on equivalence the rectangle was the last term of comparison. Segment Page 113 Geometry side and five divisions on this. Prolong the marks on the long side and we get this (show next rectangle). But this small rectangle is still not my unit of measure. Show first rectangle again and explain what would happen if we prolonged the segments marked on the short side. We obtain five long rectangles… show third rectangle. These long rectangles are still not the unit of measure. 3. Lets create a unit of measure. Superimpose the second and third rectangle. Imagine that they are transparent. The long and short rectangles will result in this rectangle with a series of squares. Each square may be a unit of measure. 4. The unit of measure is the square. It does not have to be this particular square but any square. To measure this rectangle we could say lets count the number of squares contained in it. “50” But counting one by one takes too long! If we take five bars of ten, or ten bars of five we reach the result 50 not by adding each individual bead. In this case the factors that form 50 are 5*10 or 10*5. 5. So, we can compute the area like this … There are 10 divisions on the long side of the rectangle and five divisions on the short side: 5 * 10 = 50. To find the area of the surface we multiply the divisions on one side by the divisions on the consecutive side. If we consider the base of the rectangle as its longest side, and the altitude as its shortest, we can say that the area of the rectangle is found by measuring the measure of the base times the measure of the altitude! Make labels representing: A = area; b = base; h = altitude Match the labels to the rectangle. At this point we can formulate the formula A = b × h A = bh simplified © Copyright, 2004 € We could also say: A= ba (Little a = altitude) Page 114 Geometry Common Parallelogram Presentation 1. Ask children to identify common parallelogram. Now lets count the squares. But not all are complete. In order to count them what must we do? Take the parallelogram (in two pieces… as shown) and superimpose over first parallelogram. They are equivalent! Remove first one. Move small triangular piece to form rectangle. Now count the squares. Same as first rectangle. Remove the two-piece rectangle. Take the original parallelogram and the first rectangle and state that they equivalent. 2. The area of the parallelograms surface is calculated in the same way as the rectangles because their bases and altitudes are the same. 3. Derive the formula: A = bh 4. Form the inverse relationships: b = A h h=Ab 5. Note that the presentation sequence for this whole section will follow a general scheme: (1) Identity figure; counting the squares; sensorial experience of equality. (2) Verbal organization of rule. (3) Derivation of formula © Copyright, 2004 Page 115 Geometry Triangles Acute Angled Triangle Method I 1. Identify the figures. Can we count the squares? “No” Need a mediator. Take two “half” triangles and place over original triangle to verify congruency. Triangles classified according to angles. Now place these halves in such a way that we form a square with the three triangles. Now we can count the squares…. 100. The original triangle is equivalent to 1/2 the square, having the same base and same altitude. 2. What is the area? The area of the square would be equal to its base times its altitude. But we only want half of it since we are looking at the triangle that represents half the square. 3. We can write: A = b h 2 Method II 4. Demonstrate that triangle formed of “two halves” is congruent to whole triangle. Substitute the two halves. Can we count the squares? By flipping-over right hand triangle we can form a rectangle with these two halves. This rectangle is equivalent to the original rectangle. 5. The area of this new rectangle is therefore the same as the original one. Note that the base is equal to half the base of the whole triangle and the altitudes are the same. 6. We can write: A = b h 2 7. Inverse rules; (see section after Method III) © Copyright, 2004 Page 116 Geometry Method III 8. Select mediator as illustrated and demonstrate congruency to whole triangle. Substitute mediator. Explain construction of mediator. Now we can count the squares? “No” flip over two smaller triangles as shown and form rectangle. This rectangle is equivalent to our original rectangle. 9. The area is therefore the same. Note that the base of this rectangle is equal to the base of the triangle while its altitude is half of the triangles altitude. 10. We can write: A = b © Copyright, 2004 h 2 Page 117 Geometry Right Angled Triangles Method I 1. Take right-angled triangle and count squares…. Not possible. Take another right-angled isosceles triangle and demonstrate congruence. Combine both triangles in such a way that they form halves of the resultant square. Now we can see the resultant area is 100 (10*10). 2. We double the area of the triangle and obtained an area of 100. This 100 is equal to the height times the base. If we only are concerned with the triangle’s area, it must be half of that. 3. Therefore… A = b h 2 Method II 4. Again the right-angled triangle. Can we count the squares? “No”. Need a mediator. Take mediator and demonstrate congruency… substitute. Explain how mediator is formed… obtaining trapezoid and similar triangle. Move smaller part of mediator in such a way that we form a rectangle equivalent to our original rectangle. Demonstrate. 5. Note that this rectangle was formed by “taking” 1/2 the base of the triangle. Its height is the same as that of the triangle. 6. Since the areas of the two equivalent rectangles are the same, we can now express the area in our formula. 7. A= h b/2 b h 2 © Copyright, 2004 Page 118 Geometry Method III Same pattern as before with result being: A = b © Copyright, 2004 h 2 Page 119 Geometry Obtuse Angled Triangles Method I 1. Count squares of obtuse angled triangle? “No”. Take mediator and demonstrate congruency. Then place it as illustrated to form parallelogram. Can we count the squares now? “No”. But we already know how to compute area of parallelogram. 2. Since the area of the parallelogram is equal to its base times its height, then the area of one of these triangles must be half of that. 3. A = bh 2 Method II 4. Count squares of triangle? “No”. Take mediator and demonstrate congruency. Substitute. Place mediator as shown in illustration, locate altitude. Now, move outer-part of triangle in such a way that we have formed a parallelogram. 