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· Integrals of Trigonometric Functions
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· Derivatives Basic
· Differentiation Rules
· Derivatives Functions
· Derivatives of Simple Functions
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· Derivatives of Hyperbolic Functions
· Derivatives of Trigonometric Functions
· Integral (Definite)
· Integral (Indefinite)
· Integrals of Simple Functions

Current Location > Math Formulas > Calculus > Differentiation Rules

Differentiation Rules

Chain Rule

Inverse Function

Linearity

, where c is a constant

Product Rule

Quotient Rule

Reciprocal Rule

Differentiation of Implicit Functions
If an equation is expressed as y = f(x), then y is said to be the explicit function of x. However if y is connected with x by an expression f (x, y) = 0, then y is said to an implicit function of x. For e.g. x² + 3xy + y² = 0.

For differentiating the implicit function we differentiate each term with respect to x keeping in mind that if there is a term contains powers of y, we differentiate first with respect to y and then multiply it by dy/dx to get its differentiation with respect to x.

Example 1: