Unit: Linear Equations in One Variable
Word Problems Involving Linear Equations
Word problems involving linear equations require translating a real-world situation into a mathematical equation and then solving for the unknown variable. These problems often involve relationships between quantities, rates, and times.
Steps to Solve Word Problems
- Read the Problem Carefully:
- Identify what you are asked to find.
- Determine the information given.
- Define the Variables:
- Choose a variable to represent the unknown quantity.
- Write down what the variable represents.
- Set Up the Equation:
- Translate the words into a mathematical equation using the defined variable.
- Solve the Equation:
- Use algebraic methods to solve for the variable.
- Check the Solution:
- Substitute the solution back into the original context to ensure it makes sense.
- Verify the solution meets all conditions of the problem.
- Answer the Question:
- Write a complete sentence answering the problem’s question.
Examples
- Basic Example:
- Problem: A number increased by 7 is 15. What is the number?
- Solution:
- Let x be the number.
- Equation: x+7=15
- Solve: x=15−7=8
- Answer: The number is 8.
- Age Problems:
- Problem: John is 3 years older than his sister. If the sum of their ages is 23, how old is each?
- Solution:
- Let x be the sister’s age.
- John’s age: x+3
- Equation: x+(x+3)=23
- Solve: 2𝑥+3=23
- 2x=20
- x=10
- Sister’s age: 10
- John’s age: 10+3=13
- Answer: The sister is 10 years old and John is 13 years old.
- Distance-Rate-Time Problems:
- Problem: A car travels at 60 miles per hour. How long will it take to travel 180 miles?
- Solution:
- Let t be the time in hours.
- Equation: 60t=180
- Solve: 𝑡=
=3 - Answer: It will take 3 hours to travel 180 miles.
- Mixture Problems:
- Problem: How many liters of a 10% salt solution must be mixed with 20 liters of a 25% salt solution to get a 20% salt solution?
- Solution:
- Let x be the liters of the 10% solution.
- Salt from 10% solution: 0.10x
- Salt from 25% solution: 0.25×20=5
- Total salt: 0.20(x+20)
- Equation: 0.10x+5=0.20(x+20)
- Solve: 0.10𝑥+5=0.20𝑥+4
- 5−4=0.20𝑥−0.10𝑥
- 1=0.10x
- x=10
- Answer: 10 liters of the 10% salt solution are needed.
- Investment Problems:
- Problem: Maria invests $5000 in two accounts. One account pays 5% interest and the other pays 7%. If the total interest earned is $320, how much is invested in each account?
- Solution:
- Let x be the amount invested at 5%.
- Amount at 7%: 5000−x
- Equation: 0.05𝑥+0.07(5000−𝑥)=320
- Solve: 0.05𝑥+350−0.07𝑥=320
- −0.02𝑥+350=320
- −0.02𝑥=−30
- 𝑥=1500
- Amount at 5%: $1500
- Amount at 7%: 5000−1500=3500
- Answer: $1500 is invested at 5% and $3500 at 7%.
Summary
- Steps to Solve: Read carefully, define variables, set up the equation, solve, check, and answer.
- Examples: Include basic number problems, age problems, distance-rate-time problems, mixture problems, and investment problems.
- Key Skills: Translating words into equations, solving equations, and interpreting solutions in context.
Mastering word problems involves practice and the ability to connect mathematical concepts to real-life scenarios.