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`

The tangent to the curve y = e^(2x) at (0,1) meets the x-axis at

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

If the tangent to the curve 4x^(3)=27y^(2) at the point (3,2) meets the curve again at the point (a,b) . Then |a|+|b| is equal to -

Tangent at P(2,8) on the curve y=x^(3) meets the curve again at Q. Find coordinates of Q.

If the tangent at (1,1) on y^2=x(2-x)^2 meets the curve again at P , then find coordinates of P .

If the tangent at P(1,1) on the curve y^(2)=x(2-x)^(2) meets the curve again at A , then the points A is of the form ((3a)/(b),(a)/(2b)) , where a^(2)+b^(2) is

If the tangent at (1,1) on y^2=x(2-x)^2 meets the curve again at P , then find coordinates of Pdot

If the tangent to the curve x = t^(2) - 1, y = t^(2) - t is parallel to x-axis , then

If the tangent at (x_1,y_1) to the curve x^3+y^3=a^3 meets the curve again in (x_2,y_2), then prove that (x_2)/(x_1)+(y_2)/(y_1)=-1

If the tangent at (x_1,y_1) to the curve x^3+y^3=a^3 meets the curve again in (x_2,y_2), then prove that (x_2)/(x_1)+(y_2)/(y_1)=-1