`C_(1):x^(2)+y^(2)=r^(2)and C_(2):(x^(2))/(16)+(y^(2))/(9)=1` interset at four distinct points A,B,C, and D. Their common tangents form a peaallelogram A'B'C'D'.
if A'B'C'D' is a square, then r is equal to

Curves C_1:x^(2)+y^(2)=r^(2) and C_2:x^(2)/16+y^(2)/9=1 intersect at four distinct points A,B,C and D. Their common tangents from a parallelogram PQRS. Q. If ABCD is square, then the value of 25r^(2) is

Show that 16R^(2)r r_(1) r _(2) r_(3)=a^(2) b ^(2) c ^(2)

Show that the points : A (0,- 2), B (3, 1), C (0, 4) and D (- 3, 1) are the vertices of a square ABCD.

Statement I Circles x^(2)+y^(2)=4andx^(2)+y^(2)-8x+7=0 intersect each other at two distinct points Statement II Circles with centres C_(1),C_(2) and radii r_(1),r_(2) intersect at two distinct points if |C_(1)C_(2)|ltr_(1)+r_(2)

Two curves C_1: y=x^2-3\ a n d\ C_2\ : y\ k x^2\ ,\ k in R intersect each other at two different points. The tangent drawn to C_2 at one of the points of intersection A\ -= (a , y_1),(a >0) meets C_1 again at B\ (1, y_2)\ (y_1!=y_2)dot The value of ' a ' is 1 (b) 3 (c) 5 (d) 7

Find 'x' such that the four points : A(3,2,1),B(4,x,5),C(4,2,-2) and D(6,5,-1) are coplanar.

If a^(x)=b^((1)/(2)),b^(y)=c^((1)/(3)),c^(z)=a^((1)/(2)) , find xyz

The area of the quadrilateral ABCD, where A 0,4, 1), B (2, 3, -1), C (4, 5, 0) and D (2, 6, 2) is equal to

ABCD is such a quadrilateral A is the centre of the circle passing through B,C and D. Prove that : angleCBD + angleCDB = 1/2 angleBAD