1 1 vote Three men and eight machines can finish a job in half the time taken by three machines and eight men to finish the same job. If two machines can finish the job in $13$ days, then how many men can finish the job in $13$ days?______ Quantitative Aptitude cat2019-1 quantitative-aptitude work-time numerical-answer + – go_editor 14.2k points 1.6k views answer comment Share Follow Print 0 reply Please log in or register to add a comment.
1 1 vote Given that, Three men and eight machines can finish a job in half the time taken by three machines and eight men to finish the same job. If $M_{1}$ person can do $W_{1}$ work in $D_{1}$ days working $T_{1}$ hours in a day and $M_{2}$ Person can do $W_{2}$ work in $D_{2}$ days working $T_{2}$ hours in a day then the relationship between them is: $$\frac{M_{1} \ast D_{1} \ast T_{1}}{W_{1}} = \frac{M_{2} \ast D_{2} \ast T_{2}}{W_{2}}$$ $(3\; \text{Men} + 8 \; \text{Machine})1 = (8 \; \text{Men} + 3 \; \text{Machine}) 2 $ $ \Rightarrow (3\; \text{Men} + 8 \; \text{Machine}) = (16 \; \text{Men} + 6 \; \text{Machine}) $ $ \Rightarrow 8 \; \text{Machine} – 6 \; \text{Machine} = 16 \; \text{Men} – 3\; \text{Men} $ $ \Rightarrow \boxed{2 \; \text{Machine} = 13 \; \text{Men}}$ If two machines can finish the job in $13$ days, then $13$ men can also finish that job in $13$ days. $\therefore$ The number of men required to finish the job in $13$ days is $13$ men. Correct Answer $:13$ Anjana5051 answered May 24, 2021 • edited Aug 30, 2021 by Anjana5051 Anjana5051 12.0k points comment Share Follow 0 reply Please log in or register to add a comment.