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Name Class Date Practice 5-4 Form G Medians and Altitudes A In kABC, X is the centroid. 1. If CW 5 15, find CX and XW. CX 5 10; XW 5 5 W 2. If BX 5 8, find BY and XY. BY 5 12; XY 5 4 X B 3. If XZ 5 3, find AX and AZ. AX 5 6; AZ 5 9 Y C Z Is AB a median, an altitude, or neither? Explain. 4. 5. A Median; AB bisects the opposite side. B B A Altitude; AB is perpendicular to the opposite side. 6. B Altitude; AB is perpendicular to the opposite side. Neither; AB is not perpendicular to nor does it bisect the opposite side. 7. A 2 B A 3 Coordinate Geometry Find the orthocenter of kABC. 8. A(2, 0), B(2, 4), C(6, 0) (2, 0) 9. A(1, 1), B(3, 4), C(6, 1) (3, 3) 10. Name the centroid. U 11. Name the orthocenter. X Q T S U A E X D F V G C R B H Draw a triangle that fits the given description. Then construct the centroid and the orthocenter. 13. acute isosceles nXYZ Sample: See art. X 12. equilateral nCDE Sample: See art. C Centroid and Orthocenter E Centroid Orthocenter D Z Prentice Hall Gold Geometry • Teaching Resources Copyright © by Pearson Education, Inc., or its affiliates. All Rights Reserved. 33 Y Name 5-4 Class Date Practice (continued) Form G Medians and Altitudes In Exercises 14–18, name each segment. A 14. a median in nABC CJ J I 15. an altitude for nABC AH C H G B 16. a median in nAHC IH 17. an altitude for nAHB AH or BH 18. an altitude for nAHG AH or GH 19. A(0, 0), B(0, 22), C(23, 0). Find the orthocenter of nABC. (0, 0) 20. Cut a large isosceles triangle out of paper. Paper-fold to construct the medians and the altitudes. How are the altitude to the base and the median to the base related? They are the same. 21. In which kind of triangle is the centroid at the same point as the orthocenter? equilateral 22. P is the centroid of nMNO. MP 5 14x 1 8y. Write expressions to represent PR and MR. PR 5 7x 1 4y; MR 5 21x 1 12y M N P Q R O 15x2 23. F is the centroid of nACE. AD 5 1 3y. Write expressions 2 to represent AF and FD. AF 5 10x 1 2y; FD 5 5x2 1 y A B F 24. Use coordinate geometry to prove the following statement. E D C Given: nABC; A(c, d), B(c, e), C(f, e) Prove: The circumcenter of nABC is a point on the triangle. Sample: The circumcenter is the intersection of the perpendicular bisectors of a triangle. e c 1 f The midpoints of AB and BC are (c , d 1 2 ) and ( 2 , e). So, the equations of their f d 1 e c 1 f d 1 e perpendicular bisectors are x 5 c 1 2 and y 5 2 . Their intersection is ( 2 , 2 ), which is the midpoint of AC. Prentice Hall Gold Geometry • Teaching Resources Copyright © by Pearson Education, Inc., or its affiliates. All Rights Reserved. 34
