Solve the problem. Find the tangent line(s) at the pole for the curve r= 8 sin 30, 0 << = (y=√³x), 0 = (y = √³x), 0 = = (x - H - 3 (y=1/³x 특x. 0 = 플 (X) x), 0 = (x = 0), 0 = ₁ -57 (y = -√3x) (y = √3x), 0 = 2 (y = -√3x) e = 0 (y=0), 0 = (x = 0), 0 = 2 (y = -√3x) 8 = 0 0 = 0 (y=0), 0 = K

Transcribed Image Text:

Solve the problem. Find the tangent line(s) at the pole for the curve r = 8 sin 30, 0 << e-(y-√3x), 0-₁(y-√3x). 0 = = = 0 = E|N (x = 0) 00=(y=x), 0 = (x = 0). 6 = 5 (y = -√3x) e 6 > က Oe=0(y=0), 0 = (y = √√3x), 0 = 2 (y = -√√3x) 3 27 e = 0 (y=0). e= (x = 0), e = (y = -√3x) 3 h