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Learn how to solve logarithmic equations in two (2) ways. One way by setting the argument equal to each other, and the other way by converting it as an exponential.
Logarithm is another way of writing exponent. The problems that cannot be solved using only exponents can be solved using logs. Learn more about logarithms and rules to work on them in detail.
We’ll break down the concept into bite-sized, manageable pieces, providing you with simple logarithm examples complete with step-by-step solutions. So, grab your calculator, and let’s demystify logarithms together!
The logarithmic equations in examples 4, 5, 6 and 7 involve logarithms with different bases and are therefore challenging. Example 1: Solve the logarithmic equation log 2 (x - 1) = 5.
16 Νοε 2022 · Solve each of the following equations. Here is a set of practice problems to accompany the Solving Logarithm Equations section of the Exponential and Logarithm Functions chapter of the notes for Paul Dawkins Algebra course at Lamar University.
The purpose of solving a logarithmic equation is to find the value of the unknown variable. In this article, we will learn how to solve the general two types of logarithmic equations, namely: Equations containing logarithms on one side of the equation. Equations with logarithms on opposite sides of the equal to sign.
Logarithms. In Mathematics, logarithms are the other way of writing the exponents. A logarithm of a number with a base is equal to another number. A logarithm is just the opposite function of exponentiation. For example, if 102 = 100 then log10 100 = 2. Hence, we can conclude that, Logb x = n or bn = x.