If `E_1:x^2/a^2+y^2/b^2=1 , agtb . E_2` is an ellipse which touches `E_1` at the ends of major axis of `E_1` and end of major axis of `E_1` are the focii of `E_2` and the eccentricity of both the ellipse are equal then find `e`

A series of concentric ellipses E_1,E_2, E_3..., E_n are drawn such that E touches the extremities of the major axis of E_(n-1), and the foci of E_n coincide with the extremities of minor axis of E_(n-1) If the eccentricity of the ellipses is independent of n, then the value of the eccentricity, is (A) sqrt 5/3 (B) (sqrt 5-1)/2 (C) (sqrt 5 +1)/2 (D) 1/sqrt5

Consider an ellipse x^2/a^2+y^2/b^2=1 Let a hyperbola is having its vertices at the extremities of minor axis of an ellipse and length of major axis of an ellipse is equal to the distance between the foci of hyperbola. Let e_1 and e_2 be the eccentricities of an ellipse and hyperbola respectively. Again let A be the area of the quadrilateral formed by joining all the foci and A, be the area of the quadrilateral formed by all the directrices. The relation between e_1 and e_2 is given by

If e be the eccentricity of ellipse 3x2+2xy+3y^(2)=1 then 8e^(2) is

Let E be an ellipse such that x+y= 2sqrt5 is a tangent to E and E passes through (3,-1). If axes of E are along the coordinates axes and e is the eccentricity of E, then e^2 equals _____

Consider the ellipse E_(1),(x^(2))/(a^(2))+(y^(2))/(b^(2))=1,(a>b). An ellipse E_(2) passes through the extremities of the major axis of E_(1) and has its foci at the ends of its minor axis.Consider the following on an ellipse is equal to its major axis. Equation of E_(2) is

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

If x^2/(sec^2 theta) +y^2/(tan^2 theta)=1 represents an ellipse with eccentricity e and length of the major axis l then

S and T are the foci of the ellipse (x^(2))/(a^(2))+(y^(2))/(b^(2))=1 and B is an end of the minor axis.If STB is an equilateral triangle,the eccentricity of the ellipse is e then find value of 4e