Question

145. Without using a calculator, determine which is the greater number: log4 60 or log3 40.

Accepted Answer

Recall that $$ \log_a b $$ represents the logarithm of $$ b $$ with base $$ a $$, which answers the question: "To what power must we raise $$ a  to $$get $$ b $$?". To compare $$ \log_4 60 $$ and $$ \log_3 40 $$ without a calculator, express both logarithms in terms of a common base, such as the natural logarithm $$ \ln $$, using the change of base formula: $$ \log_a b = \frac{\ln b}{\ln a} . $$Rewrite the expressions as $$ \log_4 60 = \frac{\ln 60}{\ln 4} $$ and $$ \log_3 40 = \frac{\ln 40}{\ln 3} . $$Estimate the values of $$ \ln 60 $$, $$ \ln 40 $$, $$ \ln 4 $$, and $$ \ln 3  by $$recognizing nearby known values or using properties of logarithms (for example, $$ \ln 4 = 2 \ln 2 $$, $$ \ln 3  is $$known to be about 1.1, etc.). Compare the two fractions $$ \frac{\ln 60}{\ln 4} $$ and $$ \frac{\ln 40}{\ln 3}  by $$cross-multiplying or estimating to determine which is greater.

145. Without using a calculator, determine which is the greater number: log₄ 60 or log₃ 40.

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Key Concepts

Logarithm Definition and Properties

Change of Base Formula

Estimating Logarithmic Values