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Question
Solve the following quadratic equation:
`a/((ax - 1)) + b/((bx - 1)) = (a + b), x ≠ 1/a, 1/b`
Sum
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Solution
`a/((ax - 1)) + b/((bx - 1)) = (a + b) `
⇒ `[a/((ax - 1)) - b] + [b/((bx - 1)) - a] = 0`
⇒ `(a - b(ax - 1))/(ax - 1) + (b - a(bx - 1))/(bx - 1) = 0`
⇒ `(a - abx + b)/(ax - 1) - (a - abx + b)/(bx - 1) = 0`
⇒ `(a - abx + b)[1/(ax - 1) + 1/((bx - 1))] = 0`
⇒ `(a - abx + b)[((bx - 1) + (ax - 1))/((ax - 1)(bx - 1))] = 0`
⇒ `(a - abx + b)[[(a + b)x - 2)/((ax - 1)(bx - 1))] = 0`
⇒ (a – abx + b)[(a + b)x – 2] = 0
⇒ a – abx + b = 0 or (a + b)x – 2 = 0
⇒ `x = ((a + b))/(ab)` or `x = 2/((a + b))`
Hence, the roots of the equation are `((a + b))/(ab)` and `2/((a + b))`.
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