Question

asked Jan 24, 2020 175k views

1 Answer

Mouselangelo · Answer 1 · 2020-01-29T08:51:12+0000

Answer:

$\displaystyle \lim_(x \to 9) (√(x) - 3)/(9 - x) = (-1)/(6)$

General Formulas and Concepts:

Calculus

Limits

Limit Rule [Constant]:
$\displaystyle \lim_(x \to c) b = b$

Limit Rule [Variable Direct Substitution]:
$\displaystyle \lim_(x \to c) x = c$

Limit Property [Addition/Subtraction]:
$\displaystyle \lim_(x \to c) [f(x) \pm g(x)] = \lim_(x \to c) f(x) \pm \lim_(x \to c) g(x)$

L'Hopital's Rule:
$\displaystyle \lim_(x \to c) (f(x))/(g(x)) = \lim_(x \to c) (f'(x))/(g'(x))$

Differentiation

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

Basic Power Rule:

Explanation:

We are given the following limit:

$\displaystyle \lim_(x \to 9) (√(x) - 3)/(9 - x)$

Substitute in x = 9 using the limit rule:

$\displaystyle \lim_(x \to 9) (√(x) - 3)/(9 - x) = (√(9) - 3)/(9 - 9)$

Evaluating this, we have an indeterminate form:

$\displaystyle \lim_(x \to 9) (√(x) - 3)/(9 - x) = (0)/(0)$

Since we have an indeterminate form, let's use L'Hopital's Rule:

$\displaystyle \lim_(x \to 9) (√(x) - 3)/(9 - x) = \lim_(x \to 9) ((1)/(2√(x)))/(-1)$

Simplify:

$\displaystyle \lim_(x \to 9) (√(x) - 3)/(9 - x) = \lim_(x \to 9) (-1)/(2√(x))$

Substitute in x = 9 using the limit rule:

$\displaystyle \lim_(x \to 9) (-1)/(2√(x)) = (-1)/(2√(9))$

Evaluating this, we get:

$\displaystyle \lim_(x \to 9) (-1)/(2√(x)) = (-1)/(6)$

And we have our answer.

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

Unit: Limits

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