Find the equation of an ellipse, the lengths of whose major and minor axes are 10 and 8 units respectively.

Taking major and minor axes as x and y -axes respectively, find the equation of the ellipse whose lengths of major and minor axes are 6 and 5 respectively .

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

Find the equation of the ellipse the ends of whose major and minor axes are (pm 4, 0) and (0, pm 3) respectively.

Find the equation of the ellipse whose major axis is 8 and minor axis is 4.

Find the equation of the ellipse whose major axis is 8 and minor axis is 4.

The order of the differential equation of ellipse whose major and minor axes are along x-axis and y-axis respectively,is

Find the differential equation of an ellipse with major and minor axes 2a and 2b respectively.

Find the differential equation of an ellipse with major and minor axes 2a and 2b respectively.

The equation of the ellips is (x^(2))/(36)+(y^(2))/(16)=k. The differential equation of the ellips whose length of major and minor axes half the lenghts of the given ellipse respectively, is

Find the equation of the ellipse whose foci are at (-2, 4) and (4, 4) and major and minor axes are 10 and 8 respectively. Also, find the eccentricity of the ellipse.