In `DeltaABC, A=(1,2), B=(5, 5), angleACB=90^(0)`. If area of `DeltaABC` is to be 6.5 sq. units, then the possible number of points for C is

In DeltaABC AC=12 cm , AB=5 cm and angleBAC=30^@ , then area of the DeltaABC is……………

In triangle ABC, if angle C is 90° and the area of triangle is 30 sq. units, then the minimum possible value of the hypotenuse c is equal to (in units)

Let A (4, 2), B(6, 5) and C(1, 4) be the vertices of DeltaABC . AD is the median on BC. Find the coordinates of the point D.

A ( 1, - 1) , B(2frac{1}{2},0) , C (4 , 1) then area of DeltaABC = ........sq. units.

A(2, 3), B(-3, 4) are two points. If a point P moves such that the area of DeltaPAB is 8.5 sq. units, then locus of P is

P(3, 1), Q(6, 5) and R(x, y) form a triangle where anglePQR=90^(@) and area of DeltaRPQ=7 . Then the number of such points R is

If G is the centroid of DeltaABC and if area of DeltaAGB is 5 sq.unit. then the area of DeltaABC is

In DeltaABC , if a =4 , b = 5, c= 60 ^(@) , then C =

If A , B , C are collinear then area of DeltaABC = .....

The area of parallelogram is .......if Delta ABC = 5 sq.units.