int(sqrt(1-x)/(1+x))dx এর মান হচ্ছে-
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সঠিক উত্তরঃ
D.
sin^-1x+sqrt(1-x^2+c)
Explanation:
Another Explanation (5):
সমাধান:
ধরি, \( x = \cos{2\theta} \) 🧐
তাহলে, \( dx = -2\sin{2\theta} d\theta \)
এখন,
\(\sqrt{\frac{1-x}{1+x}} = \sqrt{\frac{1-\cos{2\theta}}{1+\cos{2\theta}}} \)
\(= \sqrt{\frac{2\sin^2{\theta}}{2\cos^2{\theta}}} \)
\(= \sqrt{\tan^2{\theta}} = \tan{\theta} \)
অতএব,
\(\int \sqrt{\frac{1-x}{1+x}} dx = \int \tan{\theta} (-2\sin{2\theta}) d\theta \)
\(= -2 \int \tan{\theta} (2\sin{\theta}\cos{\theta}) d\theta \)
\(= -4 \int \frac{\sin{\theta}}{\cos{\theta}} \sin{\theta}\cos{\theta} d\theta \)
\(= -4 \int \sin^2{\theta} d\theta \)
\(= -4 \int \frac{1-\cos{2\theta}}{2} d\theta \)
\(= -2 \int (1-\cos{2\theta}) d\theta \)
\(= -2 \left[ \theta - \frac{\sin{2\theta}}{2} \right] + c \)
\(= -2\theta + \sin{2\theta} + c \)
\(= -2\theta + \sqrt{1-\cos^2{2\theta}} + c \)
\(= -2\theta + \sqrt{1-x^2} + c \)
যেহেতু, \( x = \cos{2\theta} \), তাই \( 2\theta = \cos^{-1}{x} \)
সুতরাং, \( \theta = \frac{1}{2} \cos^{-1}{x} \)
তাহলে,
\( \int \sqrt{\frac{1-x}{1+x}} dx = -\cos^{-1}{x} + \sqrt{1-x^2} + c \)
আবার, \( \cos^{-1}x = \frac{\pi}{2} - \sin^{-1}x \)
সুতরাং,
\( \int \sqrt{\frac{1-x}{1+x}} dx = -(\frac{\pi}{2} - \sin^{-1}x) + \sqrt{1-x^2} + c \)
\( = \sin^{-1}x + \sqrt{1-x^2} + (c-\frac{\pi}{2}) \)
\( = \sin^{-1}x + \sqrt{1-x^2} + c' \) [যেখানে \( c' = c - \frac{\pi}{2} \)]
অতএব, \( \int \sqrt{\frac{1-x}{1+x}} dx = \sin^{-1}x + \sqrt{1-x^2} + c \) 🎉