If `p` and `q` are the lengths of perpendicular from the origin to the line `xcos(theta)-ysin(theta)=kcos(2theta)` and` xsec(theta)+ycosec(theta)=k` respectively , then prove that `p^2+4q^2=k^2`

If p and q are the lengths of perpendicular from the origin to the line x cos(theta)-y sin(theta)=k cos(2 theta) and x sec(theta)+y cos ec(theta)=k respectively,then prove that p^(2)+4q^(2)=k^(2)

If p and q are the lengths of perpendiculars from the origin to the lines xcos theta -ysin theta = k cos 2 theta and x sec theta + y cosec theta= k , respectively, prove that p^2 + 4q^2 = k^2 .

If p and q are the lengths of perpendiculars from the origin to the lines xcostheta-ysintheta=kcos2theta and xsectheta+yc o s e ctheta=k , respectively, prove that p^2+4q^2=k^2 .

If p and q are the lengths of perpendiculars from the origin to the lines xcostheta-ysintheta=kcos2theta and xsec""theta+y" cosec"""theta=""k , respectively, prove that p^2+4q^2=k^2 .

If p and q are the lengths of perpendiculars from the origin to the lines xcostheta-ysintheta=kcos2theta and xsec""theta+y" cosec"""theta=""k , respectively, prove that p^2+4q^2=k^2 .

If p and q are the lengths of perpendicular from the origin to the lines x cos theta-y sin theta=k cos 2theta and x sec theta+y "cosec" theta=k respectively, prove that p^(2)+4q^(2)=k^(2) .

If p and q are the lenghts of the perpendiculars from the origin to the lines x cos theta - y sin theta = k cos 2theta and x sec theta + y cosec theta = k respectively prove that p^2 + 4q^2= k^2

If p and q are the lengths of perpendiculars from the origin to the lines x cos theta - y sin theta = k cos 2 theta and x sec theta + y cosec theta=k respectively, prove that p^(2) + 4q^(2) = k^(2) .

If p and q are the lengths of perpendiculars from the origin to the lines x cos theta-y sin theta=k cos2 theta and x sec theta+y csc theta=k respectively,prove that quad p^(2)+4q^(2)=k^(2)

If p and q are the lengths of perpendicular from origin to the lines x cos theta-y sin theta=k cos 2 theta and x sec theta +y "cosec" theta =k respectively. Prove that p^(2)+4q^(2)=k^(2) .