2 men and 5 boys can do piece of work in 4 days , while 4 men and 4 boys can do in 3 day. how long would it take one man alone to do it and how many days would it take one boy alone to do it.
Make this chart:
Number of Time
jobs done required Rate
or fraction in in
thereof days jobs/day
1 Man
1 Boy
2 Men
5 Boys
4 Men
4 Boys
2 Men and 5 Boys
4 Men and 4 Boys
Fill in 1 for the number of jobs done in each case:
Number of Time
jobs done required Rate
or fraction in in
thereof days jobs/day
1 Man 1
1 Boy 1
2 Men 1
5 Boys 1
4 Men 1
4 Boys 1
2 Men and 5 Boys 1
4 Men and 4 Boys 1
Let M be the time required for 1 man to complete the job
Let B be the time required for 1 boy to complete the job
Therefore the number of days required for 2 Men will by
only half of M that or M/2
And the number of days required for 5 boys will be only
one-fifth of B or B/5
We are given the times in the last two cases.
Fill all those in:
Number of Time
jobs done required Rate
or fraction in in
thereof days jobs/day
1 Man 1 M
1 Boy 1 B
2 Men 1 M/2
5 Boys 1 B/5
4 Men 1 M/4
4 Boys 1 B/4
2 Men and 5 Boys 1 4
4 Men and 4 Boys 1 3
Next we fill in the Rates in jobs/day by dividing
number of jobs by the number of days. Notice that
1 over a fraction is the reciprocal of that fraction:
jobs done required Rate
or fraction in in
thereof days jobs/day
1 Man 1 M 1/M
1 Boy 1 B 1/B
2 Men 1 M/2 2/M
5 Boys 1 B/5 5/B
4 Men 1 M/4 4/M
4 Boys 1 B/4 4/B
2 Men and 5 Boys 1 4 1/4
4 Men and 4 Boys 1 3 1/3
The sum of the rates for 2 Men and 5 Boys must equal to their
combined rate, so
2/M + 5/B = 1/4
The sum of the rates for 4 Men and 4 Boys must equal to their
combined rate, so
4/M + 4/B = 1/3
So we have this system of equations:
Do not clear of fractions. Use elimination
Multiply the first equation through by -2
Adding them term by term:
It would take a boy 36 days.
Substitute in
It would take one man 18 days.
Edwin