Conditions on the parameters of logarithm function
The number of...
Question
The number of real values of the parameter k for which (log16x)2−log16x+log16k=0 with real coefficients will have exactly one solution is
A
2
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B
1
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C
4
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D
None of these
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Solution
The correct option is B 1 Let log16x=y⇒y2−y+log16k=0 This quadratic equation will have exactly one solution if its discriminant vanishes. ∴(−1)2−4.1.log16k=0⇒1=log16k4 ⇒k4=16⇒k2=4⇒k=±2. But log16k is not defined if k<0, ∴k=2. ∴ Number of real values of k = 1.