5. Area of this parallelogram is A = bh Q.E.D. Now we can see that see that this parallelogram, which is equivalent to our obtuse-angled triangle has an altitude equal to the triangle’s and a base equal to half of the triangle’s. 6. A= b h 2 Note: It is unnecessary to go “one-step” further and make the rectangle from the PG. © Copyright, 2004 Page 120 Geometry Method III Same procedure as above following the illustrations. Resultant formula will be: A=b h 2 Exercises/Activities Children construct figures on graph paper (squares not equal to material). Children construct figures of different sizes to prove formulas. Direct Aims: Calculate area of some plane figures. Concept that the square is a unit of measure… Noting that the “triangle is the “constructor; the square is the “measure”. Indirect Aim: Preparation for calculation of lateral and total surface solids. © Copyright, 2004 Page 121 Geometry Square Material • • Square metal inset Yellow “area” rectangle Presentation 1. Identification of square; side, side, side, side, (turn, rotate). Like this … base, height. Cover “half” of the rectangle with the square inset. How many squares are covered? “25” How can this 25 be obtained? 5 x 5 2. We could consider one five the base and the other the height. But the base and height are both equal to the side of the square “s”. Then, in place of “b” we could write “s” and in place of “h” we could write “s”. In fact, we can say side (s) times side (s) instead of base (b) times height (h). A =b×h 3. A = s × s A = s2 4. Inverse Rule: If we know “A” how can we find “s”? € A = s 2 ,…. s 2 = A , … s = ? By removing the exponent we have divided the side by itself s × s s … What do we do with A? © Copyright, 2004 s= Application of principle used for comprehension of square root. A Page 122 Geometry Rhombus Method I Demonstrate with insets of equivalence Frame 4. By showing that the rhombus is equivalent to the rectangle we can say that its area is computed the same way QED. A = bh Method II Take rectangular piece of paper and fold in fourths. Draw thick lines in each fold as shown. Green lines join the red and blue lines and form the outline of the rhombus. Cut out rhombus and reconstruct rectangle as shown. 1. Identify the long diagonal D, and the short diagonal d. Observe that the base of the rectangle is the same as D and the altitude is the same as d. Remove the 4 “outer” triangles and form another congruent rhombus. Now, if the area of the rectangle is b x h, we can say that, in this case D x d will give us the area of the rectangle. Furthermore, since the rhombus is 1/2 of the rectangle, the area of the rhombus can be expressed as below. 2. A = Dd / 2 © Copyright, 2004 Page 123 Geometry Method III – 1 “Using Paper Illustrations” 3. Take only the “interior rhombus from Method II and cut along the shorter diagonal. Then cut out half of the half along the red line. 4. Position pieces of rhombus as illustrated to form rectangle. We can see that the altitude of this rectangle is equal to half the longer diagonal, while its base is equal to the shorter diagonal. We know the area of the rectangle is equal to base times height. Since the rectangle is equivalent to the rhombus, we can substitute “D” and “d” as follows… 5. A= D d 2 Method IV – 1 “Using Paper Illustrations” 6. Take rhombus, which was used in Method II and cut the other half in half, positioning pieces as illustrated. 7. Reposition pieces to form rectangle whose altitude is equal to half of the shorter diagonal and whose base is equal to the longer diagonal of the rhombus. 8. A=D d 2 Method V – 1 “Use of Insets of Equivalence” Remove one of the equilateral triangles from Frame 3 and replace it with equivalent halves from Frame 4. Identify the long and short diagonals. Remove the two halves and place around equilateral triangle as shown (to form rectangle). © Copyright, 2004 Page 124 Geometry This demonstrates that… A = D d 2 Method V – 2 “Use of Insets of Equivalence” Place Frame 3 in alternate position as shown. Take the first figure of Frame 13 and remove the bottom half and place in Frame 3. Now take the two smaller pieces from Frame 4 and complete the rhombus in Frame 2. Moving the two smaller pieces around, we obtain a rectangle. By examining this rectangle we can demonstrate… A=D d 2 © Copyright, 2004 Page 125 Geometry Trapezoid There are two approaches to solve for computation of the area of the trapezoid. One would transform the trapezoid to the rectangle through the FRAME of Equivalence insets. The second, preferred by Dr Montessori uses the triangle as mediator. Specifically, Dr Montessori demonstrates the “triangle” approach by using the blue triangles in the second box of the first series of constructive triangles. That is, the two blue triangles that will form a trapezoid. Method I 1. Take the two blue triangles from the second box, first series, of constructive triangles and form trapezoid. (Older material required “flipping” over the smaller triangle) 2. We can see that the base of the triangle is equal to the sum of the bases of the trapezoid and that the altitude of the triangle is equal to the altitude of the trapezoid. We have seen that this triangle is equivalent to the trapezoid. Since the area of the triangle is 1/2bh, we can substitute (B + b) for b, and obtain the formula for the trapezoid. 3. A= ( B + b) h 2 © Copyright, 2004 Page 126 Geometry Method II 4. Draw any trapezoid. Prolong the major base and mark off a distance equal to the minor base. Join point “x” to point “y”. The part of the trapezoid that is above the line xy is cutout and placed in position shown to form a triangle. 