Math, asked by ritik832, 4 months ago

8 men and 12 boys can finish a piece of work in
10 days while 6 men and 8 boys can finish it in 14
days. Find the time taken by one man alone and
that by one boy alone to finish the work.​

Answers

Answered by bhoomikatavarageri
0

Step-by-step explanation:

Suppose that one man alone can finish the work in x days and one boy alone can finish it in y days. Then,

One man's one day's work =

x

1

One boy's one day's work =

y

1

∴ Eight men's one day's work =

x

8

12 boy's one day's work =

y

12

Since 8 men and 12 boys can finish the work in 10 days

10(

x

8

+

y

12

)=1⇒

x

80

+

y

120

=1 ..(i)

Again, 6 men and 8 boys can finish the work in 14 days.

∴14(

x

6

+

y

8

)=1⇒

x

84

+

y

112

=1 (ii)

Putting

x

1

=u and

y

1

=v in equations (i) and (ii), we get

80u+120v−1=0

84u+112v−1=0

By using cross-multiplication method, we have

−120+112

u

=

−80+84

−v

=

80×112−120×84

1

−8

u

=

−4

v

=

−1120

1

⇒u=

−1120

−8

=

140

1

and v=

−1120

−4

=

280

1

Now, u=

140

1

x

1

=

140

1

⇒x=140

and, v=

280

1

y

1

=

280

1

⇒y=280.

Thus, one man alone can finish the work in 140 days and one boy alone can finish the work in 280 days.

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