An ellipse E has its center C(3,1), focus at (3,6) and passing through the point P(7,4) Q. The product of the lengths of the prependicular segeent from the focii on tangent at point P is

An ellipse has its centre C(1,3) focus at S( 6, 3) and passing through the point P(4, 7) then The product of the lengths of perpendicular segments from the focii on tangent at point P is

An ellipse has foci (4, 2), (2, 2) and it passes through the point P (2, 4). The eccentricity of the ellipse is

The equation of the ellipse with its centre at (1,2), one focus at (6,2) and passing through the point (4,6) is-

An ellipse has its centre C(1,3) focus at S( 6, 3) and passing through the point P(4, 7) then If the normal at a variable point on the ellipse meets its axes in Q and R then the locus of the mid-point of QR is a conic with an eccentricity (e') then

An ellipse having foci (3,1) and (1,1) passes through the point (1,3) has the eccentricity

The slope of line passing through the points P(-3,5) and Q(4,-1) is

The locus of the foot of prependicular drawn from the center of the ellipse x^(2)+3y^(2)=6 on any tangent to it is

Find the centre and radius of the circle passing through the points P (-7,4) ,Q(0,3) and R (-4,5)

If an ellipse passes through the point P(-3, 3) and it has vertices at (+-6, 0) , then the equation of the normal to it at P is: