-log_(4)(3%5E(x)-1)*log_(1%2F4)((3%5E(x)-1)%2F(16)).jpeg "(iii) Log_(4)(3^(x)-1)*log_(1/4)((3^(x)-1)/(16))")
Simplifying the Expression: log_4(3^x - 1) * log_(1/4)((3^x - 1)/16)
This expression involves logarithms with different bases, making it a bit tricky to work with directly. To simplify it, we'll use some key properties of logarithms:
Key Properties of Logarithms
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Change of Base Formula: log_a(b) = log_c(b) / log_c(a) (where c is any positive number different from 1)
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Logarithm of a Quotient: log_a(b/c) = log_a(b) - log_a(c)
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Logarithm of a Power: log_a(b^c) = c * log_a(b)
Simplifying the Expression
Let's apply these properties to simplify the given expression step by step:
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Change of Base for the Second Logarithm:
We'll change the base of the second logarithm to 4, using the change of base formula:
log_(1/4)((3^x - 1)/16) = log_4((3^x - 1)/16) / log_4(1/4)
Since log_4(1/4) = -1, we have:
log_(1/4)((3^x - 1)/16) = -log_4((3^x - 1)/16)
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Simplifying the Second Logarithm:
Using the logarithm of a quotient property:
-log_4((3^x - 1)/16) = -[log_4(3^x - 1) - log_4(16)]
We know log_4(16) = 2 (since 4^2 = 16). Therefore:
-log_4((3^x - 1)/16) = -log_4(3^x - 1) + 2
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Combining the Simplified Expressions:
Now, we can substitute the simplified forms of both logarithms back into the original expression:
log_4(3^x - 1) * log_(1/4)((3^x - 1)/16) = log_4(3^x - 1) * (-log_4(3^x - 1) + 2)
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Expanding the Expression:
Expanding the product:
log_4(3^x - 1) * (-log_4(3^x - 1) + 2) = -[log_4(3^x - 1)]^2 + 2 * log_4(3^x - 1)
Final Result:
The simplified form of the given expression is:
-[log_4(3^x - 1)]^2 + 2 * log_4(3^x - 1)
This is a quadratic expression in terms of log_4(3^x - 1).