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Chapter 4: Problem 3

The inverse properties of logarithms are \(\log _{a} a^{x}=x\) and ______ .

Short Answer

Expert verified
The missing inverse property is \(a^{\log_{a} x} = x\).

Step by step solution

01

Understanding properties of logarithms

To solve this exercise, it's important to understand the properties of logarithms. A key thing to know is that logarithms and exponents are inverse operations to each other.
02

Identifying the second inverse property

The inverse property of logarithms that complements the given one (\(\log _{a} a^{x}=x\)) is \(a^{\log_{a} x} = x\). This property means that if you have a logarithm and then apply an exponent using the same base, it returns you to the original number, x.

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Key Concepts

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

Inverse Properties
When dealing with logarithms and their operations, understanding inverse properties is crucial. The essence of an inverse operation is that two operations cancel each other out. In the context of logarithms, this means log and exponential functions are opposites and can undo each other's effects.

There are two fundamental inverse properties to remember:
  • The first inverse property states that when you have a base raised to a certain power and apply a logarithm to it, you get back the exponent: \(\log_{a} (a^x) = x\).
  • The second complementary inverse property is that if you take a base raised to the logarithm of a number, you retrieve the number itself: \(a^{\log_{a} x} = x\).
These properties express the idea that taking an exponent and a logarithm in succession with the same base will lead you directly back to your starting point. In simpler terms, the base \(a\) cancels out, showing how intimately connected logarithms and exponents are.
Exponents
Exponents are a compact way of expressing repeated multiplication. They are written as a small number, called a power, to the right of a base number. For example, in \(a^x\), \(a\) is the base and \(x\) is the exponent.

Exponents follow several rules that facilitate simplification and computation:
  • Product of Powers: When multiplying two exponents with the same base, you add the powers: \(a^m \cdot a^n = a^{m+n}\).
  • Quotient of Powers: When dividing two exponents with the same base, you subtract the powers: \(\frac{a^m}{a^n} = a^{m-n}\).
  • Power of a Power: When raising an exponent to another power, you multiply the exponents: \((a^m)^n = a^{m \cdot n}\).
Exponents play a critical role in mathematics and are the foundation upon which logarithms are built. The relationship between them is so fundamental because exponents can be used to represent multiplicative growth, while logarithms help us "unpack" that growth.
Properties of Logarithms
Logarithms come with a set of properties that are instrumental in simplifying complex expressions. These properties are derived from the rules of exponents since logarithms are the inverses of exponentiation.

Here are some key properties:
  • Product Property: The logarithm of a product is equal to the sum of the logarithms of the factors: \(\log_{a}(xy) = \log_{a}x + \log_{a}y\).
  • Quotient Property: The logarithm of a quotient is the difference of the logarithms: \(\log_{a}\left(\frac{x}{y}\right) = \log_{a}x - \log_{a}y\).
  • Power Property: The logarithm of a power is the exponent multiplied by the logarithm of the base: \(\log_{a}(x^n) = n\cdot\log_{a}x\).
These properties allow us to break down complex expressions into more manageable parts. By understanding and applying these properties correctly, we simplify logarithmic equations and solve mathematical problems with ease. They're essential tools for dealing with higher-level math concepts where the manipulation of logarithms is necessary.

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Most popular questions from this chapter

Solve the logarithmic equation algebraically. Round the result to three decimal places. Verify your answer(s) using a graphing utility. $$\log _{9}(4+x)=\log _{9} 2 x$$

Divide using synthetic division. $$\left(x^{4}-3 x+1\right) \div(x+5)$$

Solve the logarithmic equation algebraically. Round the result to three decimal places. Verify your answer(s) using a graphing utility. $$\log _{10} 4 x-\log _{10}(12+\sqrt{x})=2$$

Find the time required for a \(\$ 1000\) investment to (a) double at interest rate \(r,\) compounded continuously, and (b) triple at interest rate \(r\), compounded continuously. Round your results to two decimal places. $$r=7 \%$$

Evaluate the function for \(f(x)=3 x+2\) and \(g(x)=x^{3}-1.\) $$(f-g)(-1)$$
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