The normal at a point `theta` to the curve `x=a(1+cos theta),y=a sin theta` always passes through the fixed point

The normal to the curve x=a(1+costheta),y=asintheta at 'theta' always passes through the fixed point

If 'theta' is the parameter, then the family of lines (2cos theta+3 sin theta)x+(3cos theta-5sin theta)y-(5cos theta-2sin theta)=0 pass through the fixed point

At any point '' theta'' on the curve x=a cos^(3) theta, y= a sin^(3) theta , find the length of tangent normal, substangent and subnormal.

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)/(4) .

The loucs of the point of intersection of the tangents to the circle x=4 cos theta, y=4 sin theta at the points whose parametric angles differ by (pi)/3 is

The locus of the point (a cos h theta, b sin h theta ) is