The slope of the normal to the curve `x^(2) + 3y + y^(2) = 5` at the point (1,1) is

The slope of the normal to the curve y=2x^(2)+3 sin x at x = 0 is

The normal to the curve x^(2)+2xy-3y^(2)=0, at (1,1)

The slope of the tangent to the curve (y-x^5)^2=x(1+x^2)^2 at the point (1,3) is.

If m denotes the slope of the normal to the curve y= -3 log(9+x^(2)) at the point x ne 0 , then,

Find the equations of the tangent and the normal to the curve 16x^2+9y^2=145 at the point (x_1,y_1) , where x_1=2 and y_1gt0

Find the slope of the normal to the curve x = a sin^(3)t, y = b cos^(3)t at point where t = (pi)/(2) .

The slope of normal to the curve x^(3)=8a^(2)y, a gt 0 at a point in the first quadrant is -(2)/(3) , then point is

Equation of the normal to the curve y=-sqrt(x)+2 at the point (1,1)

Find the slopes of the tangent and the normal to the curve x^2+3y+y^2=5 at (1, 1)

Find the slopes of the tangent and the normal to the curve x^2+3 y2=5 at (1,1)