5. We can see that the area of this triangle is equivalent to the trapezoid. The base of the triangle is now the sum of the major and minor bases of the trapezoid and it s altitude is equal to the trapezoid’s. 6. A= ( B + b) h 2 © Copyright, 2004 Page 127 Geometry Polygons For demonstrating equivalence Montessori transforms the polygon (decagon) into a rectangle. But in working with areas, the Montessori solution is to use the triangle as mediator. Why? Because it is not necessary to have the rectangle in order to “count” the squares. The triangle formulas have been proven and are much more suitable for the area demonstration. Note for teacher… In all regular polygons there is always a constant, irrational number that enables us to calculate the area by knowing one side. This is an advance study. Method I Regular Polygon Conclusion from work with the insets of equivalence: The regular decagon, Frame 8, is equivalent to the rectangle, Frames 9 and 10. Make labels for Perimeter (P), half perimeter (P/2), altitude (a) and half altitude (a/2). One rectangle demonstrates that the base is P/2 and altitude as “a”. The other rectangle shows the base as “b” and the altitude as “a/2”. A= P a 2 A=P € a 2 Method II The Apothem Material • • • • Regular Polygons from Geometry Cabinet Frame/inset… Triangle inscribed in circle Frame/inset… Square in fourths, by diagonals Largest Circle form Geometry Cabinet © Copyright, 2004 Page 128 Geometry Presentation 1. Remove inscribed triangle. Remove two triangles of the large square to form a smaller square inscribable in 10 cm circle. 2. Verify that all the polygons, triangle thru decagon are inscribable in the 10cm Frame of circle. The apothem is the perpendicular line joining the centre (knob) of each inset and the base of the polygon -- the radius of the inscribed circle. 3. There is also an apothem in a square and triangle, which can be seen by drawing the “inscribed” circle and joining the mid point and the point tangent to the base. 4. Children trace all the regular polygons and draw the apothem in red. They identify the side of the polygon that will be considered the base in “blue”. 5. Children compare the two lines in each polygon and identify which is shorter, or longer. This triangle is used because it is inscribable in a 10cm circle. We are heading towards a ratio between the length of the side and the apothem. This is done with all polygons through the decagon. as as as as as as Statements concerning the above comparison: From the triangle to the hexagon a s From the heptagon to the decagon, ad infinitum… a s © Copyright, 2004 Page 129 Geometry In advanced geometry we can calculate the exact ratios for computation of area. © Copyright, 2004 Page 130 Geometry Method III “Used by Mathematicians” Take any regular polygon (e.g. pentagon). Divide into triangles and locate apothem as illustrated. Separate pentagon so that each side is adjacent as shown in (1) below. (1) (2) Draw “triangle” line and show relocation of pieces with colored dots indicated where “cut off” triangle would fit. (Note: Line may be drawn from any vertex. e.g. One could draw the dotted line from the center triangle to each end of the base.) © Copyright, 2004 Page 131 Geometry (3) h = apothem b = perimeter of pentagon Therefore: A( triangle ) = bh ap = A( pentagon ) = 2 2 (4) € All five triangles above are equivalent because all have the same base and height. © Copyright, 2004 Page 132 Geometry The Circle The circle as the limit of regular polygons Material • • • • Circle Drawer Regular Polygon Drawer Inscribed Equilateral Triangle Square Inset + 4ths Presentation 1. Take frame of largest circle from geometry cabinet and place the equilateral triangle in it. Point out the three uncovered spaces. Repeat with all the regular polygons form the square to the decagon. 2. Children will recognize that as the number of sides of the polygon increases, the spaces get smaller. If we had a regular polygon of twenty sides, 100, or 1000 sides the spaces would continue to get smaller but their number would increase. 3. Place the circle inset in its frame. Ah! How many sides! They can’t be counted… infinite. The circle is a regular polygon of an infinite number of sides. Each point on the circumference is a side of the circle. © Copyright, 2004 Aim: This exercise has as its aim to identify regular polygons to the circle. Page 133 Geometry Transfer of Polygon Nomenclature to the Circle Material Circle and Decagon insets • Presentation List the nomenclature of both simultaneously: Decagon • • • • Has side Group of sides/perimeter Has a centre Line segment from its centre to side is apothem Circle Has no side, just point Group of sides/circumference • Has a centre • Line segment from centre to circumference… radius Therefore the circle also has a perimeter and an apothem… just different names. • • Measuring the Circumference 1. We know the perimeter of this decagon is equal to the number of sides “n”, times their measure. What about the circle? Perhaps we could transfer the measure with a string! But that would apply for just this one circle. 2. Trace a line on board. Take largest inset of circle, and mark a starting point on its edge. Also make a starting point on line. Join both starting points and “roll” circle until the mark touches the line again. Identify that point on the line. This line segment represents the circumference. A most exciting discovery for children and adults. Carefully so that circle does not slip. 3. On the same line, mark off the number of diameters that are contained in that line segment. “Three plus a small fraction”. Do the same with the five remaining circles in the draw © Copyright, 2004 Page 134 Geometry (9,8,7,6, and 5cm). Also do it with circles of 4,3,2, and 1cm diameters. The same result! Each diameter is contained in its circumference three times plus a fraction. Two ways to determine that Fractional Part 4. Take slip of paper and mark off that left over fractional part. Note that it is contained in the line segment a little tiny bit more than seven times because there are seven of these little fractional parts in this segment (left after the three diameters have been measured out). It has a value of about 1/7 the diameter. 