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Question
150 workers were engaged to finish a job in a certain number of days. 4 workers dropped out on second day, 4 more workers dropped out on third day and so on. It took 8 more days to finish the work. Find the number of days in which the work was completed.
Solution
150 workers complete the work in n days
1 day work of 150 employees = `1/"n"`
1 day work of 1 employee = `1/(150"n")`
On the first day, 150 workers do `150/(150"n")` work in 1 day.
On the second day 146 workers do `146/(150"n")` work in 1 day.
On the third day 142 workers do `146/(150"n")` work in 1 day.
That work was completed in n + 8 days
∴ `150/(150"n") + 146/(150"n") + 142/(150"n") + ...... ("n" + 8 )` terms = 1
or `1/(150"n")[150 + 146 + 142 + .... ("n" + 8) "terms"] = 1`
or `("n" + 8)/(2(150"n")) [2 xx 150 + ("n" + 8 -1) xx (-4)] = 1`
(n + 8) [300 – 4(n + 7)] = 300n
or (n + 8) (−4n + 272) = 300n
or (n + 8) (n – 68) = –75n
or n2 – 60n – 544 = –75n
or n2 + 15n – 544 = 0
or (n + 32) (n – 17) = 0
n ≠ –32 or n = 17
Total time = n + 8 days
= 17 + 8
= 25 days
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