Obtain equation of ellipse satisfying given conditions Eccentricity e = `(2)/(3)`, length of the latus rectum = 5

Obtain equation of ellipse satisfying given conditions Eccentricity e = (1)/(2) semi major axis of length = 4, Major axis is X- axis.

Obtain equation of ellipse satisfying given conditions Foci (0, pm 4) and eccentricity (4)/(5)

Obtain equation of ellipse satisfying given conditions Foci (pm 2,0) and eccentricity (1)/(2)

…….is the equation of ellipse with eccentricity e = (2)/(3) . Length of latus rectum is 5 and centre of origin.

Obtain equation of ellipse satisfying given conditions Coordinates of the foci (pm 3, 0) and passes from points (4,1).

In each of the find the equations of the hyperbola satisfying the given conditions. Foci (+-3sqrt(5),0) , the latus rectum is of length 8 .

In each of the find the equations of the hyperbola satisfying the given conditions. Foci (+-4,0) , the latus rectum is of length 12 .

Find equaiton of hyperbola satisfying given conditons Focus (1,2) eccentricity e = sqrt(3) and equation of the directrix is 2x + y - 1 = 0. (Hint : Use definition of the hyperbola).

Find equaiton of hyperbola satisfying given conditons Length of the latus rectum is 8, eccentricity (3)/(sqrt(5)) and X - axis as major axis.

Obtain equation of ellipse satisfying given conditions Major axis is X - axes and passes from points (4,3) and (-1, 4).