" Equation of ellipse havinf latus rectum "8" and eccentricity "(1)/(sqrt(2))" is "

Equation of ellipse having letus rectum 8 and eccentricity (1)/(sqrt(2)) is

Find the equation of an ellipse whose latus rectum is 10 and eccentricity is (1)/(2) .

Find equation of ellipse whose l(latus-rectum) = (5)/(2) and eccentricity y = (1)/(2)

Find the equation of an ellipse whose latus rectum is 8 and eccentricity is 1/3

Obtain the equation of the ellipse whose latus rectum is 5 and whose eccentricity is 2/3 , the axes of the ellipse being the axes of coordinates.

The equation of the ellipse with its axes as the coordinate axes respectively and whose latus rectum = 8 and eccentricity = 1//sqrt(2) is

The equation of the ellipse with its axes as the coordinate axes respectively and whose latus rectum = 8 and eccentricity = 1//sqrt(2) is

Taking major and minor axes as x and y - axes respectively , find the equation of the ellipse whose eccentricity is (1)/(sqrt(2)) and length of latus rectum 3 .

Find the equation of the ellipse in the following case: eccentricity e=(2)/(3) and length of latus rectum =5 .