How do you convert #r = 7(1 - sin(θ))# into rectangular form? Trigonometry The Polar System Converting Between Systems 1 Answer Cem Sentin Dec 17, 2017 #(x^2+7y+y^2)^2=49x^2+49y^2# Explanation: #r=7*(1-sin(theta))# #r=7-7sin(theta)# #r^2=7r-7rsin(theta)# After using #r=sqrt(x^2+y^2)#, #r^2=x^2+y^2# and #y=rsin(theta)# inverse transforms, #x^2+y^2=7sqrt(x^2+y^2)-7y# #x^2+7y+y^2=7sqrt(x^2+y^2)# #(x^2+7y+y^2)^2=49x^2+49y^2# Answer link Related questions How do you convert rectangular coordinates to polar coordinates? When is it easier to use the polar form of an equation or a rectangular form of an equation? How do you write #r = 4 \cos \theta # into rectangular form? What is the rectangular form of #r = 3 \csc \theta #? What is the polar form of # x^2 + y^2 = 2x#? How do you convert #r \sin^2 \theta =3 \cos \theta# into rectangular form? How do you convert from 300 degrees to radians? How do you convert the polar equation #10 sin(θ)# to the rectangular form? How do you convert the rectangular equation to polar form x=4? How do you find the cartesian graph of #r cos(θ) = 9#? See all questions in Converting Between Systems Impact of this question 2586 views around the world You can reuse this answer Creative Commons License