Time and Work
Math MCQs

Question :    Charles can finish a work in 19 days. Christopher can finish the same work in 20 days while Daniel can finish the work in 21 days. How long will it take to finish it if they work together?

Correct Answer  6 ⁷⁸⁶/₁₁₉₉ days or 6.656 days

Solution & Explanation

Solution

Given,

The number of days required to finish a piece of work by Charles = 19 days

And, the number of days required to finish the same work by Christopher = 20 days

And, the number of days required to finish the same work by Daniel = 21 days

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

Here,

∵ In 19 days the work is done by Charles = 1

∴ The work done by Charles in 1 day = ¹/₁₉

Similarly,

∵ In 20 days the work is done by Christopher = 1

∴ The work done by Christopher in 1 day = ¹/₂₀

Similarly,

∵ In 21 days the work is done by Daniel = 1

∴ The work done by Daniel in 1 day = ¹/₂₁ part

Now, the work done by Charles, Christopher, and Daniel together in 1 day

= Charles's 1 day work + Christopher's 1 day work + Daniel's 1 day work

= ¹/₁₉ + ¹/₂₀ + ¹/₂₁

= ^{420 + 399 + 380}/₇₉₈₀

= ¹¹⁹⁹/₇₉₈₀ part of work

This means in 1 day, ¹¹⁹⁹/₇₉₈₀ part of work is done by Charles, Christopher and Daniel working together.

Now, the number of days required to finish ¹¹⁹⁹/₇₉₈₀ part of work by Charles, Christopher, and Daniel working together = 1

∴ the number of days required to finish the whole work (1 work) by Charles + Christopher + Daniel together

= ¹/_{¹¹⁹⁹/7980}

= 1 × ⁷⁹⁸⁰/₁₁₉₉ = ⁷⁹⁸⁰/₁₁₉₉ days

= 6 ⁷⁸⁶/₁₁₉₉ days = or 6.656 days

Thus, Charles, Christopher, and Daniel working together will finish the total work (1 work) in 6 ⁷⁸⁶/₁₁₉₉ days = or 6.656 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 Charles = 19 days

And the number of days required to finish the same work by Christopher = 20 days

And the number of days required to finish the work by Daniel = 21 days

Thus, the number of days required to finish the work by Charles, Christopher, and Daniel together = ?

Here a = 19 days

And, b = 20 days

And, c = 21 days

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

The number of days required to finish the work when Charles, Christopher, and Daniel working together

= ^{19 × 20 × 21}/_{19 × 20 + 19 × 21 + 20 × 21} days

= ⁷⁹⁸⁰/_{380 + 399 + 420} days

= ⁷⁹⁸⁰/₁₁₉₉ days

= ⁷⁹⁸⁰/₁₁₉₉ days

= 6 ⁷⁸⁶/₁₁₉₉ days or 6.656

Thus, Charles, Christopher, and Daniel together will finish the work in 6 ⁷⁸⁶/₁₁₉₉ days or 6.656 days Answer

Similar Questions

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(2) If Patrick can finish the work in 95 days and Vincent can finish the same work in 100 days, then in how many days both can finish the work together?

(3) Michelle can finish a work in 40 days. Carol can finish the same work in 41 days while Amanda can finish the work in 42 days. How long will it take to finish it if they work together?

(4) If Daniel can finish the work in 24 days and Timothy can finish the same work in 28 days, then in how many days both can finish the work together?

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(6) Betty can finish a work in 26 days. Margaret can finish the same work in 27 days while Sandra can finish the work in 28 days. How long will it take to finish it if they work together?

(7) Samantha can finish a work in 86 days. Christine can finish the same work in 91 days while Debra can finish the work in 96 days. How long will it take to finish it if they work together?

(8) If James can finish the work in 24 days and John can finish the same work in 40 days, then in how many days both can finish the work together?

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(10) If Elizabeth can finish the work in 14 days and Daniel can finish the same work in 19 days, then in how many days both can finish the work together?