Advertisements
Advertisements
Question
If 36 men can do a piece of work in 25 days, in how many days will 15 men do it?
Advertisements
Solution
Let x be the number of days in which 15 men can do a piece of work.
| Number of men | 36 | 15 |
| Number of days | 25 | x |
\[\text{ Since the number of men hired and the number of days taken to do a piece of work are in inverse variation, we have } : \]
\[36 \times 25 = x \times 15\]
\[ \Rightarrow x = \frac{36 \times 25}{15}\]
\[ = \frac{900}{15}\]
\[ = 60\]
\[\text{ Thus, the required number of days is 60 } .\]
APPEARS IN
RELATED QUESTIONS
A farmer has enough food to feed 20 animals in his cattle for 6 days. How long would the food last if there were 10 more animals in his cattle?
Which of the following quantities vary inversely as other?
The number of x men hired to construct a wall and the time y taken to finish the job.
Which of the following quantities vary inversely as other?
Journey (x km) undertaken by a car and the petrol (y litres) consumed by it.
6 pumps are required to fill a water sump in 1 hr 30 minutes. What will be the time taken to fill the sump if one pump is switched off?
If two quantities p and q vary inversely with each other, then ______
When the speed is kept fixed, time and distance vary inversely with each other.
If a and b vary inversely to other, then find the values of p, q, r ; x, y, z and l, m, n.
| a | 2 | y | 6 | 10 |
| b | x | 12.5 | 15 | z |
If a and b vary inversely to other, then find the values of p, q, r ; x, y, z and l, m, n.
| a | l | 9 | n | 6 |
| b | 5 | m | 25 | 10 |
In a hostel of 50 girls, there are food provisions for 40 days. If 30 more girls join the hostel, how long will these provisions last?
The variable x is inversely proportional to y. If x increases by p%, then by what per cent will y decrease?
