If `e_1 and e_2` are the eccentricities of a hyperbola and its conjugate then prove that `(1)/(e_1^2)+(1)/(e_2^2)=1`.

If e and e' be the eccentricities of a hyperbola and its conjugate , then 1/e^2+1/(e'^2) equals :

If e_(1)ande_(2) are the ecentricities of a hyperbola 3x^(2)-2y^(2)=25 and its conjugate , then

If e and e^(prime) are eccentricities of a hyperbola its conjugate, then (1)/(e^(2))+(1)/((e^(1))^(2))=

If e and e' be the eccentricities of a hyperbolas xy=c^2 and x^2-y^2=c^2 , then e^2+e'2 equals :

If e_(1) is the eccentricity of the ellipse (x^(2))/(16)+(y^(2))/(25)=1 and e_(2) is the eccentricity of the hyperbola passing through the foci of the ellipse and e_(1) . e_(2)=1 , then the equation of the hyperbola

If e_1 and e_2 are eccentricities of two hyperbolas : x^2/a^2-y^2/b^2=1 and x^2/b^2-y^2/a^2=1 , then :

If e and e' are the eccentricities of the hyperbola (x^(2))/(a^(2))-(y^(2))/(b^(2)) =1 and (y^(2))/(b^(2))-(x^(2))/(a^(2))=1 , then the point ((1)/(e),(1)/(e')) lies on the circle:

If e_(1) and e_(2) are eccentricities of the ellipse (x^(2))/(18)+(y^(2))/(4)=1 and the hyperbola (x^(2))/(9)-(y^(2))/(4)=1 respectively, then the relation between e_(1) and e_(2) is

int(e^(2x) -1)/(e^(2x) + 1) dx

f(x) = ((e^(2x)-1)/(e^(2x)+1)) is