" Dis a point on the side "BC" of a triangle "ABC" such that "/_ADC=/_BAC" .Show that "CA^(2)=CB.CD

D is a point on the side BC of a triangle ABC such that /_ADC= /_BAC . Show that CA^(2)= CB*CD .

D is a point on the side BC of a triangle ABC such that angleADC=angleBAC .Show that CA^2=CB.CD .

D is a point on the side BC of a triangle ABC such that angleADC = angleBAC . Show that CA^2 = CB. CD.

D is a point on the side BC of a triangle ABC such that angleADC=angleBAC . Show CA^(2)=CB.CD

D is a point on the side BC of a triangle ABC /_ADC=/_BAC Show that CA^(2)=CB.CD

In the given figure , D is a point on the side BC of Delta ABC such that angle ADC=angle BAC . Prove that CA^(2)=CBxxCD .

D is a point on the side BC of ABC such that /_ADC=/_BAC. Prove that (CA)/(CD)=(CB)/(CA) or,CA^(2)=CB xx CD

A point D is on the side BC of an equilateral triangle ABC such that DC=(1)/(4)BC. Prove that AD^(2)=13CD^(2)

D is a point on the side BC of triangle ABC such that angle ADC = angle BAC . If CA = 12 cm and BC = 16 cm, then the length of CD is :

D is a point on the side BC of DeltaABC . If /_ADC=/_BAC , then prove that CA^(2)=CBxxCD .