An ellipse of eccentricity `(2 sqrt2)/(3)` is inscribed in a circle and a point within the circle is choosen at random. The probability that this point lies outside the ellipse is :

An ellipse is inscribed in a circle and a point within the circle is chosen at random. If the probability that this point lies outside the ellipse is 2/3 then the eccentricity of the ellipse is: (A) (2sqrt2)/3 (B) sqrt5/3 (C) 8/9 (D) 2/3

Show that the point (2,3) lies outside the parabola y^2=3x .

Draw a circle of radius 3 cm. Take a point outside the circle. Construct the pair of tangents from this point to the circle.

Prove that of all chords of a circle through a given point within it, the least is one. Which is bisected at that point.

Find the eccentric angle of a point on the ellipse (x^2)/6+(y^2)/2=1 whose distance from the center of the ellipse is sqrt(5)

A conic C satisfies the differential equation (1+y^(2))dx-xydy=0 and passes through the point (1, 0) . An ellipse E which is confocal with C having its eccentricity equal to sqrt((2)/(3)) Q. find the locus of the point of intersection of the perpendicular tangents to the ellipse E

The eccentric angle of a point on the ellipse x^(2)/6 + y^(2)/2 = 1 whose distance from the centre of the ellipse is 2, is

The ellipse x^2+ 4y^2 = 4 is inscribed is a rectangle alligned with the co-ordinate axes, which in turn is inscribed in another ellipse that passes through the point (4, 0). Then the equation of the ellipse is :

An ellipse has eccentricity (1)/(2) and one focus at the point P ((1)/(2), 1) . Its one directrix is the common tangent nearer to the point P, to the circle x^(2)+y^(2)=1 and the hyperbola x^(2)-y^(2)=1 . The equation of the ellipse is standard form is

The ellipse x^2+""4y^2=""4 is inscribed in a rectangle aligned with the coordinate axes, which in turn is inscribed in another ellipse that passes through the point (4, 0). Then the equation of the ellipse is (1) x^2+""16 y^2=""16 (2) x^2+""12 y^2=""16 (3) 4x^2+""48 y^2=""48 (4) 4x^2+""64 y^2=""48