The equation of normal to `x+y=x^(y)`, where it intersects X-axis, is given by

The equation of the normal to the curve y=x^(-x) at the point of its maximum is

In the curve y=c e^(x/a) , the sub-tangent is constant sub-normal varies as the square of the ordinate tangent at (x_1,y_1) on the curve intersects the x-axis at a distance of (x_1-a) from the origin equation of the normal at the point where the curve cuts y-a xi s is c y+a x=c^2

The equation of the normal to the parabola, x^(2)=8y " at " x=4 is

The equation of a curve is given as y=x^(2)+2-3x . The curve intersects the x-axis at

The equation of the normal to the curve y= e^(-2|x|) at the point where the curve cuts the line x=-(1)/(2), is

The equation of the normal to the curve y=e^(-2|x|) at the point where the curve cuts the line x = 1//2 is

Find the equation of normal of the curve 2y= 7x - 5x^(2) at those points at which the curve intersects the line x = y.

Write the equation of the normal to the curve y=x+sinxcosx at x=pi/2 .

Find the equation of the normal to the curve x^3+y^3=8x y at the point where it meets the curve y^2=4x other than the origin.

Find the angle between the tangents drawn to y^2=4x , where it is intersected by the line y=x-1.