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Geometry Review 1.1-1.5 B Name: _____________________________________________________ Period: _____ Chapter 1 RECAP: Find your partner (must be someone NOT adjacent to your seat): _______________________, ___________________, _______________, __________________ Partner 5: ______________________ Kaufman Geometry Review 1.1-1.5 B 1.1 Write a description for each figure. Kaufman Geometry Review 1.1-1.5 B Draw and label a figure for the following statements. 4. Planes N and P contain line a. 5. Line p intersects line m and plane R at point U. β‘ . 7. A line contains L(β 4, β4) and M(2, 3). Line q is in the same coordinate plane but does not intersect πΏπ Line q contains point N. 8. Name a line that contains points T and P. 9. Name a line that intersects the plane containing points Q, N, and P. β‘ . 10. Name the plane that contains β‘ππ and ππ Kaufman Geometry Review 1.1-1.5 B 1.2 Find the measurement of each segment. Assume figures are not to scale. 1. Μ Μ Μ Μ π΅π· Find the value of x and RS if S is between R and T. 3. RS = 2x, ST = 5x + 4, and RT = 32 Μ Μ Μ Μ 2. π΅πΆ 4. RS = 6x, ST =12, and RT = 72 Kaufman Geometry Review 1.1-1.5 B 1.3 1. The pivot or midpoint of a seesaw on a playground is 13.5 feet from the swing set. If the swing set is 8 feet from the edge of the seesaw when the seesaw is level, how long is the seesaw? 2. Find the coordinates of M if N(1.5,2.5) is the midpoint of Μ Μ Μ Μ Μ ππ and P has coordinates (6, 9). Use the number line to find each measure. 3. BD 4. AG Find the distance between each pair of points. 5. M(1, β2), N(9, 13) 6. O(β12, 0), P(β8, 3) 7. K(β2, 10), L(β4, 3) Kaufman Geometry Review 1.1-1.5 B Use the number line from above to find the coordinate of the midpoint of each segment. 8. Μ Μ Μ Μ πΆπΈ 9. Μ Μ Μ Μ π΄πΉ 10. Μ Μ Μ Μ π·πΊ Find the coordinates of the midpoint of a segment with the given endpoints. 11. M(11, β2), N(β9, 13) 12. K(β11, 2), L(β19, 6) 13. R(β12, 8), S(6, 12) Kaufman Geometry Review 1.1-1.5 B 1.4 For Exercises 1-7, use the figure at the right. Name the vertex of each angle. 1. β 4 2. β 1 3. β 5 Name the sides of each angle. 4. β STV 5. β 1 Write another name for each angle. 6. β WTS 7. β 2 In the figure πΈπ· and πΈπΉ are opposite rays. πΈπΊ bisects β PQT. 8. If mβ PQT = 60 and mβ PQS = 4x + 14, find the value of x. 9. If mβ PQS = 3x + 13 and mβ SQT = 6x β 2, find mβ PQT. Kaufman Geometry Review 1.1-1.5 B 1.5 Kaufman