QuestionUse properties of logarithms to expand each logarithmic expression as much as possible. Evaluate
Studdy Solution
STEP 1
What is this asking? We need to rewrite a single logarithm as the sum of simpler logarithms. Watch out! Remember the rules of logarithms, especially the product rule!
STEP 2
1. Expand the logarithm using the product rule.
2. Simplify the expression.
STEP 3
The product rule for logarithms states that the logarithm of a product is the sum of the logarithms of the factors.
Mathematically, this means .
This rule is *super* important because it lets us break down complicated logarithms into smaller, easier-to-manage pieces!
STEP 4
In our case, we have .
We can think of this as .
Applying the product rule, we get:
See how we broke down the logarithm of the product into the sum of the logarithms of and ?
Awesome!
STEP 5
Remember, asks the question: "To what power must we raise to get ?".
STEP 6
So, asks: "To what power must we raise to get ?".
Well, raised to the **first** power is (), so !
STEP 7
Now, we can substitute this back into our expanded expression:
STEP 8
Our final answer is .
We've successfully expanded and simplified the logarithm!
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