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Question
The numerator of a fraction is 3 less than its denominator. If 2 is added to both the numerator and the denominator, then the sum of the new fraction and original fraction is `29/20`. Find the original fraction.
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Solution
Let the denominator of the required fraction be x.
Then, its numerator = x – 3
So, the original fraction is `(x - 3)/x`.
Given,
`((x - 3) + 2)/(x + 2) + ((x - 3))/x = 29/20`
`((x - 1))/(x + 2) + ((x - 3))/x = 29/20`
`((x - 1)x + (x - 3)(x + 2))/((x + 2)x) = 29/20`
`(x^2 - x + x^2 - x - 6)/(x^2 + 2x) = 29/20`
20(2x2 – 2x – 6) = 29(x2 + 2x)
11x2 – 98x – 120 = 0
11x2 – 110x + 12x – 120 = 0
11x(x – 10) + 12(x – 10) = 0
(11x + 12)(x – 10) = 0
x = 10 or x = `-12/11`
Negative denominator not possible.
∴ x = 10
Now substitute to get the original fraction:
`(x - 3)/x`
= `(10 - 3)/10`
= `7/10`
Hence, the required fraction is `7/10`.
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