A hyperbola, having the transverse axis of length `2sin theta`, is confocal with the ellipse `3x^2 + 4y^2=12`. Then its equation is

A hyperbola, having the transverse axis of length 2 sin theta , is confocal with the ellipse 3x^(2) + 4y^(2) = 12 . Then its equation is

A hyperbola having the transverse axis of length 2 sin theta is confocal with the ellipse 3x^(2)+4y^(2)=12. Then its equation is

A hyperbola having the transverse axis of length 2sintheta is confocal with the ellipse 3x^2+4y^2=12 . Then its equation is x^2cos e c^2theta-y^2sec^2theta=1 x^2sec^2theta-y^2cos e c^2theta=1 x^2sin^2theta-y^2cos^2theta=1 x^2cos^2theta-y^2sin^2theta=1

A hyperbola having the transverse axis of length 2sintheta is confocal with the ellipse 3x^2+4y^2=12 . Then its equation is (a) x^2cos e c^2theta-y^2sec^2theta=1 (b) x^2sec^2theta-y^2cos e c^2theta=1 (c) x^2sin^2theta-y^2cos^2theta=1 (d) x^2cos^2theta-y^2sin^2theta=1

A hyperbola having the transverse axis of length 2sintheta is confocal with the ellipse 3x^2+4y^2=12 . Then its equation is x^2cos e c^2theta-y^2sec^2theta=1 x^2sec^2theta-y^2cos e c^2theta=1 x^2sin^2theta-y^2cos^2theta=1 x^2cos^2theta-y^2sin^2theta=1

A hyperbola having the transversal axis of length 2sintheta is confocal with the ellipse 3x^2+4y^2=12 Then its equations is :

A hyperbola having the transverse axis of length 2 sin theta , is confocal with the ellipse 3x^2+4y^2=12. Then show that the equation of this hyperbola is (x^(2))/(sin^(2) theta)-y^(2)/(cos^(2) theta)=1 .