5. Take a circle with a diameter of 10 centimeters and divide its circumference into 100 parts. The left over fractional part will correspond to 14 millimeters. Hence, the diameter is 3.14 times the circumference. Good time for History of (You can use the centesimal circle.) π: π The Greeks have a name to this number. “P” in Greek is . Instead of writing 3.14 we could write . Emphasize that it is an irrational number. We have only identified two decimal places. There are many more 3.141589…. π € (100-page book!) How can we calculate with circumference? We must know the diameter. Since the diameter is a line segment we can measure it, and we can use this . € € π π The circumference is contained in the diameter times. If I know the diameter, how can I find the circumference? We must repeat the diameter, times. π € Put out all the circles in order from 1 – 10 cm: π π In this circle, d = 1….. C = In this circle, d = 2…..C = 2 € etcetera through 10 cm circle. € Now, if d = 1, and π = 3.14 then C = 3.14 If d = 2, and π = 3.14 then C = 6.28 etcetera through to d=10. € € € € © Copyright, 2004 Now have built a set of fixed numbers that are multiples of Π . Page 135 Geometry Organization of Rule and Formula The circumference is equal to the diameter times the constant . Substituting C, d and we get: C = d π π π Instead of the diameter we could express this in terms of the radius: C = 2rπ , or C = 2πr € € € € € Exercises Children calculate the circumference of all the circles available in the material. Children do the same with circles that they make themselves. © Copyright, 2004 Page 136 Geometry The Area of the Circle Material • • • Yellow and green cardboard circles Sectors of each circle Rectangles Presentation 1. We know the formula for the regular decagon: A= p×a If we substitute “C” for “p” and “r” for “a” then 2 we would probably obtain the formula for the circle: A= C×r Now we must prove it! 2 2. Take the green and yellow circles and their corresponding sectors and demonstrate by superimposition that the union of the sectors is congruent to its respective circle. Remove the yellow and green “wholes” and retain the yellow and green circles comprised of ten tenths. 3. Arrange the yellow sectors as follows: 4. The resultant figure is equivalent to the yellow circle. Now take the green sectors and arrange them as shown. 5. The resultant figure is “more or less” a rectangle. It is not exact because its base is made of arcs which when placed all together form the circumference. Suppose that the sectors were smaller, then the arcs © Copyright, 2004 Page 137 Geometry would also be smaller approximating a straight line. 6. Superimpose the green rectangle over the “sort of” rectangle above. This new rectangle is more accurate. Its base is underlined in black corresponding to the circumference of the circle. Its height is equal to the radius. But this rectangle is equal to two circles. We have here the area of two circles. We must divide the product of its base x height (or, as previously indicated… its circumference x radius) by 2. First way A = C × r 2 Since C = 2πr, (2πr) × r = πr 2 2 € Now to prove second way: A = πr 2 Second way A = 7. We know that this rectangle is equivalent to two circles. € We can see that the green rectangle is the same size as € rectangles. Superimpose to prove. two of the yellow 8. Now remove the green rectangle and one of the yellow rectangles. 9. With one of the yellow sectors show that the height of the remaining yellow rectangle is equal to “r”. Use the yellow circle to show that the side of the sector is the same as “r”: Also demonstrate that the dimensions of the “squares” contained in this rectangle are “r” x “r”. Therefore, each square represents the square of the radius. How many are there? Measuring with the sector we see that there are 1, 2, 3, plus a fractional part and we know that this fractional part is 1/7 or .14…. 10. The rectangle is formed of 3.14… r2’s; or r2 taken π © Copyright, 2004 € Method One: circumference important Page 138 Geometry times. Therefore: A = πr 2 Method Two: r2 important € © Copyright, 2004 Page 139 Geometry The Area of the Sector Material • • • Metal Fractional Circle insets Frame 8 (Decagon) of Insets of Equivalence Montessori Protractor (for the second proof) Presentation 1. Select the circles divided into thirds and tenths. Remove ⅓ from inset of thirds and identify it as sector referring to geometry nomenclature. We also can identify the remaining 2/3 as a sector. Children will work with all. 2. Do the same with all the fractions from 1/4 thought 1/9. Now demonstrate the same with the 10ths. 3. Take a 1/10 sector of the circle and a 1/10 from Frame 8… isosceles triangle of the decagon. Superimpose! They almost correspond because the angle at the centre has the same measure. One is limited by an arc and the other by a line segment. We compare these two because the circle is the polygon of infinite sides and the decagon is the largest regular polygon we have. The triangle: Here is the base. The altitude passes through the knob. The sector: Where is the base? “Arc”. The height passes through the knob. It is evident that the “height” is equal to the radius, which is equal to the sides of the sector. The area of a triangle: b h/2…substitute “a” (arc) for base and “r” for height sector area A = ar 2 4. But how can we determine the length of the arc? Montessori chooses the 10cm circle to make the calculations simple. Since we are using the 10 cm circle we know that the circumference will be 3.14… Furthermore, the sector © Copyright, 2004 Page 140 Geometry represents 1/10 of the circle… therefore the arc must be 1 /10 of the circumference, or 3.14. We also know that the radius of the circle is 5 cm. Therefore, A = 3.14 × 5 = 7.85cm 2 2 Similarly repeat with other fractional parts. © Copyright, 2004 Page 141 Geometry Area of a Segment Material • • • Equilateral Triangle inscribed in circle Circle fraction inset of 3rds Circle fraction inset of halves Presentation 1. Remove one segment from the inset of the inscribed equilateral triangle. Identify it as a segment referring to classified nomenclature. Note that remaining part is also a segment of the circle. One segment is smaller than 1/2 the circle and the other is greater than 1/2 circle. Use the 1/2 circle to demonstrate. Segment of Circle Smaller than 1/2 Circle 2. Remove 1/3 from the (fraction) circle frame of thirds and place in the segment from inscribed equilateral triangle inset, filling in the empty space. 3. This segment is equal to the removed sector (1/3) less the “exposed” isosceles triangle. The base of the triangle corresponds to a chord of the circle and the altitude of the triangle unites the centre of the circle with the midpoint of the chord. Area of the sector = a×r 2 Area of the triangle = Area of Segment = b×h Substituting “K” (chord) for “b”…. 