If S = 0, S' =0 are two touching circles then angle between their radical axis and the common tangent at the at their points of contanct is

The angle between x-axis and tangent of the curve y=(x+1) (x-3) at the point (3,0) is

A pair of tangent is drawn to a circle in such way that angle between these two tangents is 60. Then the angle between the radii drawn from the these two points of contact will be ......

The circles x^2+y^2-2x-4y+1=0 and x^2+y^2+4x+4y-1=0 (a)touch internally (b)touch externally (c)have 3x+4y-1=0 as the common tangent at the point of contact have 3x+4y+1=0 (d)as the common tangent at the point of contact

The circles x^2+y^2-2x-4y+1=0 and x^2+y^2+4x+4y-1=0 ............a)touch internally b)touch externally c)have 3x+4y-1=0 as the common tangent at the point of contact d)have 3x+4y+1=0 as the common tangent at the point of contact

The angle between the tangents to the curve y = x^(2) - 5 x + 6 at the point (2,0) and (3,0) is

In Figure, two circles touch each other at the point C . Prove that the common tangent to the circles at C , bisects the common tangent at P and Q .

In the figure, two circles touch each other at the point C.Prove that the common tangents to the circles at C, bisect the common tangents at P and Q.

Statement 1 : The number of common tangents to the circles x^(2) +y^(2) -x =0 and x^(2) +y^(2) +x =0 is 3. Statement 2 : If two circles touch each other externally then it has two direct common tangents and one indirect common tangent.

Two circles with radii a and b touch each other externally such that theta is the angle between the direct common tangents, (a > bgeq2) . Then prove that theta=2sin^(-1)((a-b)/(a+b)) .

Two circles with radii a and b touch each other externally such that theta is the angle between the direct common tangents, (a > bgeq2) . Then prove that theta=2sin^(-1)((a-b)/(a+b)) .