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Home >> Math Homework Help >> Calculus Homework >> Polar Curve Asymptotes
Let the equation of a polar curve be expressed as = ƒ(θ). Let be a root of ƒ(θ) = 0. Then r sin (θ - ) = is an asymptote of the curve. Proof: Let P (r, θ) be any point on the given curve. We have Clearly P tends to infinity along the curve of r∞. Since is a root of ƒ(θ) = 0, it follows that θ as r∞. Now Thus the required asymptote y = mx + c becomes is an asymptote of the curve. Services: - Polar Curve Asymptotes Homework | Polar Curve Asymptotes Homework Help | Polar Curve Asymptotes Homework Help Services | Live Polar Curve Asymptotes Homework Help | Polar Curve Asymptotes Homework Tutors | Online Polar Curve Asymptotes Homework Help | Polar Curve Asymptotes Tutors | Online Polar Curve Asymptotes Tutors | Polar Curve Asymptotes Homework Services | Polar Curve Asymptotes