For all real p, the line `2px+ysqrt(1-p^(2))=1` touches a fixed ellipse whose axex are the coordinate axes
The foci of the ellipse are

Show that for all real p the line 2px+y sqrt(1-p^(2))=1 touches a fixed ellipse . Find the ecentricity of this ellipse.

The line 2px+ysqrt(1-p^(2))=1(abs(p)lt1) for different values of p, touches a fixed ellipse whose exes are the coordinate axes. Q. The eccentricity of the ellipse is

The line 2px+ysqrt(1-p^(2))=1(abs(p)lt1) for different values of p, touches a fixed ellipse whose exes are the coordinate axes. Q. The locus of the point of intersection of prependicular tangents of the ellipse is

If a line 3 px + 2ysqrt(1-p^2) =1 touches a fixed ellipse E for all p in [- 1, 1], then equation of a directrix of E the ellipse is:

Show that for all real values of 't' the line 2tx+y sqrt(1-t^(2))=1 touches the ellipse.Find the eccentricity of the ellipse.

Find the equation of the ellipse whose axes are along the coordinate axes,foci at (0,+-4) and eccentricity 4/5.

An ellipse intersects the hyperbola 2x^2-2y =1 orthogonally. The eccentricity of the ellipse is reciprocal to that of the hyperbola. If the axes of the ellipse are along the coordinate axes, then (b) the foci of ellipse are (+-1, 0) (a) equation of ellipse is x^2+ 2y^2 =2 (d) the foci of ellipse are (t 2, 0) (c) equation of ellipse is (x^2 2y)

What is the order of the differential equation of all ellipses whose axes are along the coordinate axes?