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Download Lecture Notes for Section 2.5 - Madison Area Technical College
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Transcript
Elementary Algebra Notes Section 2.5 Page 1 of 5 Section 2.5: Formulas and Applications from Geometry Big Idea: There are many formulas from geometry that can be used to solve real world problems. Big Skill: You should be able to pick the correct geometric formula for a given geometry problem, and solve the equation for the needed variable. Perimeter: Perimeter is the distance around the outside of a two-dimensional shape. The perimeter of a shape with straight sides is the sum of the lengths of its sides. The perimeter of a circle is called its circumference. The formula for the circumference of a circle is: C = 2r Pi is an irrational numeric constant, and it is approximately given by: 3.14 Perimeter and circumference are measured in units of length, like feet or inches or yards or meters. Practice: 1. What is the approximate radius of a circle that has a circumference of 22 centimeters? 2. If you have 2 feet of wood that is 2 inches wide, and you want to use it to make a square picture frame with mitered corners, what is the size of the largest picture you can frame? 3. A farmer has 800 m of fencing to enclose a rectangular field. If the width of the field is 175 m, find the length of the field. 4. Write a formula for the length of the side of an equilateral triangle in terms of the triangle’s perimeter. Algebra is: the study of how to perform multi-step arithmetic calculations more efficiently, and the study of how to find the correct number to put into a multi-step calculation to get a desired answer. Elementary Algebra Notes Section 2.5 Page 2 of 5 Area: Area is the measure of how many squares of a given dimension it takes to cover a geometric shape. Area is measured in units of length2, like feet2 (i.e., square feet), or inches2 (i.e., square inches), or 2 yards (i.e., square yards), or meters2 (i.e., square meters). Some geometric formulas for areas: Rectangle Arect lw Circle Acirc r 2 Triangle Trapezoid Atri Atrap 1 bh 2 1 B b h 2 Sphere Asphere 4 r 2 Box Abox 2lw 2lh 2wh Cylinder Acyl 2 rh 2 r 2 Algebra is: the study of how to perform multi-step arithmetic calculations more efficiently, and the study of how to find the correct number to put into a multi-step calculation to get a desired answer. Elementary Algebra Notes Section 2.5 Page 3 of 5 Practice: 5. The area of a triangle is 120 m2. If the height is 24 m, find the length of the base. 6. The Rogers Centre (formerly the SkyDome) in Toronto, Canada has a hemispherical roof with a diameter of 630 feet. Find the area of the dome to the nearest square foot. Also, if a gallon of paint covers 400 square feet, calculate how many gallons of paint are needed to paint the Rogers Centre dome. 7. A cylinder with a radius of 12 cm has an area of 500 cm2. Find its height. 8. Solve for the height of a cylinder in general in terms of its area and radius. 9. Solve for the height of a trapezoid in terms of its area and base lengths. Algebra is: the study of how to perform multi-step arithmetic calculations more efficiently, and the study of how to find the correct number to put into a multi-step calculation to get a desired answer. Elementary Algebra Notes Section 2.5 Page 4 of 5 Volume: Volume is the measure of how many cubes of a given dimension it takes to fill a geometric shape. Volume is measured in units of length3, like feet3 (i.e., cubic feet), or inches3 (i.e., cubic inches), or 3 yards (i.e., cubic yards), or meters3 (i.e., cubic meters). Some geometric formulas for volumes: Box Vbox lwh Cylinder Vcyl r 2 h Sphere 4 Vsphere r 3 3 Pyramid 1 Bh 3 B is the base area. The base can be any shape (not just a square or rectangle)! V pyr Cone Vcone 1 1 Bh r 2 h 3 3 Algebra is: the study of how to perform multi-step arithmetic calculations more efficiently, and the study of how to find the correct number to put into a multi-step calculation to get a desired answer. Elementary Algebra Notes Section 2.5 Page 5 of 5 Practice: 10. A dump truck has a rectangular box that is 3 yards wide by 5 yards long. What must be the height of the box if it needs to contain a volume of 30 cubic yards? 11. If a can has a radius of 3.0 in., what must its height be if it is to hold a volume of 36 in.3? 12. If a pyramid has a volume of 225,000 ft.3 and a square base 200 ft. on a side, what is its height? Angle facts: The sum of the interior angles of a triangle is 180. The sum of the interior angles of a rectangle is 360. Angles that are on opposite sides of intersecting lines are equal. Two angles that make a straight line are called supplementary, and add up to 180. Two angles that make a right angle are called complementary, and add up to 90. Practice: 13. If two supplementary angles are expressed as 6x + 29 and x + 11, what must x be? 14. If one angle of a triangle is double the smallest angle, and the other angle is triple the smallest angle, what are the angles of the triangle? Algebra is: the study of how to perform multi-step arithmetic calculations more efficiently, and the study of how to find the correct number to put into a multi-step calculation to get a desired answer.
