In `triangle ABC`, point M is midpoint of side BC. If `AB^2+AC^2=290cm^2` and AM=8 cm, find BC.

In triangle ABC , AP is a median on side BC. If AP=7, AB^2+AC^2=260 , find BC.

In triangle ABC , seg AP is a median. If BC=18 , AB^2+AC^2=260 , then find AP.

In triangle ABC , P is a point on side BC such that BP=4 cm and PC=7 cm. A(triangle APC):A(triangle ABC) =…….a)11:7 b)7:11 c)4:7 d)7:4

Seg AM is a median of triangle ABC . If AB=22, AC=34, BC=24, find AM.

Point M is the midpoint of seg AB. If AB= 8, then find the length of AM.

In triangle ABC , points D and E are on sides BC and AB such that AD and CE intersect at point P. CE_|_AB , AD_|_BC . Prove that triangle AEP~triangle CDP

In triangle ABC , points D and E are on sides BC and AB such that AD and CE intersect at point P. CE_|_AB , AD_|_BC . Prove that triangle AEP~triangle ADB

In triangle ABC , seg AD_|_side BC , B-D-C. Prove that AB^2+CD^2=BD^2+AC^2

In triangle ABC , points D and E are on sides AB and AC such that A-D-B and A-E-C. DE|| BC. If DE:BC=3:5 , then find A(triangle ADE):A(square DBCE)