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§ 4.3 Differentiation of Exponential Functions
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Section Outline Chain Rule for eg(x)
Working With Differential Equations Solving Differential Equations at Initial Values Functions of the form ekx
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Chain Rule for eg(x)
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Chain Rule for eg(x) Differentiate. This is the given function.
EXAMPLE Differentiate. SOLUTION This is the given function. Use the chain rule. Remove parentheses. Use the chain rule for exponential functions.
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Working With Differential Equations
Generally speaking, a differential equation is an equation that contains a derivative.
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Solving Differential Equations
EXAMPLE Determine all solutions of the differential equation SOLUTION The equation has the form y΄ = ky with k = 1/3. Therefore, any solution of the equation has the form where C is a constant.
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Solving Differential Equations at Initial Values
EXAMPLE Determine all functions y = f (x) such that y΄ = 3y and f (0) = ½. SOLUTION The equation has the form y΄ = ky with k = 3. Therefore, for some constant C. We also require that f (0) = ½. That is, So C = ½ and
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Functions of the form ekx
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