Find the slope of the normal to the curve `x=a cos^(3) theta,y=a sin^(3) theta` at `theta=(pi)/(4)` .

Find the slope of the normal to the curve x = a cos^(3)theta, y = a sin^(3) theta at theta = (pi)/3 .

Find the slope of the normal to the curve x=1 -a sin theta , y = b cos^(2) theta at theta= (pi)/(2) .

Find the slope of the normal to the curve x = 1 - a sin theta, y = b cos^(2) theta at theta = (pi)/2 .

x = a cos theta, y = b sin theta .

The slope of the nomal to the curve x = a(theta - sin theta), y = a(1-cos theta) at theta = pi/2 is

Solve 7 cos^(2) theta+3 sin^(2) theta=4 .

If x=a cos ^(3) theta and y = a sin^(3) theta then (dy)/( dx) =

The slope of the normal to the curve : x=a(cos theta+theta sin theta), y =a(sin theta-theta sin theta) at any point 'theta' is :

If x= a cos^(3) theta, y= a sin^(3) theta , then 1 + ((dy)/(dx))^(2) is______

If x = a cos^(3) theta , y = a sin^(3) theta , then 1+((dy)/(dx))^(2) is _______