logarithmic proof of product rule

Following is a proof of the product rule using the natural logarithm, the chain rule, and implicit differentiation. Note that circular reasoning does not occur, as each of the concepts used can be proven independently of the product rule.

Proof.

Let $f$ and $g$ be differentiable functions and $y=f(x)g(x)$ . Then $\\ln y=\\ln(f(x)g(x))=\\ln f(x)+\\ln g(x)$ . Thus, $\\displaystyle\\frac{1}{y}\\cdot\\frac{dy}{dx}=\\frac{f^{\\prime}(x)}{f(x)}+\\frac{g^%{\\prime}(x)}{g(x)}$ . Therefore,

$\\begin{array}[]{rl}\\displaystyle\\frac{dy}{dx}&\\displaystyle=y\\left(\\frac{f^{%\\prime}(x)}{f(x)}+\\frac{g^{\\prime}(x)}{g(x)}\\right)\\\\&\\\\&\\displaystyle=f(x)g(x)\\left(\\frac{f^{\\prime}(x)}{f(x)}+\\frac{g^{\\prime}(x)}{g%(x)}\\right)\\\\&\\\\&=f^{\\prime}(x)g(x)+g^{\\prime}(x)f(x).\\end{array}$

∎

Once students are familiar with the natural logarithm, the chain rule, and implicit differentiation, they typically have no problem following this proof of the product rule. Actually, with some prompting, they can produce a proof of the product rule to this one. This exercise is a great way for students to review many concepts from calculus.

单词	LogarithmicProofOfProductRule
释义	logarithmic proof of product rule Following is a proof of the product rule using the natural logarithm, the chain rule, and implicit differentiation. Note that circular reasoning does not occur, as each of the concepts used can be proven independently of the product rule. Proof. Let $f$ and $g$ be differentiable functions and $y=f(x)g(x)$ . Then $\\ln y=\\ln(f(x)g(x))=\\ln f(x)+\\ln g(x)$ . Thus, $\\displaystyle\\frac{1}{y}\\cdot\\frac{dy}{dx}=\\frac{f^{\\prime}(x)}{f(x)}+\\frac{g^%{\\prime}(x)}{g(x)}$ . Therefore, $\\begin{array}[]{rl}\\displaystyle\\frac{dy}{dx}&\\displaystyle=y\\left(\\frac{f^{%\\prime}(x)}{f(x)}+\\frac{g^{\\prime}(x)}{g(x)}\\right)\\\\&\\\\&\\displaystyle=f(x)g(x)\\left(\\frac{f^{\\prime}(x)}{f(x)}+\\frac{g^{\\prime}(x)}{g%(x)}\\right)\\\\&\\\\&=f^{\\prime}(x)g(x)+g^{\\prime}(x)f(x).\\end{array}$ ∎ Once students are familiar with the natural logarithm, the chain rule, and implicit differentiation, they typically have no problem following this proof of the product rule. Actually, with some prompting, they can produce a proof of the product rule to this one. This exercise is a great way for students to review many concepts from calculus.
随便看	Lagrange multiplier method LagrangeMultiplierMethodProofOf Lagrange multiplier method, proof of LagrangeMultipliersOnBanachSpaces Lagrange multipliers on Banach spaces LagrangeMultipliersOnManifolds Lagrange multipliers on manifolds LagrangesFoursquareTheorem LagrangesIdentity LagrangesTheorem Lagrange’s four-square theorem Lagrange’s identity Lagrange’s theorem LagrangianSubmanifold Lagrangian submanifold LaguerrePolynomial Laguerre polynomial LambdaCalculus lambda calculus LambertQuadrilateral Lambert quadrilateral LambertSeries Lambert series LambertWFunction Lambert W function