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Enhance your calculus skills with this comprehensive guide on differentiation techniques, including product and quotient rules, chain rule, logarithmic and exponential functions, and implicit differentiation. Learn how to compute derivatives, apply the chain rule effectively, and solve equations using logarithmic differentiation.
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Techniques of Differentiation • The Product and Quotient Rules • The Chain Rule • Derivatives of Logarithmic and Exponential Functions • Implicit Differentiation
The Product Rule The Quotient Rule
The Product Rule Ex. Derivative of Second Derivative of first
The Quotient Rule Ex. Derivative of denominator Derivative of numerator
Compute the Derivative Ex. = –10
The Chain Rule If f is a differentiable function of u and u is a differentiable function of x, then the composite f (u) is a differentiable function of x, and The derivative of a f (quantity) is the derivative of f evaluated at the quantity, times the derivative of the quantity.
The Chain Rule Ex.
Chain Rule in Differential Notation If y is a differentiable function of u and u is a differentiable function of x, then
Chain Rule Example Ex. Sub in for u
Differentiation of Logarithmic Functions Derivative of the Natural Logarithm Generalized Rule for Natural Logarithm Functions If u is a differentiable function, then
Examples Ex. Find the derivative of Ex. Find an equation of the tangent line to the graph of Slope: Equation:
Differentiation of Logarithmic Functions Derivative of a Logarithmic Function: Generalized Rule for Logarithm Functions If u is a differentiable function, then
Differentiation of Exponential Functions Derivative of ex: Generalized Rule for eu: If u is a differentiable function, then
Derivatives of Exponential Functions Ex. Find the derivative of Ex. Find the derivative of
Differentiation of Exponential Functions Derivative of bx: Generalized Rule for bu: If u is a differentiable function, then
Derivatives of Exponential Functions Ex. Find the derivative of
Implicit Differentiation y is explicitly a function of x. y is implicitly a function of x.
Implicit Differentiation (cont.) To differentiate the implicit case we use the chain rule where y is a function of x: Solve for
Tangent Line to Implicit Curve Ex. Find the equation of the tangent line to the curve at the point (2, 1).
Logarithmic Differentiation Ex. Use logarithmic differentiation to find the derivative of Apply ln Properties of ln Differentiate Solve