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प्रश्न
Solve the following quadratic equation:
`a/((x - b)) + b/((x - a)) = 2, x ≠ b, a`
बेरीज
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उत्तर
`a/((x - b)) + b/((x - a)) = 2`
⇒ `[a/((x - b)) - 1] + [b/((x - b)) - 1] = 0`
⇒ `(a - (x - b))/(x - b) + (b - (x - b))/(x - b) = 0`
⇒ `(a - x + b)[1/((x - b)) + 1/((x - a))] = 0`
⇒ `(a - x + b)[((x - a) + (x - b))/((x - b)(x - a))] = 0`
⇒ `(a - x + b) [(2x - (a + b))/((x - b)(x - a))] = 0`
⇒ (a – x + b)[2x – (a + b)] = 0
⇒ a – x + b = 0 or 2x – (a + b) = 0
⇒ `x = a + b` or `x = (a + b)/2`
Hence, the roots of the equation are `(a + b)` and `((a + b)/2)`.
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