Exam 3 will cover everything from Taylor’s Theorem of Remainder to graphs of polar equations. Specifically, there will be one problem from binomial series, one from Taylor’s theorem, two problems on parametric equations, and one problem from polar coordinates. Background material you should know is the same as that from exam 1. Additionally, you should know Mclaurin series of e^x, sinx, cosx, and lnx, just like exam2. You should also be able to complete squares. You should also know basic x-y equations such as circles and ellipse, not necessarily centered at origin. You should know those basic polar equations (r=constant, theta=constant).