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प्रश्न
Value of ∫ `(x^2 + 1)/((x − 1)(x − 2))`dx is ______.
विकल्प
`x + log [(x − 2)^5/(x − 1)^2] +C`
`x + log [(x − 1)^2/(x − 2)^5] +C`
`x − log [(x − 2)^5/(x − 1)^2] +C`
None of these
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उत्तर
Value of ∫ `(x^2 + 1)/((x − 1)(x − 2))`dx is `underlinebb(x + log [(x − 2)^5/(x − 1)^2] +C)`.
Explanation:
Here, since the highest powers of x in the numerator and denominator are equal, and the coefficients of x2 are also equal, therefore
`∫(x^2 + 1)/((x − 1)(x − 2)) ≡ 1 + A/(x − 1 + x − 2)`
On solving, we get A = −2, B = 5
Thus `∫ (x^2 + 1)/((x − 1)(x − 2)) ≡ 1 − 2/(x − 1) + 5/(x − 2)`
The above method is used to obtain the value of the constant corresponding to a non-repeated linear factor in the denominator.
Now, I = `∫ (1 − 2/(x − 1) + 5/(x − 2))` dx
= x − 2 log (x − 1) + 5 log (x − 2) + C
= `x + log[(x − 2)^5/(x − 1)^2] + C`
