In the late 19th century, Karl Weierstrass invented a fractal-like function that was decried as nothing less than a “deplorable evil.” In time, it would transform the foundations of mathematics.

If you have a function that represents something, the derivative of that function describes the rate of change at any point. The integral describes the area under the curve of the function.

In the late 19th century, Karl Weierstrass invented a fractal-like function that was decried as nothing less than a “deplorable evil.” In time, it would transform the foundations of mathematics.

Unlike a lot of similar videos, this one covers more complex things like various rules and the integral and derivative of trig functions and logarithms.

This is a single variable calculus course with applications to the life sciences. Review of basic algebra, trigonometry, functions and graphs. Limits and derivatives, including differentiation rules, ...

What is the derivative and why do you need it in physics? Here is a very quick introduction to derivatives to get you through your first physics course.

Predrag M. Rajković, Slađana D. Marinković, Miomir S. Stanković, FRACTIONAL INTEGRALS AND DERIVATIVES IN q-CALCULUS, Applicable Analysis and Discrete Mathematics, Vol. 1, No. 1, SPECIAL ISSUE: Papers ...