Chapter 10 - Parametric Equations and Polar Coordinates - Review - Exercises - Page 730: 19

As we are given that $$r=\frac{sin \theta}{\theta}$$ However, $$r \to 0$$ as $$\theta \to \infty $$. The graph for $$r=\frac{sin \theta}{\theta}$$ look alike as an oscillating curve becoming flatter and flatter as $r$ increases.Refer the attached graph.

As we are given that $$r=\frac{sin \theta}{\theta}$$ However, $$r \to 0$$ as $$\theta \to \infty $$. The graph for $$r=\frac{sin \theta}{\theta}$$ look alike as an oscillating curve becoming flatter and flatter as $r$ increases.Refer the attached graph.