Question

64 women can dig a wll in 50 days. I f the work is to be completed in 80 days how many women can tame leave from work? ​

Answer 1

The answer is 24.

GIVEN

64 women can dig a well in 50 days.

TO FIND

Number of women who can take leave from work.

SOLUTION

We can simply solve the above problem as follows;

We know that,

Work = Time × Number of people.

So,

W = 50 × 64 (Equation 1)

Let us assume that it takes N number of women to complete the same work in 80 days.

Therefore,

W = N × 80 (Equation 2)

From 1 and 2.

N × 80 = 50 × 64

Solving for N;

$N = \frac{64 \times 50}{80}$

= 40

Hence, 40 women are needed to complete the work in 80 days.

So, Number of women who take leave = 64 -40i = 24.

Hence, The answer is 24.

#Spj2

Answer 2

Answer:

The answer to the given question is the number of women required to complete the work in 80 days is 40.

so 24 can take leave.

Explanation:

Given :

64 women can dig a well in 50 days.

To find :

If the work is to be completed in 80 days how many

women can take leave from work?

Solution :

As we know that the work is calculated by the product of time and the number of people

work = time * number of people

Therefore w= 50*64-------(1)

Now let us assume the N number of people required to complete the work in 80 days.

Therefore,

w= N*80------(2)

On comparing equations 1 and 2 we can get the value of N.let the value of N ne x.

$50 \times 64= x \times 80$

The value multiplying on the right moves to the left as the division.

$\frac{50 \times 64}{80} = x$

On cancelling, we get the value of x is obtained as 40.

Hence, the no of women required to complete the work in 80 days is 40.

the women can leave the work will be obtained as 64-40=24

then 24 women can take leave from the work.

#spj5.

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