Semi-axes are 3 and 2

A planet revolves in an elliptical orbit around the sun. The semi-major and minor axes are a and b , then the time period is given by :

An ellipse is cutout of a circle of radius a,the major axis of the ellipse coincides with one of the diameter of the circle while the minor axis is equal to 2b .Prove that the area of the remaining part equals that of the ellipse with the semi axes a and a -b .

Find the equation of the ellipse whose foci are (2, 3) and (-2, 3) and whose semi-minor axis is sqrt(5) .

If the lengths of semi major and semi minor axes of an ellipse are 2 and sqrt(3) and their corresponding equation are y-5=0 and x+3=0 then write the equation of the ellipse.

Find the equation of the ellipse , referred to is principal axes , for which semi-minor axis = 3 , and passes through (-2 sqrt(5) ,2)

An ellipse is drawn by taking a diameter of the circle (x – 1)^2 + y^2 = 1 , as its semi-minor axis and a diameter of the circle x^2 + (y – 2)^2 = 4 as its semi-major axis. If the centre of the ellipse is at the origin and its axes are the coordinate axes, then the equation of the ellipse is:

A planet revolves round the sun in an elliptical orbit of semi minor and semi major axes x and y respectively. Then the time period of revolution is proportional to

If the lengths of major and semi-minor axes of an ellipse are 4 and sqrt3 and their corresponding equations are y - 5 = 0 and x + 3 = 0, then the equation of the ellipse, is

An ellipse and a hyperbola have their principal axes along the coordinate axes and have a common foci separated by distance 2sqrt(3) .The difference of their focal semi-axes is equal to 4.If the ratio of their eccentricities is 3/7, find the equation of these curves.