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प्रश्न
`int(sin^6x + cos^6x)/(sin^2xcos^2x)` dx = ______
विकल्प
cotx + cot2x + c
tanx - cotx - 3x + c
2sin5x + 2cos5x + c
sin3x + 2cos3x + c
MCQ
रिक्त स्थान भरें
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उत्तर
`int(sin^6x + cos^6x)/(sin^2xcos^2x)` dx = tanx - cotx - 3x + c
Explanation:
`int(sin^6x + cos^6x)/(sin^2xcos^2x) dx`
= `int((sin^2x + cos^2x)^3 - 3sin^2xcos^2x(sin^2x + cos^2x))/(sin^2xcos^2x)`dx ...................`[∵ a^3 + b^3 = (a + b)^3 - 3ab(a + b)]`
= `int(1 - 3sin^2x cos^2x(1))/(sin^2x cos^2x)`dx
= `(1/(sin^2x cos^2x) - 3)`dx
= `int((sin^2x + cos^2x)/(sin^2xcos^2x) - 3)`dx
= `int(1/cos^2x + 1/sin^2x - 3)dx`
= `intsec^2xdx + intcosec^2xdx - 3intdx`
= tanx - cotx - 3x + c
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