Question
\[ \text{If } \cosec x-\cot x=\frac12,\ 0<x<\frac{\pi}{2}, \]
\[ \text{then } \cos x \text{ is equal to} \]
(a) \(\frac53\)
(b) \(\frac35\)
(c) \(-\frac35\)
(d) \(-\frac53\)
Solution
Using identity
\[ (\cosec x-\cot x)(\cosec x+\cot x)=1 \]
\[ \frac12(\cosec x+\cot x)=1 \]
\[ \cosec x+\cot x=2 \]
Now,
\[ 2\cosec x = (\cosec x+\cot x)+(\cosec x-\cot x) \]
\[ =2+\frac12 =\frac52 \]
\[ \cosec x=\frac54 \]
\[ \sin x=\frac45 \]
Since \(0<x<\frac{\pi}{2}\),
\[ \cos x=\sqrt{1-\sin^2x} \]
\[ =\sqrt{1-\frac{16}{25}} \]
\[ =\frac35 \]
Answer
\[ \boxed{\frac35} \]
Correct Option: (b)