The normal to the curve `3y = 6x - 5x^3` at the point `(1, 1/3)` passes through the point :

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

The normal to a given curve at each point (x,y) on the curve passes through the point (3,0) .If the curve contains the point (3,4) find its equation.

Find the equation of the normal to the curve ay^(2)=x^(3), at the point (am^(2),am^(3)). If normal passes through the point (a,0) then find the slope.

Sum of the abscissa and ordinate of the centre of the circle touching the line 3x+y+2=0 at the point (-1,1) and passing through the point (3,5) is-

The point on the curve 3y=6x-5x^(3) the normal at Which passes through the origin,is

Find the equation of tangent and normal to the curve y =3x^(2) -x +1 at the point (1,3) on it.

The point on the curve 3y=6x-5x^(3) the normal at which passes through the origin is (p,q/r) then find the value of p+q+r (where p,q,repsilonN and q,r relative prime)

The normal to the curve 5x^5-10x^(3)+x+2y+6=0 at the point P(0,-3) meets the curve again at n number of distinct points (other than P then n=

The number of normals to the curve 3y ^(3) =4x which passes through the point (0,1) is