2 ar Kh ar − Kh − = 2 2 2 4. This is the area of the segment when it is less than 1/2 the © Copyright, 2004 Page 142 Geometry circle. Segment of Circle Greater than ½ Circle 5. It will be equal to the Area of the “large” sector plus the area of the equilateral triangle. Area of Segment = ar + Kh (“a” will be the length of the 2 large arc) Therefore: A = ar ± Kh 2 Area of the Ring A = πr 2 − πr 2 = π (R 2 − r 2 ) € © Copyright, 2004 Page 143 Geometry The Ellipsis (Ellipse) Material • • • • Cylinder Frame/inset from Geometry Cabinet Circle Frame/inset from Geometry Cabinet Ice cream cone Toilet paper cylinder Presentation 1. This is a cylinder. Identify its base and its height. Holding a sheet of paper. This paper is a plane. First show the plane parallel to the base and then not parallel. Toilet paper cylinder 2. Cut the cylinder through a plane not parallel to the base and place the “plane” in between cutout. 3. Take the cone and identify it. Similarly show the “plane” parallel to the cone’s one base and then not parallel to the base. Cut the cone as we have the cylinder on a plane not parallel to the base and put plane in between cutout. 4. With the two parts of the cylinder: Follow the cut part with your finger. This is an ellipse. And so is the other part of the cutout. Shows child how ellipse originated! By varying the angle of the “cuttingplane, as we approach 90°, we approach the circle. Create a supplementary six-page nomenclature for study of the ellipse. With the two parts of the cone, repeat same process. © Copyright, 2004 Page 144 Geometry 5. This figure is called an ellipse or ellipsis. Ellipsis means “something missing”. But what is missing? Something is missing compared to another! What are we comparing it to? The circle. Take the inset frame of the circle and place the ellipsis inside. What is it that is missing? The uncovered parts. 6. With the large 10cm frame circumscribed about the ellipse we see that its diameter is the same as the axis of symmetry (major). Now take the 6 cm circle from its frame and place it in the frame of the ellipsis. Now we see the minor axis of symmetry equals the diameter of this circle. (In this illustration we might also point out the derivation of the technical name for the ellipse: Prolate Circle.) 7. Construct drawing as seen in illustration. We can clearly see the major and minor axis of symmetry as they correspond to the diameters of the 10 and 6 cm circles. The conic closed curved line is called an ellipse. The circular closed curved lines whose points are equidistant from the centre is called a circle. Take the drawing of the ellipse and the drawing of either circle and compare the two: Major axis of symmetry: diameter of circle Minor axis of symmetry: diameter of circle Centre of symmetry: centre of circle 8. Radius of circle, we can call it “a”. Other radius, we can call it “b”. Now, we know that the circle is the limit of regions closed by a curved line. So, the axes of symmetry in an ellipse are different than the diameters of a circle because they have different lengths in an ellipse. 9. Identify the major axis of symmetry as “2a”; its semi axis will be “a”. Identify the minor axis of symmetry as “2b”; its © Copyright, 2004 Page 145 Geometry semi axis will be “b”. We can call the horizontal axis of the circle “a” and the vertical axis of the circle “b”. Then, a =r b=r and , a=b We can say: A = πr × r Substituting “a” for “r” and “b” for “r” we get… A = πab ; π times the length of the semi axis. € € € How to Construct an Ellipse 10. Draw a line segment. Locate two points with stars and call them foci. The foci lie on the major axis of symmetry. 11. The green line represents the distance between the foci and we identify it as “2c”… Then, “c” will be ½ distance between the foci. Keppler’s law: The orbit followed by the earth is an ellipsis where the sun occupies one of the two foci. Identify the foci as F and F1. 2c=FF1 If “O” is centre of symmetry, c = O =OF1 = FO 12. Take string and tie knot on either end so that they are “FF1” apart. With thumbtacks in F and © Copyright, 2004 Page 146 Geometry F1 place loop around each and scribe circle. The loop represents the distance from the foci to the vertex of the ellipse. In our example we have formed an ellipse with the string that is four times the size of the one in the material. Area of the Ellipse inset = AΠab = Π × 5 × 3 = 15Π The area of the ellipse we drew will be 16 times that!! © Copyright, 2004 Page 147 Geometry The Tiling Game Material Board to places tiles… represents a “surface”. The following shapes (six of each): • • • • • • • • • • • • • • Regular Pentagon Regular nonagon Regular decagon Regular octagon Circle Regular hexagon Regular heptagon Flower Other flower Square Equilateral triangle Rectangle (½square) Rhombus Other figures Green brown orange green blue green pink gray orange yellow red green Level 1 How can we Tile a Surface? With equilateral triangles? with squares? with rectangles? with rhombi? with pentagon? with hexagon? with heptagon? with octagon? with nonagon? with decagon? with circle? with flower? with flower? © Copyright, 2004 Yes Yes Yes Yes No Yes No No No No No No No Page 148 Geometry Examine those Cases of Possibility Analyzing the equilateral triangle, square, rectangle, rhombi, and hexagon we find that each ahs an underlying characteristic that permits us to place them on a surface in such a way that there are no “spaces” in between them. This characteristic is the fact that each of their interior angles is contained in 360° an exact number of times. In other words, they can form a whole angle! Level 2 Examining the Impossible Cases Basic reason is because their angles are not sub-multiples of the whole angle. If we want to sue these to cover our surface we must employ mediators. Regular Pentagon. Rhombus whose acute angle = 360° - 3(108°) Obtuse angle = 360° - 2(108°) Heptagon: ”Bow-Tie”, eight sided figure, or two irregular pentagons © Copyright, 2004 Page 149 Geometry Octagon: Square with sides = sides of octagon Nonagon: Irregular dodecagon “can be split” into two equivalent figures. Decagon: © Copyright, 2004 Page 150 Geometry Irregular concave hexagon. A butterfly. Two trapezoids. Circle: Internal curvilinear square; Internal curvilinear triangle Quatrefoil: © Copyright, 2004 Page 151 Geometry Second flower: Curvilinear square similar to the one made with circles. © Copyright, 2004 Page 152 Geometry VI. Volume © Copyright, 2004 Page 153 Geometry Volume Material • • • • • • • • • Red rods Brown stairs Pink tower Series of Solid Insets Series of small geometrical solids Box of 250 cubes Rectangles of the yellow material Series of cubes from the cabinet of powers Ten 100 squares Introduction This work will follow similar pattern as work with areas… the starting point is the same. The Solids Concept of Solid: The children