Foci of an ellipse are at S(l,7),S'(l,-3) - The point P is on the ellipse such that SP = 7, S'P = 5. Then the equation of the ellipse is

Foci are (0, pm 3), e = 3/4 , equation of the ellipse is

If the foci of an ellipse are (0,+-1) and the minor axis is of unit length, then find the equation of the ellipse. The axes of ellipse are the coordinate axes.

The foci of an ellipse are S(3,1) and S'(11,5) The normal at P is x+2y-15=0 Then point P is

If an ellipse passes through the point P(-3, 3) and it has vertices at (+-6, 0) , then the equation of the normal to it at P is:

S_1, S_2 , are foci of an ellipse of major axis of length 10 units and P is any point on the ellipse such that perimeter of triangle PS_1 S_2 , is 15 . Then eccentricity of the ellipse is:

If (0, 3+sqrt5) is a point on the ellipse whose foci and (2, 3) and (-2, 3) , then the length of the semi - major axis is

An ellipse intersects the hyperbola 2x^2-2y^2 =1 orthogonally. The eccentricity of the ellipse is reciprocal to that of the hyperbola. If the axes of the ellipse are along the coordinate axes, then (a) the foci of ellipse are (+-1, 0) (b) equation of ellipse is x^2+ 2y^2 =2 (c) the foci of ellipse are (+-sqrt 2, 0) (d) equation of ellipse is (x^2 +y^2 =4)

the foci of an ellipse are (0+-6) and the equation of the directrces are y=+- 9. the equation of the ellipse is

If foci of an ellipse are (-2,3),(5,9) & 2x+3y+15=0 is tangent to the ellipse. Then find the point of contact the tangent cannot be

A circle of maximum area is inscribed in an ellipse. If p is the probability that a point within the ellipse chosen at random lies outside the circle, then the eccentricity of the ellipse is