In `DeltaABC,` CD is the median. If `AC^(2)+BC^(2)=290andCD=9" then "AD=`

In DeltaPQR ,seg PM is a median , PM=9 and PQ^(@)+PR^(2)=290. Find the length of QR.

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

In DeltaABC, if M is the midpiont of BC and seg AM bot seg BC, then prove that prove that AB^(2)+AC^(2)=2AM^(2)+2BM^(2).

In the given figure, in DeltaABC , point D is on side AC. If AC = 16, DC = 9 and BP bot AC then, find the following rations. i. (A(DeltaABD))/(A(DeltaABC)) ii. (A(DeltaBDC))/(A(DeltaABC)) iii. (A(DeltaABD))/(A(DeltaBDC))

In an isosceles Delta ABC , if AC=BC and AB ^(2)= 2AC^(2) "then" angle C=?

In DeltaABC , P is the mid point of BC,Q divides CA internally in the ratio 2:1 and R divides AB externally in the ratio 1:2 then

In the given figure, seg PM is a median of DeltaPQR.PM=9andPQ^(2)+PR^(2)=290, then find QR.

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

In DeltaABC , if sin^(2)A+sin^(2)B=sin^(2)C and l(AB)=10, then the maximum value of the area of DeltaABC is

In DeltaABC Seg BD bisects /_ABC . If AB=x, BC=x+5, AD=x-2, DC=x+2 , then find the value of x .