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MATH 2 UNIT 4 TEST G-CO.9 1. In this figure, lines a, b, c, d, and e intersect as shown. Note: The figure is not drawn to scale. Based on the angle measures, which pair of lines is parallel? a. a and b b. c and e c. c and d d. d and e G-CO.9 Μ Μ Μ Μ is parallel to πΆπ· Μ Μ Μ Μ . 2. In the figure below, π΄π΅ Which statement proves that β 3 β β 7? a. If two parallel lines are cut by a transversal, the alternate interior angles are congruent. b. If two parallel lines are cut by a transversal, the alternate exterior angles are congruent. c. If two parallel lines are cut by a transversal, the corresponding angles are congruent. d. If two parallel lines are cut by a transversal, the vertical angles are congruent. G-CO.9 3. In this figure, lines a and b are intersected by line π‘. Which of these statements proves that lines a and b are parallel? a. β 1 β β 2 b. β 1 β β 3 c. β 2 β β 3 are complimentary d. β 1 β β 2 are supplementary MATH 2 UNIT 4 TEST G-CO.9 4. In the diagram below Points G, H, and I are collinear. Which conjecture is not necessarily true? a. β πΊπ»πΎ β β πΎπ»πΌ b. πβ πΊπ»π½ + πβ π½π»πΌ = 180° c. β πΊπ»π½ πππ β π½π»πΌ form a linear pair d. β πΊπ»πΎ β β π½π»πΌ are vertical angles G-SRT.1b Μ Μ Μ Μ Μ Μ is the result of dilating ππ Μ Μ Μ Μ about the origin. 5. In the grid, πβ²πβ² What scale factor was used in this dilation? 1 a. 4 1 b. 3 3 c. 4 4 d. 3 MATH 2 UNIT 4 TEST G-SRT.1b 6. Rectangle QUAD is dilated by a factor of 3, with the origin as the center of the dilation. The dilation forms rectangle QβUβAβDβ. What is the length of Μ Μ Μ Μ Μ Μ πβ²πβ²? a. 2 units b. 6 units c. 9 units d. 18 units G-SRT.1c 7. On the coordinate grid below, βπππ πππ βπππ are shown. Which statement can be used to prove that βπππ ~ βπππ? a. βπππ is the result of a reflection and dilation of βπππ, and all angle measures are preserved with these transformations. b. βπππ is the result of a rotation and dilation of βπππ, and all angle measures are preserved with these transformations. c. βπππ is the result of a translation and rotation of βπππ, and all side lengths are preserved within these transformations. d. βπππ is the result of a reflection and rotation of βπππ MATH 2 UNIT 4 TEST G-SRT.1c 8. The dilation centered at O with a scale factor of 3. OA = 6cm, OB = 7cm and AB = 8cm. What is the length of AβBβ? a. 18 cm b. 21 cm c. 24 cm d. 27 cm G-SRT.1d. 9. The figure below shows a βπ΄π΅πΆ and its dilation image βπ·πΈπΉ. Which statement must be true? Μ Μ Μ Μ = Μ Μ Μ Μ a. πβ π΄ = 2πβ π· πππ 2π΅πΆ πΈπΉ Μ Μ Μ Μ = Μ Μ Μ Μ b. πβ π΅ = πβ πΈ πππ 2π΅πΆ πΈπΉ Μ Μ Μ Μ = Μ Μ Μ Μ c. πβ π΅ = πβ πΈ πππ π΅πΆ πΈπΉ Μ Μ Μ Μ d. πβ π΄ = 2πβ π· πππ π΅πΆ = Μ Μ Μ Μ πΈπΉ G-SRT.1d 10. Mr. Williams drew βπ΄π΅πΆ on a coordinate grid and asked his students to determine the transformations that will result in a transformed figure βπ΄β²π΅β²πΆβ² such that βπ΄β²π΅β²πΆβ² is similar but NOT congruent to βπ΄π΅πΆ. Two student responses are show below. Student 1: Reflect βπ΄π΅πΆ across the y-axis and then dilate it by a scale factor of 1 with the center of dilation at the origin. Student 2: Dilate βπ΄π΅πΆ by a scale factor of 2 and the center of dilation at the origin and then reflect it across the axis. Which statement is true? a. Neither student 1 nor student 2, because dilations and reflections