have already had this concept in children’s house. Through the education of the visual senses there is a perfecting of the concept of size. This has been developed in children’s house with: Blocks (stairs, rods, cubes) Series of Solid Insets Small geometrical solids. Ellipsoid Concept of Volume: This is the measurement of the solid. We have led the way with the first presentation of the decimal system with the golden bead material. We first explained that “this is 100”... then we superimposed more of the same squares increasing the thickness of the “body” until we reached 1000. Cube (regular hexahedron) We must point out to the children that all things in reality are three-dimensional. Ovoid Sphere Right Circular cone Equilateral cylinder Regular hexagonal right prism Regular triangular pyramid Right rhombic Parallelepiped Regular Parallelepiped (rectangular solid) Square-based rectangular solid Right circular cylinder Right square pyramid © Copyright, 2004 Page 154 Geometry Presentation 1. Take 12 small cubes from the box containing 250 cubes. Line them up in a row (a) noting that there are only two positions that are different since one face is a square. (a) 2. Form figure (b). Note there are three different positions this solid can take. (b) 3. Form figure (c). Only two positions. (c) 4. Form figure (d). Again, three positions are possible. 5. All four are equivalent figures because they are formed by the same number of units (cubes). (d) Volume of the Square Based Rectangular Solid 1. Take large brown stair. Compare it to the large blue rectangular solid… they are the same! 2. How can we measure this blue solid? We note that two of the surfaces are squares. Then we take our predetermined unit of measure (2cm) and mark off five units on the side of the square. If we cut this block at the places where we marked it, we will obtain five slices. 3. But these “slices” do not represent the unit of measure that we are going to use for measuring volume! © Copyright, 2004 Page 155 Geometry Take one of the slices and mark with our “measuring slip” the short and long side of one of the rectangular faces of one slice. If we draw the lines as we did with the area material we obtain the result seen in the second slice. The result of the individual cuts will be cubes equal to the wooden cube, which will be our unit of measure. 4. We want to know how many cubes of this size are contained in this large squarebased yellow rectangular solid. This box of wooden cubes has the number of individual cubes that corresponds to the yellow one. 5. Since each “slice” is composed of 50 cubes, the whole SBRS will be 250 cubes. The cube is the unit of space… volume. Any cube! Why do we analyze volume as above? Children see that need for decomposing the solid into cubes for measuring volume? At this point we deviate: Noting work of Froebel on the sphere, cylinder and cube. The cylinder is the mediator between curved and plane surfaced figures. The cube and sphere are conceptually the “perfect” solids because they are the same in all position as and because all spheres of reality are similar as are all cubes of reality. 6. Since we can’t always separate the solid into cubes, just as we could not separate all plane figures into square, we must find another way! Three methods © Copyright, 2004 Page 156 Geometry 1. Isolate the three edges common to one vertex as shown. (5x5x10) 2. Form square base and line of height as shown. (5x5) x 10 3. The rectangular face (50) times width (5). This method is not used because we are considering the solids in a particular position and are recalling all the indirect preparations of passing from the square (the base) to the cube -- with decimal system material. 7. In the first case we see that the volume is the product of the three dimensions; in the second case we see that the volume is the product of the area of one side (base) times the length of the third side (height). 8. Nomenclature: The three dimensions of the solid are represented by a, b, and c. V = abc or, V = (ab)c Note that the height is always the third dimension. 9. Identify the figure as a square based rectangular solid. This will be our point of reference at the level of volume just as the rectangle was at the level of area. © Copyright, 2004 Page 157 Geometry Volume of Other Figures –“Blue Solids” Material Box 1 • • • • • Regular triangle right prism Regular triangle right prism (2 pieces) Right rhombic parallelepiped Regular hexagonal right prism Regular hexagonal right prism (3 pieces) Box 2 • • • • • • • • • Right triangular prisms (1 tall, 1 short) Regular triangular pyramid Square based rectangular solids (tall and short) Right square pyramid Right circular cylinder (tall and short) Right circular cone Ovoid Ellipsoid Sphere Solids A) Prisms B) Pyramids C) Solids of Rotation © Copyright, 2004 Page 158 Geometry Prisms Regular Triangle Right Prism 1. Identify regular triangle right prism oriented as shown. Identify the two possible bases and the other three faces. Where does the name come from? ”Regular” because it is equilateral triangle at bases. “Right” because the edge that forms its height is perpendicular to its base. 2. Compare this figure to the blue square based rectangular prism. Sides are same but bases are different. The secret lies in the base. 3. How can we calculate its area? We can’t count cubes, as we have learned when we could not count squares in area work. So, we need a mediator… Same figures divided in half by slicing through the altitude of the equilateral triangle. Join both figures as shown and compare to blue square based rectangular solid. 4. We note that they are not the same. Why? Because we have shown that their sides were equal, and when we sliced it in half, the new side because the side of the new figure. And, the new side we equal to the altitude of the equilateral triangle… and altitude of an equilateral triangle does not equal side. It would have to have been an isosceles base for the two figures to be the same. 5. In this way we can apply the formula: V = Ab × h QED but, since we are seeking the volume of the triangular prism we must take half of that… V = Ab h 2 6. Working with Mediator Alone: Ask children to take both halves of the triangular prism and to construct a solid whose cubes are countable. They will discover that by inverting one of the halves they can form a rectangular parallelepiped… all the other figures are not divisible into cubes. © Copyright, 2004 Page 159 Geometry We know that the regular triangular right prism is equivalent to this parallelepiped… whole volume will be the Area of its base times the height. But the base of this rectangular solid will have an area that can be computed as ½ b h (as compared to the base of the triangular prism). We can further extend the formula as follows: V = Ab h 2 All solids we examine will have same height. Therefore, the bases will hold the ‘key’. Right Rhombic Parallelepiped 1. Classify figures by examining base “right rhombic parallelepiped”. We cannot count its cubes so must have a mediator. Take the mediator and the “whole” used to determine the volume of the regular triangular right prism. 