If {log _{1/√ 2 }}sin x > 0,x ∈ [0,,,4π ], then number of values of x which are integral mul

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Basic of Logarithms

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If ${\log _{1/\sqrt 2 }}\sin x > 0,x \in [0,\,\,4\pi ],$ then the number of values of $x$ which are integral multiples of ${\pi \over 4},$ is

A

$4$

B

$12$

C

$3$

D

None of these

Solution

(a) $0 < {1 \over {\sqrt 2 }} < 1$

${\log _{1/\sqrt 2 }}\sin x > 0$, $x \in [0,\,4\pi ]$$ \Rightarrow $ $0 < \sin x < 1$

$\therefore$ Integral multiple of ${\pi \over 4}$ will be ${\pi \over 4},\,{{3\pi } \over 4},\,{{9\pi } \over 4},{{11\pi } \over 4}$

Number of required values $= 4.$

Standard 11

Mathematics

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(IIT-1990)