preserve both side lengths and angle measures. b. Both student 1 and student 2, because dilations and reflections preserve angle measures but not side lengths. c. Only student 2, because dilations preserve angle measure and side lengths are proportional. d. Only student 1, because this dilation preserves angle measures and side lengths. MATH 2 UNIT 4 TEST G-SRT.2 1 11. If βπΏππ ~ βπ ππ and MN = 2 ππ, which statement must be true? a. π π = 2πΏπ 1 b. π π = 2 πΏπ c. πβ π = 2πβ π 1 d. πβ π = 2 πβ π G-SRT.2 12. Quadrilaterals PQRS, I, II, III and IV are shown on the coordinate grid below. Which quadrilateral is not similar to PQRS? a. I b. II c. III d. IV G-SRT.2 13. Triangle PQR is similar to Triangle WXY. Which proportion describes the relationship between corresponding sides of the triangles? ππ 6 a. ππ = 3 ππ 2 ππ 3 ππ 2 b. ππ = 4 c. ππ = 4 d. ππ = 6 MATH 2 UNIT 4 TEST G-SRT.2 14. Given: π΄πΆ πΈπ· π΅πΆ = πΉπ· πππ β π΅ β β πΉ. Which statement must be true? Μ Μ Μ Μ β π·πΈ Μ Μ Μ Μ a. π΄πΆ Μ Μ Μ Μ β Μ Μ Μ Μ b. π΄π΅ πΈπΉ c. βπ΄π΅πΆ ~ βπΈπΉπ· d. βπ΄π΅πΆ β βπΈπΉπ· G-SRT.3 15. In the figure below, βπ΄π΅πΆ was dilated and then rotated 180° about point C to create βπΈπ·πΆ, as shown below. Based on the given transformations, which relationships must be true? a. β π΄ β β π· πππ β π΅ β β πΈ, π π βπ΄π΅πΆ ~ βπ·πΈπΆ b. β π΄ β β πΈ πππ β π΅ β β π·, π π βπ΄π΅πΆ ~ βπ·πΈπΆ c. β π΅πΆπ΄ β β π·πΆπΈ πππ β π΅ β β πΈ, π π βπ΄π΅πΆ ~ βπ·πΈπΆ d. β π΄πΆπ΅ β β πΈπΆπ· πππ β π΄ β β π·, π π βπ΄π΅πΆ ~ βπ·πΈπΆ G-SRT.3 16. Two triangles are shown below. Based on the graph, which statement appears to be true? a. βπ΄π΅πΆ ~βπππ πππππ’π π β π΅ β β π πππ β πΆ β β π b. βπ΄π΅πΆ ~βπππ πππππ’π π β π΅ β β π πππ β πΆ β β π c. βπ΄π΅πΆ ~βπππ πππππ’π π β π΅ β β π πππ β πΆ β β π d. βπ΄π΅πΆ ~βπππ πππππ’π π β π΅ β β π πππ β πΆ β β π MATH 2 UNIT 4 TEST G-SRT.4 β‘ , as shown below. 17. Triangle ABC is divided by π·πΈ β‘ β₯ π·πΈ β‘ ? What value of x guarantees that π΅πΆ a. 4 b. 4.5 c. 8 d. 10.5 MATH 2 UNIT 4 TEST G-SRT.4 18. Jamelia is trying to prove that for the figure below, Μ Μ Μ Μ π·πΈ β₯ Μ Μ Μ Μ π΅πΆ . She is given the information that π·π΅ π΄π· πΈπΆ = π΄πΈ and lists the first five statements of her proof. What are the correct remaining statements in Jameliaβs proof? a. 6. βπ΄π·πΈ ~βπ΄π΅πΆ 7. β π΄πΆπ΅ β β π΄π΅πΆ 8. Μ Μ Μ Μ π·πΈ β₯ Μ Μ Μ Μ π΅πΆ b. 6. βπ΄π·πΈ ~βπ΄π΅πΆ 7. β π΄π·πΈ β β π΄π΅πΆ Μ Μ Μ Μ Μ Μ Μ Μ β₯ π΅πΆ 8. π·πΈ c. 6. β π΄ β β π΄ 7. βπ΄π·πΈ ~βπ΄π΅πΆ 8. β π΄πΆπ΅ β β π΄π΅πΆ Μ Μ Μ Μ Μ Μ Μ Μ β₯ π΅πΆ 9. π·πΈ d. 6. β π΄ β β π΄ 7. βπ΄π·πΈ ~βπ΄π΅πΆ 8. β π΄π·πΈ β β π΄π΅πΆ Μ Μ Μ Μ Μ Μ Μ Μ β₯ π΅πΆ 9. π·πΈ MATH 2 UNIT 4 TEST G-SRT.10d 19. In βπ΄π΅πΆ, π΄π· = π·π΅ πππ π΄πΈ = πΈπΆ. Given the information above, which statement can be proved to be true? a. βπ΄π΅πΆ is isosceles b. Μ Μ Μ Μ π·πΈ β₯ Μ Μ Μ Μ π΄πΆ c. π·πΈ = 1 π΅πΆ 2 d. βπ΄π΅πΆ β βπ΄π·πΆ G-SRT.10d 20. Which of the following facts would be sufficient to prove that triangles ABC and DBE are similar? a. Μ Μ Μ Μ πΆπΈ πππ Μ Μ Μ Μ π΅πΈ are congruent b. β π΄πΆπΈ is a right angle c. Μ Μ Μ Μ π΄πΆ πππ Μ Μ Μ Μ π·πΈ are parallel d. β π΄ and β π΅ are congruent G-CO.6 21. Triangle ABC is located in the third quadrant of a coordinate plane. If triangle ABC is reflected across the y-axis to obtain triangle, AβBβCβ, which statement is true? a. βπ΄β²π΅β²πΆβ² lies in quadrant II and is congruent to βπ΄π΅πΆ b. βπ΄β²π΅β²πΆβ² lies in quadrant IV and is congruent to βπ΄π΅πΆ c. βπ΄β²π΅β²πΆβ² lies in quadrant II and is not congruent to βπ΄π΅πΆ d. βπ΄β²π΅β²πΆβ² lies in quadrant IV and is not congruent to βπ΄π΅πΆ G-CO.6 22. Triangle XYZ is translated by the rule (π₯ + 3, π¦ β 2) and then reflected over the x-axis to create the triangle XβYβZβ. Which statement is true? a. βπβ²πβ²πβ² is a 90° clockwise rotation of βπππ b. βπππ is similar to and congruent to βπβ²πβ²πβ² c. βπβ²πβ²πβ² is a 180° clockwise rotation of βπππ d. βπππ is similar to but not congruent to βπβ²πβ²πβ² MATH 2 UNIT 4 TEST G-CO.7 23. Use the given triangles to answer the question. Triangle JKL is reflected across line a to form triangle MNO. Which one of these is true? a. Μ Μ Μ π½πΎ β Μ Μ Μ Μ Μ ππ, Μ Μ Μ Μ πΎπΏ β Μ Μ Μ Μ ππ , πππ β πΏ β β π Μ Μ Μ Μ Μ Μ Μ Μ Μ Μ Μ Μ Μ Μ b. π½πΎ β ππ, π½πΏ β ππ, πππ β π½ β β π Μ Μ Μ Μ β Μ Μ Μ Μ Μ c. Μ Μ Μ π½πΎ β Μ Μ Μ Μ ππ, πΎπΏ ππ, πππ β πΏ β β π Μ Μ Μ Μ β Μ Μ Μ Μ d. Μ Μ Μ π½πΎ β Μ Μ Μ Μ Μ ππ, πΎπΏ ππ, πππ β πΎ β β π G-CO.7 24. Which figure contains two congruent triangles? a. b. c. d. G-CO.8 25. Triangles MNO and RST are shown. Which theorem could be used to prove that βπππ β βπ ππ? a. Angle-Side-Angle (ASA) b. Side-Angle-Side (SAS) c. Side-Side-Angle (SSA) d. Side-Side-Side (SSS) MATH 2 UNIT 4 TEST G-CO.8 26. βπ΄π΅πΆ undergoes several rigid motions resulting in βπ·πΈπΉ as shown below. Which theorem justifies the statement βπ΄π΅πΆ β βπ·πΈπΉ ? a. Angle-Side-Angle b. Hypotenuse-Leg c. Side-Angle-Side d. Side-Side-Side G-CO.8 27. Javier is writing the following proof: Which of the following is the reason for statement 5? a. SSS b. SAS c. ASA d. AAS G-CO.9 Μ Μ Μ Μ is the perpendicular bisector of πΆπ΅ Μ Μ Μ Μ . 28. In the figure below, π΄π· Based on this information, which other statement can be proven to be true? a. Μ Μ Μ Μ π΄π· β Μ Μ Μ Μ πΆπ΅ Μ Μ Μ Μ b. π΄π΅ β Μ Μ Μ Μ π΄πΆ Μ Μ Μ Μ β πΆπ΅ Μ Μ Μ Μ c. π΄π΅ Μ Μ Μ Μ β πΆπ΅ Μ Μ Μ Μ d. π΄πΆ MATH 2 UNIT 4 TEST G-CO.9 β‘ as the perpendicular bisector of π΄π΅ Μ Μ Μ Μ such that βπ΄πΆπ· and βπ΅πΆπ· are 29. John draws βπ΄π΅π· with πΆπ· congruent to each other. Which statement can John use this figure to prove? a. Every isosceles triangle is a right triangle. b. The base angles of any triangle are congruent. c. The points on the perpendicular bisector of a side of a triangle are equidistant from all of the vertices of the triangle. d. The points on the perpendicular bisector of a side of a triangle are equidistant from the vertices of the side it bisects. G-CO.9 30. If πβ π΄π·π΅ = πβ π΅π·πΆ πππ Μ Μ Μ Μ πΆπ· β₯ Μ Μ Μ Μ π΄πΈ , which is a valid conclusion? I II III Μ Μ Μ Μ πππ πππ‘π β π΄π·πΆ π·π΅ β π΄π·π΅ πππ β π΄π·πΉ are supplementary angles β π΄π·π΅ πππ β π΅π·πΆ are complementary angles a. I only b. I and II c. I and III d. I, II, and III G-CO.9 31. On a set of parallel lines cut by a transversal, πβ 2 = (7π₯ β 5)° and πβ 6 = (π₯ + 25)°. Which value of x could show that β 2 and β 6 are corresponding angles, and why? a. x = 5; Corresponding angles are congruent. b. x = 20; Corresponding angles are congruent. c. x = 5; Corresponding angles are supplementary. d. x = 20; Corresponding angles are supplementary. MATH 2 UNIT 4 TEST G-CO.10c 32. Which pair of steps should be interchanged to fix the proof? a. steps 2 and 3 b. steps 2 and 4 c. steps 3 and 5 d. steps 4 and 5
