Taking the major and minor axes as the axes of coordinates, find the equation of the ellipse
whose length of latus rectum is `(32)/(5)` . Unit and the coordinates of one focus are (3,0)

Taking major and minor axes as x and y - axes respectively , find the equation of the ellipse whose length of latus rectum is (18)/(5) unit and the coordinates of one focus are (4,0)

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 the major and minor axes as the axes of coordinates, find the equation of the ellipse Which passes through the point (2,2) and (3,1)

Taking the major and minor axes as the axes of coordinates, find the equation of the ellipse whose lengths of major and minor axes are 6 and 3 respectively

Taking the major and minor axes as the axes of coordinates , find the equation of the ellipse whose length of minor axis is 10 and distance between the f oci is 24

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 .

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 the major and minor axes as the axes of coordinates, find the equation of the ellipse whose eccentricity is (sqrt(7)/(4)) and distance between the directrices is (16)/(sqrt(7))

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 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 ) .