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Chapter 4: Problem 122

Explain how to solve an exponential equation when both sides cannot be written as a power of the same base. Use \(3^{x}=140\) in your explanation.

Short Answer

Expert verified
You will find that \(x = ln(140) / ln(3)\), which simplifies to approximately \(x \approx 4.605\) after calculating on a calculator.

Step by step solution

01

Understand the Problem

Given the exponential equation \(3^{x}=140\), the goal is to solve for x. Since both sides are not powers of the same base, a logarithm must be used to find the value of x.
02

Apply Logarithm to Both Sides

To simplify this equation, a logarithm is applied to both sides. The natural logarithm, ln, can be used: \(ln(3^{x})=ln(140)\). Using the properties of logarithms, the x can be brought down in front - this property states that \(ln(a^{b}) = b*ln(a)\). Therefore, the equation simplifies to: \(x*ln(3) = ln(140)\)
03

Isolate the Variable x

After applying the logarithm, isolate the variable x by dividing both sides of the equation by \(ln(3)\). The equation simplifies to: \(x = ln(140) / ln(3)\)
04

Solve the Equation

Finally, solve the equation to find the value of x by dividing \(ln(140)\) by \(ln(3)\) using a calculator.

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Most popular questions from this chapter

The percentage of adult height attained by a girl who is \(x\) years old can be modeled by $$f(x)=62+35 \log (x-4)$$ where \(x\) represents the girl's age (from 5 to 15 ) and \(f(x)\) represents the percentage of her adult height. Use the function to solve. Round answers to the nearest tenth of a percent. Approximately what percentage of her adult height has a girl attained at age ten?

Solve each equation. Check each proposed solution by direct substitution or with a graphing utility. $$ (\ln x)^{2}=\ln x^{2} $$

Exercises \(134-136\) will help you prepare for the material covered in the next section. $$\text { Solve: } \frac{x+2}{4 x+3}=\frac{1}{x}$$

Write each equation in its equivalent exponential form. Then solve for \(x .\) $$ \log _{3}(x-1)=2 $$

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