Answered

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Find the exact value.

[tex]\[
\log 10^{-5}
\][/tex]

[tex]\[
\log 10^{-5} =
\][/tex]

Sagot :

GinnyAnswer
To find the exact value of [tex]\(\log 10^{-5}\)[/tex], we can utilize the properties of logarithms and exponents.

### Step-by-Step Solution:

1. Consider the expression [tex]\(\log 10^{-5}\)[/tex]:
[tex]\[\log 10^{-5}\][/tex]

2. Use the property of logarithms dealing with exponents:
The logarithm of a power can be rewritten by bringing the exponent in front of the log.
[tex]\[\log 10^{-5} = -5 \log 10\][/tex]

3. Evaluate [tex]\(\log 10\)[/tex] with base 10:
By definition, [tex]\(\log 10\)[/tex] in base 10 is equal to 1.
[tex]\[\log 10 = 1\][/tex]

4. Multiply the exponent by the value of [tex]\(\log 10\)[/tex]:
Substitute the value of [tex]\(\log 10\)[/tex] back into the expression.
[tex]\[-5 \log 10 = -5 \times 1\][/tex]

5. Calculate the result:
[tex]\[-5 \times 1 = -5\][/tex]

Therefore, the exact value of [tex]\(\log 10^{-5}\)[/tex] is:
[tex]\[ \boxed{-5} \][/tex]
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