Serves as a continuation of Calculus I. Integration and techniques of integration ... Volumes using cross-sections, the disk method, the washer method and the shell method. Arc length and surface area ...

This page contains links to calculus tests offered at UAB in the past ... No work need be shown. Part II tests problem-solving skills; it generally offers multi-step problems including word-problems ...

Calculate the total area of the curve \(y = {x^3}\) and the \(x\)-axis between \(x = 2\) and \(x = - 2\). When you have a problem where part of the area is above the \(x\)-axis and part is below ...

If you’re not sure whether to start in MATH 105 (Calculus I), MATH 106 (Calculus II), or beyond, start here. GOAL The purpose of these exams is to help you decide whether you should skip Math 105 ...

Cylindrical and spherical coordinates, double and triple integrals, line and surface integrals. Change of variables in multiple integrals; gradient, divergence, and ...

x_n - \frac{f(x_n)}{f^{\prime}(x_n)}$$ This produces a sequence \(x_1, x_2, x_3, \ldots \) which converges to the root (hopefully). An implementation of Newton's Method is shown in the code block ...

He’s been working on the project as a way to simplify getting programs onto the Apple II he has on his “retro bench”. When plugged in, the computer sees it as a disk drive. The storage is ...

To calculate the area between a curve and the \(x\)-axis we must evaluate using definite integrals. First, we need to find out where the curve cuts the \(x\)-axis. Remember, a curve cuts the \(x ...

A hard disk comprises one or more aluminum or glass platters, coated with a ferromagnetic material. Although the terms "hard disk" and "hard drive" are used synonymously; technically, the disk ...

His 6 axis robot arm is certainly a strong first step on that road. As many people have learned, DIY robot arms are pretty difficult. [Dan]’s arm has the additional complexity of being 3D ...