Taking major and minor axes along y and x-axes, find the equation of the ellipse whose
coordinates of foci are `(0 , pm1)` and the length of minor axis is 2 .

Taking major and minor axes along y and x-axes, find the equation of the ellipse whose coordinates of foci are (0,pm 8) and the eccentricity is (4)/(5)

Taking major and minor axes along y and x-axes, find the equation of the ellipse whose coordinates of one vertex are (0,-5) and the coordiantes of one end of minor axis are (-3,0) .

Taking major and minor axes along y and x-axes, find the equation of the ellipse whose length of minor axis is 2 and the distance between the foci is sqrt(5)

Taking major and minor axes along y and x-axes, find the equation of the ellipse whose eccentricity sqrt((3)/(7)) and the length of latus rectum (8)/(sqrt(7))

Taking major and minor axes as x and y - axes respectively , find the equation of the ellipse whose coordinates of vertices are (pm 4 , 0 ) and the coordinates of the ends of monor axes are (0 , pm 2 ) .

Taking major and minor axes as x and y - axes respectively , find the equation of the ellipse whose coordinates of vertices are (pm 5 , 0) and the coordinates of one focus are (4,0) .

Taking major and minor axes as x and y-axes respectively , find the eqation of the ellipse Whose eccentricity is (3)/(5) and coordinates of foci are (pm 3, 0 )

Taking the major and minor axes as the axes of coordinates, find the equation of the ellipse whose length of latus rectum is 8 and length of semi - major axis is 9

Taking major and minor axes as x and y - axes respectively , find the equation of the ellipse whose distance between the foci is 4sqrt(3) unit and minor axis is of length 4 unit .

Taking major and minor axes as x and y -axes respectively, find the equation of the ellipse whose lengths of minor axis and latus rectum are 4 and 2 .