mcqs Math Time and Work Dorothy can finish a work in 46 days. Melissa can finish the same work in 47 days while Deborah can finish the work in 48 days. How long will it take to finish it if they work together? 1566

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Question: Dorothy can finish a work in 46 days. Melissa can finish the same work in 47 days while Deborah can finish the work in 48 days. How long will it take to finish it if they work together?

(A)  35.25 days
(B)  30 ²¹⁹³/₃₃₁₃ days or 30.662 days
(C)  15 ²¹⁹³/₃₃₁₃ days or 15.662 days
(D)  47 days

Correct Answer 15 ²¹⁹³/₃₃₁₃ days or 15.662 days

Solution And Explanation

Solution

Given,

The number of days required to finish a piece of work by Dorothy = 46 days

And, the number of days required to finish the same work by Melissa = 47 days

And, the number of days required to finish the same work by Deborah = 48 days

Thus, the number of days required to finish the work by all of them if they work together = ?

Here,

∵ In 46 days the work is done by Dorothy = 1

∴ The work done by Dorothy in 1 day = ¹/₄₆

Similarly,

∵ In 47 days the work is done by Melissa = 1

∴ The work done by Melissa in 1 day = ¹/₄₇

Similarly,

∵ In 48 days the work is done by Deborah = 1

∴ The work done by Deborah in 1 day = ¹/₄₈ part

Now, the work done by Dorothy, Melissa, and Deborah together in 1 day

= Dorothy's 1 day work + Melissa's 1 day work + Deborah's 1 day work

= ¹/₄₆ + ¹/₄₇ + ¹/₄₈

= ^{1128 + 1104 + 1081}/₅₁₈₈₈

= ³³¹³/₅₁₈₈₈ part of work

This means in 1 day, ³³¹³/₅₁₈₈₈ part of work is done by Dorothy, Melissa and Deborah working together.

Now, the number of days required to finish ³³¹³/₅₁₈₈₈ part of work by Dorothy, Melissa, and Deborah working together = 1

∴ the number of days required to finish the whole work (1 work) by Dorothy + Melissa + Deborah together

= ¹/_{³³¹³/₅₁₈₈₈}

= 1 × ⁵¹⁸⁸⁸/₃₃₁₃ = ⁵¹⁸⁸⁸/₃₃₁₃ days

= 15 ²¹⁹³/₃₃₁₃ days = or 15.662 days

Thus, Dorothy, Melissa, and Deborah working together will finish the total work (1 work) in 15 ²¹⁹³/₃₃₁₃ days = or 15.662 days Answer

Shortcut Trick to solve the problems based on time and work using formula

Case: If A can finish a work in a days, B can finish the same work in b days, and C can finish the work in c days
then working together the number of days required to finish the work
= ^{a × b × c}/_{ab + ac + bc} days.

Here given,

The number of days required to finish the work by Dorothy = 46 days

And the number of days required to finish the same work by Melissa = 47 days

And the number of days required to finish the work by Deborah = 48 days

Thus, the number of days required to finish the work by Dorothy, Melissa, and Deborah together = ?

Here a = 46 days

And, b = 47 days

And, c = 48 days

Thus, using formula ^{a × b × c}/_{ab + ac + bc} days

The number of days required to finish the work when Dorothy, Melissa, and Deborah working together

= ^{46 × 47 × 48}/_{46 × 47 + 46 × 48 + 47 × 48} days

= ¹⁰³⁷⁷⁶/_{2162 + 2208 + 2256} days

= ¹⁰³⁷⁷⁶/₆₆₂₆ days

= ^{103776 ÷ 2}/_{6626 ÷ 2} = ⁵¹⁸⁸⁸/₃₃₁₃ days

= 15 ²¹⁹³/₃₃₁₃ days or 15.662

Thus, Dorothy, Melissa, and Deborah together will finish the work in 15 ²¹⁹³/₃₃₁₃ days or 15.662 days Answer

Try MCQ Test

Question: Dorothy can finish a work in 46 days. Melissa can finish the same work in 47 days while Deborah can finish the work in 48 days. How long will it take to finish it if they work together?

Shortcut Trick to solve the problems based on time and work using formula

Case: If A can finish a work in a days, B can finish the same work in b days, and C can finish the work in c daysthen working together the number of days required to finish the work= a × b × c/ab + ac + bc days.

Case: If A can finish a work in a days, B can finish the same work in b days, and C can finish the work in c days
then working together the number of days required to finish the work
= ^{a × b × c}/_{ab + ac + bc} days.