Comprehensive Differentiation Examples: Power, Product, Quotient, and Chain Rules
Mastering differentiation involves applying specific rules based on the function's structure. Below are examples covering the Power Rule, Product Rule, Quotient Rule, and the Chain Rule with detailed solutions.
The Power Rule states that for \( f(x) = x^n \), the derivative is \( f'(x) = nx^{n-1} \).
Apply the power rule to each term individually:
Final Solution: \( f'(x) = 20x^4 - 6x + 7 \)
Rewrite the function using exponents: \( f(x) = 3x^{-2} + 5x^{1/3} \)
Apply the power rule:
\[ f'(x) = 3(-2x^{-3}) + 5(\frac{1}{3}x^{-2/3}) \] \[ f'(x) = -\dfrac{6}{x^3} + \dfrac{5}{3\sqrt[3]{x^2}} \]Using \( f'(x) = U'V + UV' \):
\[ f'(x) = 2x(x^3 - 2x + 3) + (x^2 - 5)(3x^2 - 2) \]Result: \( 5x^4 - 21x^2 + 6x + 10 \)
Using \( f'(x) = \dfrac{U'V - UV'}{V^2} \):
\[ f'(x) = \dfrac{2x(5x - 3) - (x^2 + 1)5}{(5x - 3)^2} \]Result: \( \dfrac{5x^2 - 6x - 5}{(5x - 3)^2} \)
The Chain Rule is used for composite functions: \( [f(g(x))]' = f'(g(x)) \cdot g'(x) \).
Let the "inner" function be \( u = 4x^3 - 2x \). Then \( f(x) = u^6 \).
1. Differentiate the outer function: \( 6u^5 \)
2. Differentiate the inner function: \( u' = 12x^2 - 2 \)
3. Multiply them: \( 6(4x^3 - 2x)^5 \cdot (12x^2 - 2) \)
Result: \( 12(6x^2 - 1)(4x^3 - 2x)^5 \)
Rewrite as \( f(x) = (x^2 + 1)^{1/2} \).
\[ f'(x) = \dfrac{1}{2}(x^2 + 1)^{-1/2} \cdot (2x) \]The 2s cancel out, leaving:
\[ f'(x) = \dfrac{x}{\sqrt{x^2 + 1}} \]Answer: \( f'(x) = 40x^3 - \pi \) (Note: \( e \) is a constant, its derivative is 0).
Answer: \( g'(x) = 3(2x+1)^2(2)(x-5)^2 + (2x+1)^3(2)(x-5) \)
Simplified: \( 2(2x+1)^2(x-5)[3(x-5) + (2x+1)] = 2(2x+1)^2(x-5)(5x-14) \)
Answer: \( h'(x) = \cos(x^2) \cdot 2x = 2x\cos(x^2) \)