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Chapter 3: Problem 7

Solve for \(x.\) \(4^{x}=16\)

Short Answer

Expert verified
The solution to the equation \(4^{x}=16\) is \(x=2\).

Step by step solution

01

Rewrite the Equation in the Same Base

Since the base on both sides of the equation must be the same to solve for \(x\), 16 can be converted into base 4 as \(4^2\). Therefore, the equation \(4^{x}=16\) can be rewritten as \(4^{x}=4^2\).
02

Equate the Exponents

Now that both sides of the equation have the same base, the exponents must be equal as well. Hence, \(x=2\).

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Base Conversion
In the world of exponents, converting numbers to the same base can simplify solving equations. When you encounter an equation like \(4^x = 16\), it's helpful to express all terms using a common base. This is known as base conversion.

The goal is to transform terms to powers of the same number. For example, the number 16 can be expressed as \(4^2\). By rewriting 16 in this way, you create a common ground to compare the exponents. This makes the equation easier to solve.

If you can break down a number into smaller, equal parts, that's a clue it can be rewritten in a different base. Often, bases that are powers of 2, 3, or another common number work well. Practice converting between different bases will improve your skills in solving these equations.
Equating Exponents
Once an expression is rewritten in the same base, the puzzle becomes simpler. At this point, you focus solely on the exponents. This step is known as equating exponents.

In the equation \(4^x = 4^2\), the bases (the number 4) on both sides are the same. Therefore, the exponents must also be equal for the equality to hold. This principle stems from the basic property of exponents that if \(a^m = a^n\), then \(m = n\).

So, by directly comparing the exponents from each side of the equation, you can find the value of \(x\). Here, matching \(x\) with 2 is a straightforward task.
Solving Exponential Equations
Exponential equations, like \(4^x = 16\), feature variables as exponents. Solving these requires a keen eye for recognizing possible base conversions and applying the property of equating exponents.

These steps simplify solving such equations:
  • Identify if both sides of the equation can be related by a common base.
  • Convert numbers into that base to match both sides.
  • Equate the exponents, and solve the resulting equation.
Start by guessing or observing possible bases when numbers are small or well known. Eventually, practice and familiarity will make the conversion and solving process quick and intuitive. This systematic approach makes exponential equations less intimidating and more approachable to solve.

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Most popular questions from this chapter

Expanding a Logarithmic Expression In Exercises \(37-58\) , use properties of logarithms to expand the expression as a sum, difference, and or constant multiple of logarithms. (Assume all variables are positive.) $$\ln \sqrt[3]{t}$$

Expanding a Logarithmic Expression In Exercises \(37-58\) , use the properties of logarithms to expand the expression as a sum, difference, and or constant multiple of logarithms. (Assume all variables are positive.) $$\log _{5} \frac{5}{x}$$

Compound Interest Use the formula \(A=P\left(1+\frac{r}{n}\right)^{n t}\) to calculate the balance of an investment when \(P=\$ 3000\) , \(r=6 \%,\) and \(t=10\) years, and compounding is done (a) by the day, (b) by the hour, (c) by the minute, and (d) by the second. Does increasing the number of compoundings per year result in unlimited growth of the balance? Explain.

Using Properties of Logarithms In Exercises \(21-36\) , find the exact value of the logarithmic expression without using a calculator. (If this is not possible, then state the reason.) $$\log _{5} 75-\log _{5} 3$$

Condensing a Logarithmic Expression In Exercises \(67-82\) , condense the expression to the logarithm of a single quantity. $$\frac{1}{2}\left[\log _{4}(x+1)+2 \log _{4}(x-1)\right]+6 \log _{4} x$$
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