Consider an ellipse with foci at (3,6) and (3,10) .If the y -axis is a tangent to the ellipse,then equation of ellipse

If an ellipse has its foci at (2,0) and (-2,0) and its length of the latus rectum is 6, then the equation of the ellipse is:

An ellipse passes through the point (2,3) and its axes along the coordinate axes, 3x +2y -1 = 0 is a tangent to the ellipse, then the 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.

Let x+2=0 is a tangent to an ellipse whose foci are (1,3) and (4,7) .If e is the eccentricity of the ellipse then e^(2)+(266)/(97) is equal to

Let A(3.2) and B(4,7) are the foci of an ellipse and the line x+y-2=0 is a tangent to the ellipse,then the point of contact of this tangent with the ellipse is

Equation of the ellipse whose foci are (2,2) and (4,2) and the major axis is of length 10 is

The latus rectum of an ellipse is 10 and the minor axis Is equal to the distnace betweent the foci. The equation of the ellipse is

Foci of an ellipse are at S(1,7),S'(1,-3) .The point P is on the ellipse such that SP=7,S'P=5 .then the equation of the ellipse is