Calculus has two parts: differential and integral. Integral calculus owes its origins to fundamental problems of measurement in geometry: length, area, and volume. It is by far the older branch.

On this day in 1675, Gottfried Leibniz demonstrates integral calculus for the first time to find the area under the graph of ...

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

We mentioned before about the \(+ c\) term. We are now going to look at how to find the value of \(c\) when additional information is given in the question.

Integral calculus essentially deals with adding up tiny parts to find a whole, like determining areas and volumes. By ...

Serves as a first course in calculus. Functions, limits, continuity, derivatives, rules for differentiation of algebraic and transcendental function; chain rule, implicit differentiation, related rate ...

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 ...

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 ...