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Precalculus Enhanced with Graphing Utilities

Sullivan

$Math Studyset 91影视 Explanations$ Math

6th Edition 路 1200 pages

ISBN: 9780321795465

Chapter 5: Q 92. (page 299)

Solve the equation.
$\log_{x} (\frac{1}{8}) = 3$

Short Answer

Expert verified

The solution to the equation, $\log_{x} (\frac{1}{8}) = 3$ is, $x = \frac{1}{2}$ .

Step by step solution

01

Step 1. Given Information

The given equation to be solved is $\log_{x} (\frac{1}{8}) = 3$ .

02

Step 2. Formula used

Rule of change from logarithm to exponents:

$\log_{a} b = y 鈬� a^{y} = b$

03

Step 3. Finding Solution

The given equation is $\log_{x} (\frac{1}{8}) = 3$ .

Use rule of change from logarithm to exponents:

$\log_{x} (\frac{1}{8}) = 3 x^{3} = \frac{1}{8} (x)^{3} = {(\frac{1}{2})}^{3} x = \frac{1}{2}$

The solution to the given equationis, $x = \frac{1}{2}$ .

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Most popular questions from this chapter

Use transformations to graph the function. Determine the domain, range and horizontal asymptote of the function.

$f (x) = 1 - 2^{- x / 3}$

As the base a of an exponential function $f (x) = a^{x}$ , where $a > 1$ increases, what happens to the behavior of its graph for $x > o ?$ What happens to the behavior of its graph for $x < 0 ?$

Determine the exponential function whose graph is given.

If $f (x) = a x + b$ and $g (x) = c x + d$ , then find: -

(a) $f 鈭� g$

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Ideal Body Weight One model for the ideal body weight W for men (in kilograms) as a function of height h (in inches) is given by the function

$W (h) = 50 + 2.3 (h - 60)$

(a) What is the ideal weight of a $6$ -foot male?

(b) Express the height has a function of weight W.

(c) Verify that $h = W (h)$ is the inverse of $W = W (h)$ by showing that role="math" localid="1646158219737" $h (W (h)) = h$ and $W (h (W)) = W$ .

(d) What is the height of a male who is at his ideal weight of $80$ kilograms?

[Note: The ideal body weight W for women (in kilograms) as a function of height h (in inches) is given byrole="math" localid="1646159253780" $W (h) = 45.5 + 2.3 (h - 60)$ .

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