The graph of the conic `x^(2)-(y-1)^(2)=1` has one tangent line with positive slope that passes through the origin. The point of tangency being (a, b).
Length of the latusrectum of the conic is
(a) 1 (b) `sqrt(2)` (c) 2 (d) 4

The graph of the conic x^2-(y-1)^2=1 has one tangent line with positive slope that passes through the origin . The point of the tangency being (a,b) then find the value of sin^-1(a/b)

The graph of the conic x^(2)-(y-1)^(2)=1 has one tangent line with positive slope that passes through the origin. The point of tangency being (a, b). Q. If e be the eccentricity of the conic, then the value of (1+e^(2)+e^(4)) is

If the line x/a+y/b=1 passes through the points a (2,- 3) and (4, - 5), then (a, b) =

The slope of the line passing through the points (a^(2),b)and (b^(2),a) is

Graph the line passing through the point P and having slope m. P=(1,2),m=2

A parabola y=a x^2+b x+c crosses the x-axis at (alpha,0)(beta,0) both to the right of the origin. A circle also passes through these two points. The length of a tangent from the origin to the circle is: (a) sqrt((b c)/a) (b) a c^2 (c) b/a (d) sqrt(c/a)

Radius of the circle that passes through the origin and touches the parabola y^2=4a x at the point (a ,2a) is (a) 5/(sqrt(2))a (b) 2sqrt(2)a (c) sqrt(5/2)a (d) 3/(sqrt(2))a

Find the name of the conic represented by sqrt((x/a))+sqrt((y/b))=1 .

The tangent at a point P on the hyperbola (x^2)/(a^2)-(y^2)/(b^2)=1 passes through the point (0,-b) and the normal at P passes through the point (2asqrt(2),0) . Then the eccentricity of the hyperbola is

Q. Show that the feet of normals from a point (h, K) to the ellipse x^2/a^2+y^2/b^2=1 lie on a conic which passes through the origin & the point (h, k)