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प्रश्न
Prove that `int 1/(x^2 - a^2) dx = 1/(2a) log |(x - a)/(x + a)| + c`.
Hence evaluate `int 1/(x^2 - 3) dx`.
मूल्यांकन
सिद्धांत
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उत्तर
`int 1/(x^2 - a^2) dx = int 1/((x - a)(x + a)) dx`
= `1/(2a) int ((x + a)-(x - a))/((x - a)(x + a)) dx`
= `1/(2a) int (1/(x - a) - 1/(x + a)) dx`
= `1/(2a) [int 1/(x - a) dx - int 1/(x + a) dx]`
= `1/(2a) [log|x - a| - log|x + a|] + c`
= `1/(2a) log |(x - a)/(x + a)| + c`
∴ `int 1/(x^2 - a^2) dx = 1/(2a) log |(x - a)/(x + a)| + c`
To find: `int 1/(x^2 - 3) dx`
`int 1/(x^2 - 3) dx = int 1/(x^2 - (sqrt3)^2) dx = 1/(2sqrt3) log |(x - sqrt3)/(x + sqrt3)| + c`
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