In the adjoining figure, M is the midpoint of `QR. anglePRQ = 90^(@)` prove that `PQ^(2) = 4 PM^(2) - 3 PR^(2)`

In the adjoining figure, angle PQR = 90^(@)T is the midpoint of side QR. Prove that PR^(2) = 4PT^(2) - 3PQ^(2)

In adjoining figure, point T is in the interior of rectangle PQRS. Prove that, TS^(2) + TQ^(2) = TP^(2) + TR^(2)

In the adjoining figure , Delta PQR is an equilateral triangle. QR = RN . Prove that PN^(2) =3PR^(2)

In adjoining figure, PQ = QR . angleP = 60^(@) :. m (arc PR)= .....

In the adjoining figure, seg BD bot "side" AC, C-D-A. "Prove that" : AB^(2) = BC^(2) + AC^(2) - BC.AC

In the adjoining figure, point Q is the point of contact of tangent and circle . If PQ = 12, PR = 8, then find Ps and RS .

In the adjoining figure , seg PQ || AB. Seg PR || seg BD. Prove that QR||AD.

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

In the adjoining figure, chord Pq and chord AB intersect at pointM . If PM = AM, then prove that BM = QM.

In the adjoining figure, ray PQ touches the circle at point Q. Line PRS is a secant, If P=12, PR=8 then PS and RS