derivatives, polynomial, rational, exponential, hyperbolic, logarithmic, trigonometric and inverse trigonometric functions. Definite and indefinite integrals and the Fundamental Theorem of Calculus.

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

Some pre-Calculus, derivatives, applications of derivatives, introduction to integration. MT101 (4 hours) Basic integration notions, basic techniques of integration, applications of integration, and ...

Although calculus has a reputation of being tough, the concept is quite simple. If you have a function that represents something, the derivative of that function describes the rate of change at ...

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 ...

Review of difference quotient, least squares modeling, limit of difference quotient, differential calculus: derivatives, differentials, higher-order derivatives, implicit differentiation, relative and ...

Here is the first rigorous and accessible account of the mathematics behind the pricing, construction, and hedging of derivative securities. With mathematical precision and in a style tailored for ...

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 ...

Derivatives are financial instruments whose value is derived from one or more underlying assets or securities (e.g., a stock, bond, currency, or index). A derivative is a contract that derives its ...

Here now is the first rigorous and accessible account of the mathematics behind the pricing, construction and hedging of derivative securities. Key concepts such as martingales, change of measure, and ...