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Negative work means some actions undo progress. Treat filling or forward effort as positive and draining or reversing effort as negative. Add signed rates consistently, scale for partial work if needed, and compute time with the net rate. This structured habit prevents careless mistakes.
Many GMAT work questions involve actions that add to progress or undo it. Treat forward actions as positive work and reversing actions as negative work, then add signed rates in one unit (job per minute or hour). Mastering this in your GMAT preparation prevents apparently correct algebra with the wrong sign. The idea applies beyond tanks: workers joining or leaving, rework offsetting production, maintenance halting output, or tasks partly complete at the start. For partial work, scale the remaining fraction and apply the same signed rate logic. Keep one time base. Finally, pressure test the habit with GMAT mock tests so assigning signs and combining rates becomes automatic.
Negative work is any action that reduces completed work; positive work increases it. Assign each agent a signed rate in one consistent unit, such as job per minute or job per hour. Add the signed rates to obtain the net rate, then compute time as total work divided by the net rate. For partial work, first scale the remaining fraction, then apply the same signed-rate logic.
Let us see how this works in a familiar setting. A filling pipe contributes positive work; a draining pipe contributes negative work. Express each pipe’s rate with a sign, combine them to get the net effect, and solve for the required time. The same approach extends to workers, machines, and any process with opposing actions.
Consider a problem where three taps are involved:
The rates of work are:
When all taps are opened together, the combined rate is:
1/5 + 1/10 – 1/20 = (4 + 2 – 1) / 20 = 5/20 = 1/4.
This means the tank is filled at the rate of 1/4 per hour. Therefore, the total time taken is 4 hours.
Now, consider a case where:
The rates are:
Combined rate = –1/12 – 1/6 + 1/24 = –1/12 – 2/12 + 1/24 = –3/12 + 1/24 = –5/24.
Since emptying is considered positive here, the effective work is 1/24 + 1/6 – 1/12 = 1/8 per hour.
The tank needs only 2/3 of the work (because it is already partly full).
So, time taken = (2/3) ÷ (1/8) = 16/3 hours = 5 hours 20 minutes.
Such problems test whether you can carefully adjust your equations when the situation is slightly modified. The trap often lies in failing to account for partial filling or mixing up the signs for filling and emptying. By training yourself to define work consistently and checking whether you are dealing with a fraction of the tank or the full tank, you can avoid common mistakes. Consistent practice with time and work problems on GMAT exercises as well as GMAT simulation will help you develop the confidence to tackle these efficiently in the exam.
Negative work highlights a constructive focus: invest in actions that move you forward. The most valuable minutes increase your net rate of progress. GMAT preparation improves when you name and remove the forces that drain rate: unfocused browsing, restless switching, hurried guessing. Choose fewer high quality resources, record errors, and let recovery add net work. In your business school application, align your profile, essays, recommendations, and resume so each line contributes to the same story; revise sentences that dilute it. In life, protect the minutes that fill the tank and close the taps that empty it. Progress is the sum of signed rates. Guard the sign, and momentum becomes inevitable!
