Word Problems

Overview

The main skill is translation: identify variables, write equations, and keep units consistent. Draw tables for rate and mixture problems.

Most errors come from unclear variables or inconsistent units, not algebra.

Distance = rate $\times$ time.
For mixtures, total amount = sum of parts, and total concentration is a weighted average.
Ratios are easiest to manipulate when written as fractions.
Percent changes should be applied multiplicatively, not additively.
Use tables for work and rate problems to avoid sign mistakes.

If an agent completes a job in $t$ hours, its rate is $1/t$ jobs per hour. When multiple agents work together, add rates.

Amount of solute $=$ concentration $\times$ total volume. Track solute, not just volume.

Translate $a:b$ as $a/b$ or as $a=kx$ , $b=ky$ to scale cleanly.

Increase by $p\%$ : multiply by $1+p/100$ . Decrease by $p\%$ : multiply by $1-p/100$ .

A tank is filled by two pipes. Pipe A fills the tank in $6$ hours, pipe B in $10$ hours. How long together?

Their combined rate is $\frac{1}{6} + \frac{1}{10} = \frac{8}{30} = \frac{4}{15}$ tanks per hour. The time is $\frac{1}{4/15} = \frac{15}{4}$ hours.

Two cars are 120 miles apart and drive toward each other at 50 mph and 30 mph. How long until they meet?

Relative speed is $80$ mph, so time is $120/80 = 1.5$ hours.

A solution is 20% salt. If you add 10 liters of water to 30 liters of the solution, what is the new concentration?

Original salt is $0.2\cdot 30 = 6$ liters. New volume is $40$ , so concentration is $6/40 = 15\%$ .

A price increases by 20% and then decreases by 20%. The net change is $1.2\cdot 0.8=0.96$ , so a 4% decrease overall.

Status		Source	Problem Name	Difficulty	Tags
		AMC 12	Problem 2 (2025 AMC 12A)	Easy	Show Tags Percentages, Weighted Average, Word Problems
		AMC 12	Problem 3 (2025 AMC 12A)	Easy	Show Tags Averages, Systems of Equations, Word Problems

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