Although calculus has a reputation of being tough ... the derivative of that function describes the rate of change at any point. The integral describes the area under the curve of the function.

He explained such concepts as the fundamental theorem of calculus, derivatives, integration, and Gabriel’s Horn at a 5th ...

Type in a function, it will tell you lots of things about it (yes, including it's derivative and indefinite integral). This site only launched 1.5 years ago and I put this link here as yet another ...

Introduction to area and integration. Students are expected to have taken pre-calculus and trigonometry in order to be successful in this course.

Double and triple integrals in Cartesian, polar and spherical coordinates. Vector fields and the fundamental theorems of vector calculus developed, line and surface integrals, Green's theorem, ...

Concepts covered in this course include: standard functions and their graphs, limits, continuity, tangents, derivatives, the definite integral, and the fundamental theorem of calculus. Formulas for ...

Continuation of APPM 1340. Studies selected topics in calculus: derivatives and their applications, integration, differentiation and integration of transcendental functions. Algebraic and ...

Implementations of the following numerical integration techniques are given below: Left-hand Riemann sum, Right-hand Riemann sum, Midpoint Rule, Trapezoid Rule, and Simpson's Rule. Modify and evaluate ...

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

This can solve differential equations and evaluate definite integrals. Applying differential calculus Optimization is used to find the greatest/least value(s) a function can take. This can involve ...