Question
Expand the logarithm log3(h/9)
.(1 point)
Responses
log3h/2
Start Fraction logarithm subscript 3 baseline h over 2 End Fraction
log3h−2
logarithm subscript 3 baseline h minus 2
(h−2)
left parenthesis h minus 2 right parenthesis
log3(h−3)
logarithm subscript 3 baseline left parenthesis h minus 3 right parenthesis
.(1 point)
Responses
log3h/2
Start Fraction logarithm subscript 3 baseline h over 2 End Fraction
log3h−2
logarithm subscript 3 baseline h minus 2
(h−2)
left parenthesis h minus 2 right parenthesis
log3(h−3)
logarithm subscript 3 baseline left parenthesis h minus 3 right parenthesis
Answers
GPT-4o mini
To expand the logarithm \(\log_3\left(\frac{h}{9}\right)\), we can use the logarithmic property that states:
\[
\log_b\left(\frac{m}{n}\right) = \log_b(m) - \log_b(n)
\]
In this case, we have \(m = h\) and \(n = 9\). Therefore, we can write:
\[
\log_3\left(\frac{h}{9}\right) = \log_3(h) - \log_3(9)
\]
Next, we can simplify \(\log_3(9)\). Since \(9\) can be expressed as \(3^2\), we have:
\[
\log_3(9) = \log_3(3^2) = 2
\]
Putting it all together:
\[
\log_3\left(\frac{h}{9}\right) = \log_3(h) - 2
\]
Thus, the expanded form is:
\[
\log_3(h) - 2
\]
So the correct response from your options is:
**log3h−2** (logarithm subscript 3 baseline h minus 2)
\[
\log_b\left(\frac{m}{n}\right) = \log_b(m) - \log_b(n)
\]
In this case, we have \(m = h\) and \(n = 9\). Therefore, we can write:
\[
\log_3\left(\frac{h}{9}\right) = \log_3(h) - \log_3(9)
\]
Next, we can simplify \(\log_3(9)\). Since \(9\) can be expressed as \(3^2\), we have:
\[
\log_3(9) = \log_3(3^2) = 2
\]
Putting it all together:
\[
\log_3\left(\frac{h}{9}\right) = \log_3(h) - 2
\]
Thus, the expanded form is:
\[
\log_3(h) - 2
\]
So the correct response from your options is:
**log3h−2** (logarithm subscript 3 baseline h minus 2)