4 men and 6 women can complete a work in 8 days, while 3 men and 7 women can complete it in 10 days. In how many days will 10 women complete it?
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Answered by
1
Answer:
Step-by-step explanation:
While solving all “Time and Work” problems, estimating the Total Work is the key.
Here in all the three cases, the work done is same. But it is done by different combination of workforces.
4 Men and 6 Women take 8 days. So TOTAL WORK = 32 MD + 48 WD (where MD= Mandays, & WD = Womandays, a unit of work) ……(eqn1)
3 Men and 7 Women take 10 days. So, TOTAL WORK = 30 MD + 70 WD …. (eqn2)
Equating the total work,
32 MD + 48 WD = 30 MD + 70 WD
=> 2 MD = 22 WD
=> 1 MD = 11 WD
So, replacing man days in eqn2,
TOTAL WORK = 400 WD
Now, 10 women will complete 10 WD of work in one day.
To complete 400 WD of work,
Time needed = (400 WD)/(10 WD) = 40 Days (Answer)
Answered by
2
Answer:
40 days
Step-by-step explanation:
hope help
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