UNIT 2 REVIEW 1 1 NAME: ________________________________ 1. Which of the following is a dilation? A) T ( x, y) − − − − > ( x − 4, y + 3) B) T ( x, y ) − − − − > ( y, x) C) T ( x, y) − − − − > (2 x, 2 y) D) T ( x, y) − − − − > (5x,3 y ) 2. Given the original figure, which of the following is a dilation? A) Original B) C) D) 3. Which of the following scale factors is an enlargement? A) 500 : 50 4. If we D O,− 1 2 Original B) 0.01 : 0.1 C) 7 : 3.5 D) 0.1 : 0.01 C) D) then the correct diagram would be: A) B) m O m' m O m O m m m' m' O O 5. Determine the scale factor of the given dilation from point O? B B' A) 1 : 2 B) 2 : 1 C) 2 : 5 D) 5 : 2 5 cm 2.5 cm O C' C 6. Which of the following is not a similarity transformation? A) Rotation B) Reflection C) Stretch D) Dilation 7. Which of the following would be the criterion for establishing similarity in the two triangles? o o • A) AA B) SAS C) SSS D) Not enough info or not similar • UNIT 2 REVIEW 1 8. In the given diagram, which of the following statement is NOT true: A) AB AC AB DE = = B) DE DF EF BC C) AB DE = BC EF D) G GB GE = GA GD D A E B F C 9. The geometric mean of 4 and 16 is: A) 8 B) 10 C) 12 D) cannot be determined 10. The value for x is: o x o A) 16 B) 16 2 C) 16 3 D) 32 16 11. The value for x is: x 4 A) 2 B) 2 2 C) 4 3 D) 2 3 60° 12. The ratio of the short leg to the hypotenuse in a 30° right triangle is: A) 1 : 2 B) 1 : C) 2 : 1 3 D) 1 : 2 13. If cos Ɵ = sin ß then the two angles must be: A) supplementary 14. The ratio A) sin ∠C B) complementary C) a linear pair D) adjacent A 5 represent the which relationship: 13 B) sin ∠B C) tan ∠C 12 cm D) cos ∠C C 5 cm B 13 cm UNIT 2 REVIEW 1 15. Tommy has caught his kite at the top of a 16 ft tree. From where Tommy is standing the elevation to the top of the tree is 29°, what is the length of string (round to the nearest foot)?? A) 33 ft B) 29 ft C) 18 ft D) 8 ft 16. If in ∆ABC & ∆GHY, ∠C ≅ ∠Y & ∠B ≅ ∠Η then ∆ABC ∼ ∆GHY. T or F 17. The hypotenuse is always opposite the right angle. T or F 18. If ∆ABC ∼ ∆DEF ∼ ∆MNP, then ∠B ≅ ∠N T or F 19. DO ,2 ( AB) = A ' B ' , then AB || A ' B ' . T or F 20. Given DO ,3 P ( −1, 0) then P '( −3, 3) T or F 21. sin (x – 5) = cos (4x + 10) when x =17. T or F Solve for the unknown. 22. sin (x + 18°) = cos (45°) 23. sin (2x – 15°) = cos (x – 12°) 24. A loading ramp is 21 m long with a height of 7 m. What is the angle of incline that the ramp forms with the ground? (2 decimal places) UNIT 2 REVIEW 1 25. The landing pad is 125 ft away from the man. When looking up at the helicopter that is hovering over the landing pad he sees it at an angle of elevation of 50°. What is the altitude of the helicopter (round to the nearest foot)? 26. A flagpole is at the top of a building. 250 ft from the base of the building, the angle of elevation of the top of the pole is 50° and the angle of elevation of the bottom of the pole is 48°. Determine the length of the flagpole (to the nearest foot). 27. From an apartment window 20 ft above the ground in the shorter building, the angle of depression of the base of a nearby tower is 12° and the angle of elevation of the top of the tower is 40°. Find the height of the nearby building (to the nearest foot). UNIT 2 REVIEW 1 Find the missing values. (If not a whole number, round to 2 decimal places) 28. 