Prove that all normals to the curve `x=acost+a tsint ,\ \ y=asint-a tcost` are at a distance `a` from the origin.

Prove that all normals to the curve x = a cos t + at sin t, y = a sin t - at cos t are at a distance a from the origin.

Prove that all the normals to the curve x=a cos t+at sin t and y=a sin t-at cos t are at a distance 'a' from the origin (a in R^(+))

Show that the normal at any point theta to the curve x=acostheta+athetasintheta,\ y=asintheta-a\ thetacostheta is at a constant distance from the origin.

Show that the normal at any point theta to the curve x=acostheta+athetasintheta,\ y=asintheta-a\ thetacostheta is at a constant distance from the origin.

Show that the normal at any point θ to the curve x = a costheta + a theta sin theta, y = a sintheta – atheta costheta is at a constant distance from the origin.

Show that the normal at any point θ to the curve x = a costheta + a theta sin theta, y = a sintheta – atheta costheta is at a constant distance from the origin.

Show that the normal at any point θ to the curve x = a costheta + a theta sin theta, y = a sintheta – atheta costheta is at a constant distance from the origin.