For hyperbola `x^2/(cos^2alpha)-y^2/(sin^2alpha)=1`which of the following remains constant with change in `alpha`

For hyperbola x^(2)sec^(2)alpha-y csc^(2)alpha=1 which of the following remains constant with change in 'alpha' abscissa of vertices (b) abscissa of foci eccentricity (d) directrix

For the hyperbola (x^(2))/(cos^(2)alpha)-(y^(2))/(sin^(2)alpha)=1 which of the following remains constant when varies? (1) eccentricity (2) directrix (3) abscissae of vertices (4) abscissae of foci

For the hyperbola (x^(2))/(cos^(2)alpha)-(y^(2))/(sin^(2)alpha)=1; (0

Given the family of hyperbolas x^(2)/(cos^(2)alpha)-y^(2)/sin^(2)alpha=1" for "alphain(0,pi//2) which of the following does not change with varying alpha ?

For the hyperbola (x^(2))/(cos^(2)alpha)-(y^(2))/(sin^(2)alpha)=1;(0

For the hyperbola (x^(2))/(cos^(2) alpha ) - (y^(2))/(sin^(2) alpha ) = 1 , where alpha is a parameter, which of the following remains constant ?

If f(alpha,beta)=cos^(2)alpha+sin^(2)alpha cos2 beta then which of the following is incorrect

(sin alpha)/(1+cos alpha)+(1+cos alpha)/(sin alpha)=2cosec alpha