Show that the normal to the curve 5x^5 -...

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.

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

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) intersects the curve again in two points. Also find 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=

Show that the tangent to the curve 3x y^2-2x^2y=1a t(1,1) meets the curve again at the point (-(16)/5,-1/(20))dot

Show that the tangent to the curve 3x y^2-2x^2y=1a t(1,1) meets the curve again at the point (-(16)/5,-1/(20))dot

Show that the tangent to the curve 3x y^2-2x^2y=1a t(1,1) meets the curve again at the point (-(16)/5,-1/(20))dot

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