If the eccentricity of an ellipse is `1/sqrt2`, then its latusrectum is equal to its

If the eccentricity of an ellipse be (1)/(sqrt2), then its latus rectum is equal to its

If the eccentricity of an ellipse be (1)/(sqrt2), then its latus rectum is equal to its

Find the eccentricity of an ellipse if its latus rectum is equal to one-half of its major axis.

Find the eccentricity of an ellipse if its latus rectum is equal to one-half of its major axis.

Let the equation of ellipse be x^(2)/(a^(2)+1)=y^(2)/(a^(2)+2)=1 Statement 1 If eccentricity of the ellipse be 1/sqrt6 , then length of latusrectum is 10/sqrt6 . Statement 2 Length of latusrectum= (2(a^(2)+1))/(sqrt(a^(2)+2))

Let the equation of ellipse be x^(2)/(a^(2)+1)=y^(2)/(a^(2)+2)=1 Statement 1 If eccentricity of the ellipse be 1/sqrt6 , then length of latusrectum is 10/sqrt6 . Statement 2 Length of latusrectum= (2(a^(2)+1))/(sqrt(a^(2)+2))

The eccentricity of the ellipse whose latus rectum is equal to half of its minor axis is

If the eccentricity of an ellipse is 5/8 and the distance between its foci is 10 , then find the latusrectum of the ellipse.