Question

24 women can do a piece of work in 35 days. If 3 of the women deny to work, then how many days are required to complete the work?

Answer 1

Hey MATE HERE IS UR ANSWER


NUMBER OF DAYS REQUIRED FOR 24 (x1 ) WOMANS TO DO A WORK = 35 DAYS. ( y1)


NUMBR OF DYAS REQUIRED FOR 21 ( X2 ) WORKER = y2


NOW USING EQUATION FOR INVERSE = X1 × Y 1 =. X2 × Y2



= 24 × 35 = 21 × Y2

= 840 = 21 × Y2

= 840 / 21 = Y2


Y2 = 40 days

HOPE IT IS HELPFUL IS YES MARK AS BRAINLIEST

Answer 2

There are 40 days required to do the work, if 3 of the women deny to work.

Step-by-step explanation:

Given:

24 women can do a piece of work in 35 days.

If 3 of the women deny to work, then how many days are required to complete the work?

Solution:

24 women can do the work in 35 days

21 women can do it in = $\frac{24 \times 35}{21}$

= $\frac{840}{21}$ = 40 days

Result:

There are 40 days required to do the work, if 3 of the women deny to work.

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