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Write the following exponential equations in logarithmic form.
Knowing the squares, cubes, and roots of numbers allows us to evaluate many logarithms mentally. For example, consider We ask, “To what exponent must be raised in order to get 8?” Because we already know it follows that
Now consider solving and mentally.
Even some seemingly more complicated logarithms can be evaluated without a calculator. For example, let’s evaluate mentally.
Given a logarithm of the form evaluate it mentally.
Solve without using a calculator.
First we rewrite the logarithm in exponential form: Next, we ask, “To what exponent must 4 be raised in order to get 64?”
We know
Therefore,
Evaluate without using a calculator.
First we rewrite the logarithm in exponential form: Next, we ask, “To what exponent must 3 be raised in order to get ”
We know but what must we do to get the reciprocal, Recall from working with exponents that We use this information to write
Therefore,
Sometimes we may see a logarithm written without a base. In this case, we assume that the base is 10. In other words, the expression means We call a base-10 logarithm a common logarithm . Common logarithms are used to measure the Richter Scale mentioned at the beginning of the section. Scales for measuring the brightness of stars and the pH of acids and bases also use common logarithms.
A common logarithm is a logarithm with base We write simply as The common logarithm of a positive number satisfies the following definition.
For
We read as, “the logarithm with base of ” or “log base 10 of ”
The logarithm is the exponent to which must be raised to get
Given a common logarithm of the form evaluate it mentally.
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