In this case, the constant is the same for both scenarios. Let's denote the constant as \(C\).
For the first scenario:
\[ 7 \times 15 = C \]
Now, for the second scenario:
\[ \text{Men} \times 35 = C \]
You want to find the number of men, so:
\[ \text{Men} = \frac{C}{35} \]
Substitute \(C\) from the first scenario:
\[ \text{Men} = \frac{7 \times 15}{35} \]
Now, simplify to find the answer. The correct option is:
(B) 9 men.
The correct answer is C. 5 men. This can be determined using the formula: \( \text{Men} \times \text{Days} = \text{Constant} \). If 7 men can last for 15 days, the constant is \(7 \times 15\). To find how many men for 35 days, divide the constant by 35: \( \frac{7 \times 15}{35} = 5 \) men.
The correct answer is (B) 9. The relationship between the number of men and the days the provision lasts is inversely proportional. Using the formula M1 * D1 = M2 * D2, where M is the number of men and D is the number of days, you can find that if 7 men last for 15 days, then 9 men would last for 35 days.
The correct answer is D. 3 men. This is based on the principle of inverse proportionality, where as the number of men increases, the time the provision lasts decreases.
The provision will last for the same number of men regardless of the duration. Therefore, for 7 men, the provision will still last for 7 men. So, the answer is (A) 7.
The correct answer is B. 9 men. You can use the formula \( \text{Men} \times \text{Days} = \text{Constant} \) to solve this proportionality problem.
Step-by-step explanation:
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Answer:
To find the answer, you can use the formula:
\[ \text{Men} \times \text{Days} = \text{Constant} \]
In this case, the constant is the same for both scenarios. Let's denote the constant as \(C\).
For the first scenario:
\[ 7 \times 15 = C \]
Now, for the second scenario:
\[ \text{Men} \times 35 = C \]
You want to find the number of men, so:
\[ \text{Men} = \frac{C}{35} \]
Substitute \(C\) from the first scenario:
\[ \text{Men} = \frac{7 \times 15}{35} \]
Now, simplify to find the answer. The correct option is:
(B) 9 men.
The correct answer is C. 5 men. This can be determined using the formula: \( \text{Men} \times \text{Days} = \text{Constant} \). If 7 men can last for 15 days, the constant is \(7 \times 15\). To find how many men for 35 days, divide the constant by 35: \( \frac{7 \times 15}{35} = 5 \) men.
The correct answer is (B) 9. The relationship between the number of men and the days the provision lasts is inversely proportional. Using the formula M1 * D1 = M2 * D2, where M is the number of men and D is the number of days, you can find that if 7 men last for 15 days, then 9 men would last for 35 days.
The correct answer is D. 3 men. This is based on the principle of inverse proportionality, where as the number of men increases, the time the provision lasts decreases.
The provision will last for the same number of men regardless of the duration. Therefore, for 7 men, the provision will still last for 7 men. So, the answer is (A) 7.
The correct answer is B. 9 men. You can use the formula \( \text{Men} \times \text{Days} = \text{Constant} \) to solve this proportionality problem.
Step-by-step explanation:
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