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Use the properties of logarithms to write the logarithm in terms of log7^(2) and log7^(5)

Use the properties of logarithms to write the logarithm in terms of log7^(2) and log7^(5)
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Use the properties of logarithms to write the logarithm in terms of log7^(2) and log7^(5)

Use the properties of logarithms to write the logarithm in terms of log7^(2) and log-example-1
User Vinayak Kaniyarakkal
by
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1 Answer

2 votes
Answer:
\log_750=\log_(7^)2+2\log_75

Step-by-step explanation:

The given logarithm expression is:


log_750

This can be re-written as:


\begin{gathered} \log_750=\log_7(2*25) \\ \\ \log_750=\log_72\frac{}{}+\log_725 \\ \\ \log_750=\log_72+\log_75^2 \\ \\ \operatorname{\log}_750=\operatorname{\log}_72+2\operatorname{\log}_75 \end{gathered}

User Deukalion
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