Lesson 12
Solving Problems about Percent Increase or Decrease
Let’s use tape diagrams, equations, and reasoning to solve problems with negatives and percents.
Problem 1
Select all expressions that show \(x\) increased by 35%.
A:
\(1.35x\)
B:
\(\frac{35}{100}x\)
C:
\(x + \frac{35}{100}x\)
D:
\(( 1+0.35)x\)
E:
\(\frac{100+35}{100}x\)
F:
\((100 + 35)x\)
Problem 2
Here are two stories:
- The initial freshman class at a college is 10% smaller than last year’s class. But then during the first week of classes, 20 more students enroll. There are then 830 students in the freshman class.
- A store reduces the price of a computer by $20. Then during a 10% off sale, a customer pays $830.
Here are two equations:
- \(0.9x+20=830\)
- \(0.9(x-20)=830\)
- Decide which equation represents each story.
- Explain why one equation has parentheses and the other doesn’t.
- Solve each equation, and explain what the solution means in the situation.
Problem 3
Select all the expressions that are the result of decreasing \(x\) by 80%.
A:
\(\frac{20}{100}x\)
B:
\(x - \frac{80}{100}x\)
C:
\(\frac{100-20}{100}x\)
D:
\(0.80x\)
E:
\((1-0.8)x\)
Problem 4
Which scale is equivalent to 1 cm to 1 km?
A:
1 to 1000
B:
10,000 to 1
C:
1 to 100,000
D:
100,000 to 1
E:
(From Unit 2, Lesson 7.)
1 to 1,000,000
Problem 5
Triangle \(DEF\) is a right triangle, and the measure of angle \(D\) is \(28^\circ\). What are the measures of the other two angles?