29. 30. z x 12 y x x 8 8 8 z 8 9 y y z x = ________ y = _________ z = ________ x = ________ y = _________ z = ________ x = ________ y = _________ z = ________ Determine the Geometric Mean of the two given numbers. (Exact Answers Only) 31. 2 and 8 32. 12 and 27 33. 20 and 25 34. 10 and 16 Are the following pairs of triangles similar? If they are, then name their similarity criteria. (SSS, SAS, AA) 35. Yes / No __________ 0 4 36. Yes / No __________ 5 o 6.25 5 o 37. Yes / No __________ UNIT 2 REVIEW 1 Determine the sequence of similarity transformations that map one figure onto the other thus establishing that the two figures are similar. 38. Determine two similarity transformations that would map ∆OBC onto ∆OLK. 39. Determine two similarity transformations that would map Quad. OKBC onto Quad. OHTR. _________________ followed by _________________ _________________ followed by _________________ A' Given the dilation centered at O, A 40. Is this an enlargement or reduction? How did you determine it? 41. If AB = 3.5 cm and A’B’ = 10.5 cm, what is the scale factor of the dilation? O B B' UNIT 2 REVIEW 1 42. Center of dilation is G. Scale Factor 3 G (0,3) A (5,9) Determine the slope of GA from G ( x1 , y1 ) to A ( x2 , y2 ) m= y2 − y1 x2 − x1 Determine A’. Find the values for the missing variables. 43. 44. 15.75 x 3 18 x o o 8 x+1 4 x = __________ x = __________ UNIT 2 REVIEW 1 45. When looking at a trigonometry table Sarah notices that the Sine and Cosine ratios are the same value for the 45° right triangle. Explain why that happened. Solve for the missing information. (Round all final answers to 2 decimals places) 46. 47. 7 cm θ° 6 cm x 10 cm 24° x ≈ ____________ 48. Ɵ = ____________ 49. 8 cm 5 cm θ° 12 cm Ɵ = ____________ x 44° x ≈ ____________ UNIT 2 REVIEW 1 50. Solve – The ratio of two supplementary angles is 3:5. Find the measure of each angle. (2 points) _______ & _______ 51. Prove the following relationships. a) GIVEN: PROVE: QR || ST RP QR = SP ST STATEMENT R Q P S T REASON 52. Use a compass and a straightedge to construct DO ,−1 ( ∆ADB ) A O C B UNIT 2 REVIEW 1 UNIT 2 REVIEW 1 1. C 2. B 3. B 4. A 5.B 6.C 7.A 8.B 9.A 10.B 13. B 14.A 15.A 16.T 17.T 18.T 19.T 20. F 21. T 22. x=27 24. sin −1 (7 / 21) = θ θ =19.47° 26. tan 50° = x x = 297.94 ft 250 27. tan12° = 20 x = 94.09 ft x 11.D 12.A 23. x=39 25. 149 ft tan 48° = tan 40° = y y = 277.65 ft 297.94 − 277.65 = 20.29 ft = 20 ft 250 y y = 78.95 ft 78.95 + 20 = 98.95 ft = 99 ft 94.09 28. x = 14.42, y = 5.33, z = 9.61 7.11, z = 12.04 29. x = 11.31, y = 8, z = 11.31 30. x = 10.70, y = 31. 4 34. 4 10 37. Yes SAS 32. 18 33. 10 5 35. Yes SAS 36. No 38. various answers such as DO,2 (∆LKO) followed by R O, -90 (∆L’K’O’) 39. VA Ry-axis (HTOR) fd by DO,3 (H’T’O’R’) 6 41. 3 42. m= 5 ; A’(15, 21) 40. Enlargement; Image is further away from center 43. X=3 44. X=7 45. creates a right isosceles triangle so the opp and adj sides are equal. 48. 22.62° 49. 11.52 cm 50. 67.5 & 112.5 51. STATEMENT QR || ST REASON Given 52. ∠Q ≅ ∠T || --> Alt. Interior ∠ ≅ ∠S ≅ ∠R || --> Alt. Interior ∠ ≅ ∆QPR ∼ ∆TPS AA RP QR = SP ST ∆QPR ∼ ∆TPS (prop. sides of ∼ ∆) 46. 2.67 cm 47. 45.57°
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