Question ID: #544
If $\sin x + \sin^{2}x = 1$, $x \in (0, \frac{\pi}{2})$, then $(\cos^{12}x + \tan^{12}x) + 3(\cos^{10}x + \tan^{10}x + \cos^{8}x + \tan^{8}x) + (\cos^{6}x + \tan^{6}x)$ is equal to
- (1) 4
- (2) 3
- (3) 2
- (4) 1
Solution:
Given $\sin x + \sin^{2}x = 1 \Rightarrow \sin x = 1 – \sin^{2}x = \cos^{2}x$.
Now, $\tan^{2}x = \frac{\sin^{2}x}{\cos^{2}x} = \frac{\sin^{2}x}{\sin x} = \sin x$.
Since $x \in (0, \frac{\pi}{2})$, $\tan x = \sqrt{\sin x} = \cos x$.
Substitute $\tan x = \cos x$ into the given expression $E$:
$E = (\cos^{12}x + \cos^{12}x) + 3(\cos^{10}x + \cos^{10}x + \cos^{8}x + \cos^{8}x) + (\cos^{6}x + \cos^{6}x)$
$E = 2\cos^{12}x + 3(2\cos^{10}x + 2\cos^{8}x) + 2\cos^{6}x$
$E = 2[\cos^{12}x + 3\cos^{10}x + 3\cos^{8}x + \cos^{6}x]$
The term inside the bracket is the expansion of $(\cos^{4}x + \cos^{2}x)^{3}$:
$E = 2[(\cos^{4}x + \cos^{2}x)^{3}]$
Substitute $\cos^{2}x = \sin x$ (so $\cos^{4}x = \sin^{2}x$):
$E = 2[(\sin^{2}x + \sin x)^{3}]$
Since $\sin^{2}x + \sin x = 1$:
$E = 2(1)^{3} = 2$
Ans. (3)
Was this solution helpful?
YesNo