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Question
If m and n are roots of the equation `1/x - 1/(x - 2) = 3`; where x ≠ 0 and x ≠ 2; find m × n.
Solution
Given quadratic equation is `1/x - 1/(x - 2) = 3`
⇒ x – 2 – x = 3x(x – 2)
⇒ –2 = 3x2 – 6x
⇒ 3x2 – 6x + 2 = 0
a = 3, b = – 6, c = 2
D = b2 – 4ac
= (– 6)2 – 4(3)(2)
= 36 – 24
= 12
⇒ `x = (-b ± sqrt(b^2 - 4ac))/(2a)`
⇒ `x = (-6 ± sqrt12)/(2 xx 3)`
⇒ `x=(6 ± sqrt(2xx2xx3))/6`
⇒ `x = (6 ± (2sqrt3))/6`
⇒ `x = (6 + 2sqrt3)/6` or `x = (6 - 2sqrt3)/6`
Since, m and n are roots of the equation, we have
⇒ `m = (6 + 2sqrt3)/6 n = (6 - 2sqrt3)/6`
⇒ `m xx n = (6 + 2sqrt3)/6 xx(6 - 2sqrt3)/6`
= `((6)^2 - (2sqrt3)^2)/36`
= `(36 - 4xx3)/36`
= `(36 - 12)/36`
= `24/36`
= `2/3`
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