Find the equation of the ellipse in the form `((x-h)^2)/a^2+((y-k)^2)/b^2=1`. Given the following data.
Centre(0,-3),e=`2/3`, semi -minor axis =5.

Find the equation of the ellipse in the form ((x-h)^2)/a^2+((y-k)^2)/b^2=1 . Given the following data. Centre(2,-1) one end of major axis (2,-5), e= 1/3 .

Find the equation of the ellipse in the form ((x-h)^2)/a^2+((y-k)^2)/b^2=1 . Given the following data. Centre(2,-1) , e= 1/2 , length of latus rectum 4.

Find the equation of the ellipse in the form ((x-h)^2)/a^2+((y-k)^2)/b^2=1 . Given the following data. Centre(4,-1) one end of major axis is (-1,-1), and passing through (8,0).

The equation of the minor axis of the ellipse (x-1)^(2)/(9)+(y-6)^(2)/(4)=1 is

Find the equation of the ellipse with centre (2, 1), e=1/3 one end of the major axis (2,-5).

Find the equation of the ellipse with focus at (1,-1) e= 2/3 and directrix as x+y+2=0 .

Find the equation of the ellipse whose focus (-1,1) e=1/2 and directrix is x-y+3=0

Find the equation of the ellipse in the standard form given e=1/2 and it passes through (2,1)

Find the equations of the tangent drawn to the ellipse (x^(2))/(3)+y^(2)=1 from the point (2,-1)