2. Form the RRP with the mediator and sensorially show equivalence. Se aside RRP and work with three-part mediator. We must form a solid that can be divided into cubes. The resultant solid is the same as the one we formed in the triangular right prism proof above… rectangular parallelepiped. We know its volume is equal to the product of the area of its base and height. 3. We also know that the Area of a rhombus is the product of its diagonals divided by 2 QED. Substituting we obtain: © Copyright, 2004 Page 160 Geometry V = d×D h 2 Regular Hexagonal Right Prism 1. Study the base and identify the solid as regular hexagonal right prism. Demonstrate with 10 cm frame/inset of the circle that the 10 cm circle is inscribed in the hexagonal base. With the hexagon inset demonstrate that it coincides with the midpoints of the hexagonal base. 2. To find the volume of this solid we must divide it into cubes; so we need a mediator. This mediator is constructed by tracing a line through one vertex to the next non-consecutive vertex obtaining an isosceles obtuse angled triangle. Then slicing through the solid we obtain a right triangular prism. With this prism we draw its only internal altitude and slice it. 3. Now the children must discover how to manipulate these pieces in order to obtain a “cubable” solid. The result is a rectangular parallelepiped, which we have sensorially demonstrated is equivalent to the regular hexagonal right prism because their bases are equivalent and they have the same height. 4. Relationship of Lines. Now we take the two small pieces and form an equilateral triangle. By placing them on the © Copyright, 2004 Page 161 Geometry hexagonal solid we can see that its altitude is the apothem of the hexagon. We also note that this special altitude/apothem is equal to ½ the special chord used to determine the mediator. (We observe this because the apothem is the radius of the inscribed circle). In addition, the altitude determines the base/2. 5. Reforming the rectangular parallelepiped we can label its sides as follows: 1 side =2a 1 side: 1 2 12 6 the perimeter of the hexagon = + 1 × 1 (½ the base of the 2 6 equilateral triangle = ½ side of hexagon = 2 12 + 1 = 3 = 1 …which is p/4 of the 12 12 4 hexagon. 6. We have previously encountered three formulas for the area of the polygon. Now we can construct a fourth: 1) p a 2 2) p a 2 3) p a 2 p 2a substituting this in the volume 4 formula we obtain:€ 4) : V R. Hex. P = Ab × h = © Copyright, 2004 p 2ah 4 Page 162 Geometry Pyramids Right Square Pyramid 1. What is a pyramid? From the Egyptians “pyr” meaning fire -- sticks stacked for burning! Identify the figure by studying base… It is a right square pyramid because a plumb line form the vertex to the base will coincide with the centre of the base and will be the pyramid’s altitude. This figure rests on only one side… all pyramids are the same. 2. Identify lateral face, lateral face, and lateral face.. base. Base is a square, therefore right square pyramid. 3. Sensorial Demonstration: Take the square based rectangular solid (prism) and show that its base is the same as the base of the right square pyramid. We also know that their heights are the same by visual sight. Substitute hollow rectangle solid. Substitute hollow pyramid. Demonstrate that it takes three loads of sand equivalent to the pyramid to fill the rectangular solid. Therefore the volume of the pyramid is ⅓ the volume of the square based rectangular solid or, the rectangular solid is three times the volume of the pyramid. With the pyramid and prism in sight we can say that they correspond to each other because their bases are equal and their heights are equal but the volume of the pyramid is ⅓ volume of the prism. © Copyright, 2004 Page 163 Geometry Now we take the shorter square based rectangular solid and its corresponding “hollow”. Verify same base and altitude. Sensorially demonstrate that the smaller square-based prism (the solid one) is ⅓ the taller one. Now we take the hollow substitute for the pyramid and the short prism. Fill one with sand and empty into the other… their volume is the same! They are equivalent because they have the same base and the prism is ⅓ the height of the pyramid. 4. Constructing the Formula: We have already seen sensorially that the pyramid is equivalent to the short prism. We want to show this relationship by lines. Take the largest pink cube (a special parallelepiped) and demonstrate that it is the same as another cube, which has been divided into three parts. Remove the pink cube. Note that this cube is formed of three equivalent pyramids. The base of each is the same as the face of the cube, and the height of each equals the height of the cube. We have seen that the three pyramids make up the volume of the cube (prism). Therefore the volume of one of the pyramids is ⅓ of volume of the prism. Why? Because they have the base and height. V = Ab h 3 5. The height of the pyramid equals the edge of the cube and corresponds to the side of the square and forms the cube. (s) © Copyright, 2004 Page 164 Geometry This line corresponds to the diagonal of the square face. (s 2 ) This line corresponds to the diagonal of the cube. (s 3 ) Note that all three lines converge at one vertex. Regular Triangular Pyramid 1. It is regular because its base is an equilateral triangle. Identify it as a regular triangular pyramid. 2. Form a “steeple” with short and tall triangular prisms and the regular triangular pyramid on top. All have the same base. The tall prism and the pyramid have the same height. The short prism’s height is ⅓ the tall prism’s height. 