The normal to the curve `5x^(5)-10x^(3)+x+2y+6 =0` at P(0, -3) meets the curve again at the point

Show that the normal to the curve 5x^(5)-10x^(3)+x+2y+6=0 at P(0,-3) meets the curve again at two points.Find the equations of the tangents to the curve at these points.

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=

(i) Find the point on the curve 9y^(2)=x^(3) where normal to the curve has non zero x -intercept and both the x intercept and y- intercept are equal. (ii) If the tangent at (1,1) on y^(2)=x(2-x)^(2) meets the curve again at P, then find coordinates of P (iii) The normal to the curve 5x^(5) -10x^(3) +x+2y+6=0 at the point P(0,-3) is tangent to the curve at some other point (s). Find those point(s)?

The tangent to the curve y=x-x^(3) at a point P meets the curve again at Q. Prove that one point of trisection of PQ lies on the Y-axis. Find the locus of the other points of trisection.

If the tangent at the point (a,b) on the curve x^(3)+y^(3)=a^(3)+b^(3) meets the curve again at the point (p,q) then 1) ab+pq=0 2) bq+ab+ap=0 3) bp+aq+ab=0 4) bq+pq+ap=0

Find the equations of the tangent and the normal to the curve y=x^4-b x^3+13 x^2-10 x+5 at (0,\ 5) at the indicated points

The equation of normal to the curve x^(2)+y^(2)-3x-y+2=0 at P(1,1) is

If the tangent at the point (p,q) to the curve x^(3)+y^(2)=k meets the curve again at the point (a,b), then