1 Answer

Stvnrynlds · Answer 1 · 2023-01-23T12:32:23+0000

Answer:

$\displaystyle y' = (-2)/(x \ln (10)[\log (x) - 2]^2)$

General Formulas and Concepts:

Calculus

Differentiation

Derivative Property [Addition/Subtraction]:
$\displaystyle (d)/(dx)[f(x) + g(x)] = (d)/(dx)[f(x)] + (d)/(dx)[g(x)]$

Derivative Rule [Basic Power Rule]:

Derivative Rule [Quotient Rule]:
$\displaystyle (d)/(dx) [(f(x))/(g(x)) ]=(g(x)f'(x)-g'(x)f(x))/(g^2(x))$

Explanation:

Step 1: Define

Identify.

$\displaystyle y = (\log (x))/(\log (x) - 2)$

Step 2: Differentiate

[Function] Derivative Rule [Quotient Rule]:
$\displaystyle y' = ([\log (x) - 2][\log (x)]' - [\log (x) - 2]'[\log (x)])/([\log (x) - 2]^2)$
Rewrite [Derivative Rule - Addition/Subtraction]:
$\displaystyle y' = ([\log (x) - 2][\log (x)]' - [\log (x)' - 2'][\log (x)])/([\log (x) - 2]^2)$
Logarithmic Differentiation:
$\displaystyle y' = ([\log (x) - 2](1)/(\ln (10)x) - [(1)/(\ln (10)x) - 2'][\log (x)])/([\log (x) - 2]^2)$
Derivative Rule [Basic Power Rule]:
$\displaystyle y' = ([\log (x) - 2](1)/(\ln (10)x) - (1)/(\ln (10)x)[\log (x)])/([\log (x) - 2]^2)$
Simplify:
$\displaystyle y' = ((\log (x) - 2)/(\ln (10)x) - (\log (x))/(\ln (10)x))/([\log (x) - 2]^2)$
Simplify:
$\displaystyle y' = ((-2)/(\ln (10)x))/([\log (x) - 2]^2)$
Rewrite:
$\displaystyle y' = (-2)/(x \ln (10)[\log (x) - 2]^2)$

Topic: AP Calculus AB/BC (Calculus I/I + II)

Unit: Differentiation

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