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Change-of-base formula

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Algebra and Trigonometry

Definition

The change-of-base formula allows you to evaluate logarithms with any base using logarithms of different bases. It is given by the formula $\log_b(a) = \frac{\log_c(a)}{\log_c(b)}$, where $c$ is any positive number.

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5 Must Know Facts For Your Next Test

The change-of-base formula is applicable for any positive numbers $a$, $b$, and $c$, where $b \neq 1$ and $c \neq 1$.
You can use common logarithms (base 10) or natural logarithms (base e) as the new base in the change-of-base formula.
The change-of-base formula simplifies complex logarithmic expressions that cannot be easily calculated by hand.
It is particularly useful for evaluating logarithms on a calculator that may only support base 10 or base e.
The change-of-base formula can also be used to derive other logarithmic properties, such as converting between different logarithmic bases.

Review Questions

What is the change-of-base formula?
Why might you use common or natural logarithms when applying the change-of-base formula?
How would you apply the change-of-base formula to evaluate $\log_3(7)$?

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