In the adjoing figure, seg PS is the median of `DeltaPQR`and `PTbotQR.`
i. `PR^(2)=PS^(2)+QRxxST+((QR)/(2))^(2)`

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

In the adjoining figure, point S is on side QR of DeltaPQR . Prove that PQ + QR + RP gt 2PS

In the adjoining figure, if PQ=6, QR=10, PS=8, then find TS.

In the adjoining diagram, If OP=7.2, OQ=3.2, then find QR and OR.

In the figure, M is the midpoint of QR . /_PRQ=90^(@) . Prove that PQ^(2)=4PM^(2)-3PR^(2)

In the adjoining diagram, If OP=7.2, OR=16.2, then find QR.

In the adjoining figure ,seg PS is a tangent segment. Line PR is a secant. If PQ=3.6, and QR=6.4, find PS.

In adjoining figure, seg PR cong seg PQ , show that seg PS gt seg PQ .

In the figure , point T is in the interior of rectangle PQRS . Prove that, TS^(2)+TQ^(2)=TP^(2)+TR^(2) (As shown in the figure, draw seg AB|| side SR and A-T-B .)

Seg PM is a median of triangle PQR . If PQ=40, PR=42 and PM=29, find QR.