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Name ____________________________________________________________ Date ________________________ Period _______ Integrated Math 2 Semester 1 Final Review CHAPTER 5 REVIEW Find the measure of each numbered angle and name the theorems that justify your work. Find x so that l m. Identify the postulate or theorem you used. 1. m 4 = 2x – 5 m 5 = 4x – 13 6. 2. m 1 = x + 10 7. m 2 = 3x + 18 8. 3. m 6 = 7x – 24 m 7 = 5x + 14 9. STREETS Refer to the figure. Barton Road and Olive Tree Lane form a right angle at their intersection. Tryon Street forms a 57° angle with Olive Tree Lane. What is the measure of the acute angle Tryon Street forms with Barton Road? Given the following information, determine which lines, if any, are parallel. State the postulate or theorem that justifies your answer. Determine whether the following statements are always, sometimes, or never true. Explain. 10. The intersection of two planes contains at least two points. 4. EFB FBC In the figure, m 2 = 92, and m 12 = 74. Find the measure of each angle. Tell which postulate(s) or theorem(s) you used. 5. 5 CHAPTER 6 REVIEW Polygon ABCD polygon PQRS. 1. Find the missing statement from the paragraph proof. 6. Find the value of x. Given: bisects . Find each measure. Prove: Proof: Since it is given that bisects by the definition of an angle bisector. It is given that Property, ? . So . By the Reflexive by AAS. Therefore by CPCTC. 7. m 3 Show that the polygons are congruent by identifying all congruent corresponding parts. Then write a congruence statement. Find each measure. 2. Refer to the figure below. 8. m 2 Find each measure. 3. If , name two congruent angles. Name the missing coordinates of each triangle. 4. 9. m 4 Refer to the figure below. Determine which postulate can be used to prove that the triangles are congruent. If it is not possible to prove congruence, write not possible. 10. 5. If , name two congruent angles. CHAPTER 7 REVIEW Use the Exterior Angle Inequality Theorem to list all angles that satisfy the stated condition. 1. Use the figure below to determine the relationship between EG and FG. 6. measures are greater than m 2 2. Find the measure of In , Z is the centroid, MZ = 6, YI = 18, and NZ = 12. Find each measure. Use the figure below to determine which angle has the greatest measure. 7. MR Use the figure below to determine the relationship between the measures of the given angles. 3. 1, 3, 4 8. m WQR, m QRW In , CP = 30, EP = 18, and BF = 39. Find each measure. Find the range for the measure of the third side of a triangle given the measures of two sides. 9. 54 in. and 7 in. 10. SPORTS The figure shows the position of three trees on one part of a disc golf course. At which tree position is the angle between the trees the greatest? 4. PD Is it possible to form a triangle with the given side lengths? If not explain why not. 5. 2.7, 3.1, 4.3 CHAPTER 8 REVIEW 9. Find the sum of the measures of the interior angles of a convex 30-gon. 1. What is in kite STVW? CHAPTER 9 REVIEW ALGEBRA Identify the similar triangles. Then find each measure. The measure of an interior angle of a regular polygon is given. Find the number of sides in the polygon. 1. NL, ML 2. 160 Determine whether each quadrilateral is a parallelogram. Justify your answer. 3. 2. EG, HG Quadrilateral GHJK is a rectangle. Find each measure if m 1 = 37. 3. Find x and y. 4. m 6 ALGEBRA Quadrilateral RSTU is a rectangle. 5. If UZ = x + 21 and ZS = 3x – 15, find US. Determine whether the dilation from A to B is an enlargement or a reduction. Then find the scale factor of the dilation. Find the measures of an exterior angle and an interior angle given the number of sides of each regular polygon. Round to the nearest tenth, if necessary. 6. 40 4. Find the measure of each interior angle. 7. 8. For rhombus GHJK, find m 1. Determine whether the triangles are similar. If so, write a similarity statement. If not, what would be sufficient to prove the triangles similar? Explain your reasoning. 5. ALGEBRA Find x. 4. An equilateral triangle has an altitude length of 33 feet. Determine the length of a side of the triangle. 6. Use a Pythagorean Triple to find x. 7. The ratio of the measures of the sides of a triangle is 3:4:6, and its perimeter is 104 feet. Find the measure of each side of the triangle. 5. Each pair of polygons is similar. Find the value of x. Find x and y. 8. Determine whether each pair of figures is similar. If so, write the similarity statement and scale factor. If not, explain your reasoning. 6. Use a calculator to find the measure of tenth. to the nearest 9. 7. CHAPTER 10 REVIEW Find x, y, and z. Find x. 1. 8. Use a calculator to find the measure of tenth. to the nearest Find the geometric mean between each pair of numbers. 9. 3 and 15 Determine whether each set of numbers can be measure of the sides of a triangle. If so, classify the triangle as acute, obtuse, or right. Justify your answer. 2. 10. 65, 72, 97 Find sin L, cos L, tan L, sin M, cos M, and tan M. Express each ratio as a fraction and as a decimal to the nearest hundredth. 3. = 15, m = 36, n= 39 Ch. 5 Answer Key Ch. 9 Answer Key 1. m 3 = 174, m 4 = 3, m 5 = 3, Supplement and Vertical Angles Theorem 1. ; LN = 21; LM = 14 2. ; EG = 6; HG = 8 2. m 1 = 48, m 2 = 132, Supplement Theorem 3. m 6 = 109, m 7 = 109, Vertical Angles Theorem 4. ; Converse Alternate Interior Angles Theorem 5. 106; Consecutive Angles 6. 21; Alternate Exterior Angles 7. 9; Alternate Interior Angles 8. 12; Corresponding Angles 9. 33 10. Always; the intersection of two planes is a line, and a line contains at least two points. Ch. 6 Answer Key 1. 2. 3. 4. M(0, c), N(–2b, 0) 5. 6. x = 48 7. 65 8. 83 9. 45 10. SSS Ch. 7 Answer Key 1. EG < FG 2. 19 3. angle 1 4. 15 5. yes 6. angle 6 and angle 9 7. 9 8. angle WQR < angle QRW 9. 47 in. < n < 61 in. 10. 2 Ch. 8 Answer Key 1. 130 2. 18 3. No; none of the tests for parallelograms are fulfilled. 4. 106 5. 78 6. 9, 171 7. m R = 128, m S = 52, m T = 128, m U = 52 8. 68 9. 5040 3. 4. enlargement; 3 5. yes; by SAS Similarity 6. 7. 24 ft, 32 ft, 48 ft 8. 7 9. ; Ch. 10 Answer Key 1. x = 15; y = 5; z = 17.3 2. 33.6 degrees 3. sin L = 0.38; cos L = 0.92; tan L = .42; sin M = 0.92; cos M = 0.38; tan M = 2.4 4. 22 root 3 ft. 5. 52 6. x = 18; y = 9 root 3 7. 60.3 degrees 8. 105 root 2 9. 6.7 10. yes, right triangle.