For how many distinct real values of \( x \) does the equation below hold true? (Consider \( a>0 \))
\[
x^2 \log_a (16) - \log_a (64) \div \log_a (32) - x = 0
\]
Show Hint
- 1
- 0
- Depends on the value of \( a \)
- 2
- Infinitely many
The Correct Option is C
Approach Solution - 1
To solve the equation:
\(x^2 \log_a (16) - \log_a (64) \div \log_a (32) - x = 0\)
we need to break it down step by step.
First, express all the terms using logarithmic identities. We have:
- \(\log_a(16) = \log_a(2^4) = 4 \log_a(2)\)
- \(\log_a(64) = \log_a(2^6) = 6 \log_a(2)\)
- \(\log_a(32) = \log_a(2^5) = 5 \log_a(2)\)
Substitute these back into the equation:
\(x^2 \cdot 4 \log_a(2) - \frac{6 \log_a(2)}{5 \log_a(2)} - x = 0\)
Simplify the division:
\(x^2 \cdot 4 \log_a(2) - \frac{6}{5} - x = 0\)
Further simplifying gives:
\(4 x^2 \log_a(2) - x - \frac{6}{5} = 0\)
At this point, analyze the equation:
If \(\log_a(2) = 0\), it would result in an undefined division. However, since \(a > 0\) and not equal to \(1\), \(\log_a(2)\) is defined.
As \(\log_a(2)\) is a constant factor, the equation is essentially a quadratic in \(x\):
\(4x^2 - x - \frac{6}{5} = 0\)
The discriminant of this quadratic equation is:
\(D = (-1)^2 - 4 \times 4 \times \left(-\frac{6}{5}\right)\)
Calculate the discriminant:
\(D = 1 + \frac{96}{5} = \frac{101}{5}\)
Since \(D > 0\), the quadratic equation has two distinct real roots.
However, the values the constants take depend on the term \(\log_a (2)\), which depends on the base \(a\). Therefore, the actual values for the roots of \(x\) depend on \(a\).
Hence, the correct answer is:
Depends on the value of \(a\)
Approach Solution -2
We begin by simplifying the logarithmic terms. The equation becomes dependent on the base \( a \) and its relationship to \( x \).
Step 2: Analyze the options.
The solution depends on the value of \( a \), as the logarithmic terms will behave differently for different values of \( a \).
Final Answer: \[ \boxed{\text{(C) Depends on the value of } a} \]
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