3. The volume of a pyramid whose height is three times a corresponding prism having the same base can be expressed as follows: © Copyright, 2004 Page 165 Geometry V = Ab h QED 3 © Copyright, 2004 Page 166 Geometry Solids of Rotation Cylinder 1. This is a cylinder. Means “surrounds all around it”… also an object that rolls. This is a base, and so is this. Its faces? One, curved. 2. Superimpose regular right hexagonal prism and cylinder. They look a little alike! How many faces are there in the hexagonal solid? “6” What if it had 1000 faces?... or even a million.. we would approach an infinite number of sides, and it would be like this cylinder. “The limit of solid prisms.” 3. “Roll” the prism. The more sides, the easier it will roll. Roll the cylinder... it rolls much faster. Identify its height and base. 4. We know the volume of the hexagonal solid is given by Abh… In the cylinder the area of the base is 11 r2. Therefore, the volume of the cylinder will be; V = πr 2 h € Cone 1. Meaning of cone? “The stone used to sharpen knives – ‘hone’”… it has the same form as that stone! Identify base. Height is the line that passes through vertex to centre of base. 2. Take the tall cylinder and recall that it is the limit of prisms. The formula for the volume of the prism is basically the same as that for the cylinder (only difference is the expression of the area of the base). © Copyright, 2004 Page 167 Geometry Take triangular pyramid... three faces. Then the right square pyramid… four faces. If we continued to add more faces we would reach the limit of pyramids… Cone. The volume of the pyramid was expressed in terms of its relationship to the prism.. 1/3. 3. Consequently the volume of the cone shall be expressed in terms of the cylinder! Now, take the short cylinder along with the cone. Weight them. The same weight… same volume. V= € πr 2 H 3 Sphere Note: In order to calculate the volume of the sphere it is necessary to know the spherical surface. Archimedes discovered the formula and it was later confirmed by a disciple of Galileo, Bonavertura Cavalieri. Theorem: The area of the surface of the sphere is equal to four (4) times the area of its largest cross-section circle… 4 πr 2 Now the area of these four circles would then determine the area of anew circle. If the radius of each of the €small circles was five, then the radius of the composite new circle will be 10 (5 x 2… 25+25+25+25 = 100, 100 = 10) Now we can prove this sensorially by constructing the circles and then weighing them! Constructing the Formula 1. Display the previously used “tall” cone; the short cylinder, as a (teacher constructed) new “shorter” cone. This new short cone has a base four times that of the tall cone. (5cm radius versus 10cm radius) © Copyright, 2004 Page 168 Geometry 2. The radius of the tall cone is the same as the radius of the sphere and it’s height is four times the radius of the sphere (all material has a 20 cm height) 3. The base of the short cone has a radius equal to the diameter of the sphere. 4. The height of the short cone is equal to the radius of the sphere. We can now say that the two cones are equivalent because they have the same proportions… The height of the short one is ¼ the tall one, while the radius of the short one is twice the tall one – twice being the inverse of the ¼ slice we are working with the radius) 5. The short cone is equivalent to the sphere because its base is the same area as the spherical surface and its height equals the radius of the sphere. 6. How do we really know that the short cone is truly the same as the sphere? The secret is in the polyhedrons. If we “opened-up” an icosohedorn we would see twenty right pyramids: The base of each pyramid forms the surface of the icosohedron. The height of each pyramid is the distance from the centre of the icosohedron to the centre of the base. If we can now imagine the polyhedron of 1000 or 1000000 pyramids we would begin to see that the sphere is the limit of regular polyhedrons. 7. Now we would employ the method previously used for deriving the area of a regular polygon (see conversion of pentagon to one triangle by tracing line form one vertex and repositioning cut-off pieces). Taking a series of cones we could demonstrate their equivalence to the sphere. © Copyright, 2004 Page 169 Geometry Theory on the Formation of Solids 1. Take the metal inset of the square divided in halves forming rectangles. Pour sand on paper and with ½ of the inset in a vertical position rotate soma on paper as shown. Identify axis. Explain “generatrix”... means “she who brings forth” from Latin. What does it bring forth, or generate? A Cylinder 2. Take ½ of the metal triangular inset and rotate as shown in sand. Identify axis. Locate the generatix. What does it bring forth or generate? A Cone. 3. Take ½ of metal circle inset. Identify nomenclature: diameter… semi-circumference. Place in sand and rotate. Which is the axis? “Diameter”. Which is the generatrix? “Semi-circumference”. What does it bring forth or generate? A sphere. 4. Take the frame/inset of the ellipse. Trace an ellipse on cardboard or paper with the frame. Cut it out and fold it in half... cutout the half along the axis of symmetry. Rotate this half in sand as shown. Which is the axis? Which is the generatrix? What does it generate? An Ellipsoid. An ellipsoid is a relative of the sphere but something happened? 5. Repeat the same experience with the oval, which will determine and Ovoid. © Copyright, 2004 Page 170 Geometry Projections Sphere: Take the frame/inset of the largest circle and show how the frame fits over the sphere. Therefore this circle represents the maximum circle contained in the sphere. What will we obtain if we project a light on the sphere? This circle. Ellipsoid: Place ellipsoid in frame of ellipse. The ellipse inset will be the largest ellipse contained therein. A light projected on the ellipsoid will produce the ellipse inset. But what if ellipse were in this other position? It would produce the 6 cm circle image! So, we need two pictures to obtain the ellipsoid... to represent the two axes. Ovoid: Place ovoid in frame of oval. Its projection will be the oval inset. Demonstrate with several circle frames that it takes many different circles to determine the ovoid. To calculate the volume of the ovoid there is no fixed rule because there are many possibilities, which means that each oval and ovoid has its own rule. © Copyright, 2004 You may have to prepare various drawings. Page 171
