A hyperbola passes through the point `P(sqrt2,sqrt3)` and has foci at `(pm2,0)`. Then the tangent to this hyperbola at P also passes through the point

A hyperbola passes through the point (sqrt2,sqrt3) and has foci at (+-2,0) . Then the tangent to this hyperbola at P also passes through the point:

A tangent to the hyperbola y = (x+9)/(x+5) passing through the origin is

If a curve passes through the point (1, -2) and has slope of the tangent at any point (x,y) on it as (x^2-2y)/x , then the curve also passes through the point

The hyperbola (x^2)/(a^2)-(y^2)/(b^2)=1 passes through the point (2, ) and has the eccentricity 2. Then the transverse axis of the hyperbola has the length 1 (b) 3 (c) 2 (d) 4

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:

A ray of light is sent along the line which passes through the point (2, 3). The ray is reflected from the point P on x-axis. If the reflected ray passes through the point (6, 4), then the co-ordinates of P are

Find the equation of tangent to the hyperbola y=(x+9)/(x+5) which passes through (0, 0) origin

The tangent to the curve y=xe^(x^2) passing through the point (1,e) also passes through the point

The circle passing through the point (-1,0) and touching the y-axis at (0,2) also passes through the point:

The circle passing through (1, -2) and touching the axis of x at (3, 0) also passes through the point