Advertisements
Advertisements
प्रश्न
A, B and C can reap a field in \[15\frac{3}{4}\] days; B, C and D in 14 days; C, D and A in 18 days; D, A and B in 21 days. In what time can A, B, C and D together reap it?
Advertisements
उत्तर
\[\text{ Time taken by } \left( A + B + C \right) \text{ to do the work } = 15\frac{3}{4} \text{ days } = \frac{63}{4} \text{ days } \]
\[\text{ Time taken by } \left( B + C + D \right) \text{ to do the work = 14 days} \]
\[\text{ Time taken by } \left( C + D + A \right) \text{ to do the work = 18 days } \]
\[\text{ Time taken by } \left( D + A + B \right) \text{ to do the work = 21 days } \]
\[\text{ Now, } \]
\[ \text{ Work done by } \left( A + B + C \right) = \frac{4}{63}\]
\[\text{ Work done by } \left( B + C + D \right) = \frac{1}{14}\]
\[ \text{ Work done by } \left( C + D + A \right) = \frac{1}{18}\]
\[ \text{ Work done by } \left( D + A + B \right) = \frac{1}{21}\]
\[ \therefore \text{ Work done by working together } = \left( A + B + C \right) + \left( B + C + D \right) + \left( C + A + D \right) + \left( D + A + B \right)\]
\[ = \frac{4}{63} + \frac{1}{14} + \frac{1}{18} + \frac{1}{21}\]
\[ = \frac{4}{63} + \left( \frac{9 + 7 + 6}{126} \right) = \frac{4}{63} + \frac{22}{126}\]
\[ = \frac{4}{63} + \frac{11}{63} = \frac{15}{63}\]
\[ \therefore \text{ Work done by working together } = 3\left( A + B + C + D \right) = \frac{15}{63}\]
\[ \therefore \text{ Work done by } \left( A + B + C + D \right) = \frac{15}{63 \times 3} = \frac{5}{63}\]
\[ \text{ Thus, together they can do the work in } \frac{63}{5} \text{ days or } 12\frac{3}{5} \text{ days } .\]
APPEARS IN
संबंधित प्रश्न
A and B can finish a work in 20 days. A alone can do \[\frac{1}{5}\] th of the work in 12 days. In how many days can B alone do it?
If 12 boys earn Rs 840 in 7 days, what will 15 boys earn in 6 days?
A cistern has two inlets A and B which can fill it in 12 hours and 15 hours respectively. An outlet can empty the full cistern in 10 hours. If all the three pipes are opened together in the empty cistern, how much time will they take to fill the cistern completely?
If x varies directly as y, then
| x | 12 | 6 |
| y | 48 | – |
Write whether the following statement vary directly, vary inversely with each other, or neither of the two.
The number of people working and the quantity of work.
Write whether the following statement vary directly, vary inversely with each other, or neither of the two.
Area of land and its cost.
It is given that l varies directly as m. Find the constant of proportion (k), when l is 6 then m is 18.
From the following table, determine if x and y are in direct proportion or not.
| x | 1 | 4 | 9 | 20 |
| y | 1.5 | 6 | 13.5 | 30 |
Match each of the entries in Column I with the appropriate entry in Column II
| Column I | Column II |
| 1. x and y vary inversely to each other | A. `x/y` = Constant |
| 2. Mathematical representation of inverse variation of quantities p and q |
B. y will increase in proportion |
| 3. Mathematical representation of direct variation of quantities m and n |
C. xy = Constant |
| 4. When x = 5, y = 2.5 and when y = 5, x = 10 | D. `p oo 1/q` |
| 5. When x = 10, y = 5 and when x = 20, y = 2.5 | E. y will decrease in proportion |
| 6. x and y vary directly with each other | F. x and y are directly proportional |
| 7. If x and y vary inversely then on decreasing x | G. `m oo n` |
| 8. If x and y vary directly then on decreasing x | H. x and y vary inversely |
| I. `p oo q` | |
| J. `m oo 1/n` |
A recipe for a particular type of muffins requires 1 cup of milk and 1.5 cups of chocolates. Riya has 7.5 cups of chocolates. If she is using the recipe as a guide, how many cups of milk will she need to prepare muffins?
