In this lesson we calculate successive percentage increases and decreases and how to determine the overall percentage change.
Repeated percentage change can seem a bit misleading. If I wanted to buy a TV for $\$1000$$1000 that had been reduced by $20%$20% and then $50%$50% it would be easy to think you save $20%$20% of $1000$1000 ($\$200$$200) and then $50%$50% of $1000$1000 ($\$500$$500), which would be a saving of $\$700$$700 or $70%$70%. But this is not the case!
The reduction happens successively. So at first you save the $\$200$$200. So the TV was then priced at $\$800$$800. You can then save $50%$50% of $\$800$$800 - which is $\$400$$400. So in total this is a saving of $\$600$$600 or only $60%$60%.
Decreasing by $\left(x\right)%$(x)% means calculate $\left(100-x\right)%$(100−x)% of the amount
Increasingby $\left(x\right)%$(x)% means calculate $\left(100+x\right)%$(100+x)% of the amount
Worked example
Example 1
Solve: A set of tools is on sale for $20%$20% off and then has a further $15%$15% trade discount applied. If the original price of the tools is $\$500$$500, what is the discounted price?
Think: This is not equivalent to a $35%$35% discount, we must apply the two discounts in series. To obtain the price after the first discount we need to multiply by $80%$80% and then to apply the second discount we need to multiply by $85%$85%. This can be done in two steps, or in one as follows:
Do:
| $\text{Discounted price}$Discounted price | $=$= | $\$500\times80%\times85%$$500×80%×85% |
| $=$= | $\$500\times0.8\times0.85$$500×0.8×0.85 | |
| $=$= | $\$340$$340 |
Reflect: Notice we are multiplying by both changes and we can reorder a multiplication without changing the result. Hence, the order of the discounts is not important - an $80%$80% discount followed by a $20%$20% discount is the same as a $20%$20% discount followed by an $80%$80% discount.
Practice question
Question 1
The price of a heater selling for $\$234$$234 is initially discounted by $14%$14% and later marked up by $14%$14%.
Choose the expression that correctly represents the final sales price of the heater.
$234-14%+14%$234−14%+14%
A$234\times\left(\left(-14\right)%\right)\times14%$234×((−14)%)×14%
B$234\times86%\times114%$234×86%×114%
C$234\div86%\times114%$234÷86%×114%
DWhat is the final sales price to the nearest cent?
Finding overall percentage change
- Calculate the single multiplier equivalent to the chain of increases/decreases
- Convert the multiplier to a percentage
- Find the difference between the multiplier and $100%$100%
Worked example
Example 2
Find the overall percentage change equivalent to:
(a) A mark-up of $30%$30% followed by a discount of $20%$20%.
Think: To mark-up(increase) by $30%$30% we need to multiply by $1.3$1.3 and to discount by $20%$20% we need to multiply by $0.8$0.8. Let's find what single multiplier this is equivalent to:
Do:
| $\text{Net price}$Net price | $=$= | $\text{Original price}\times1.3\times0.8$Original price×1.3×0.8 |
| $=$= | $\text{Original price}\times1.04$Original price×1.04 |
Our single multiplier is $1.04$1.04 which as a percentage is $104%$104%. We can see the difference between this and $100%$100% is a $4%$4% increase $\left(104%-100%=4%\right)$(104%−100%=4%).
(b) A discount of $25%$25% followed by a further discount of $10%$10%.
Think: To discount by $25%$25% we need to multiply by $0.75$0.75 and to discount by $10%$10% we need to multiply by $0.9$0.9. Let's find what single multiplier this is equivalent to:
Do:
| $\text{Net price}$Net price | $=$= | $\text{Original price}\times0.75\times0.9$Original price×0.75×0.9 |
| $=$= | $\text{Original price}\times0.675$Original price×0.675 |
Our single multiplier is $0.675$0.675 which as a percentage is $67.5%$67.5%. We can see the difference between this and $100%$100% is a $32.5%$32.5% decrease $\left(100%-67.5%=32.5%\right)$(100%−67.5%=32.5%).
Practice questions
question 2
The price of a phone was increased by $40%$40% and then again by $40%$40%.
What was the overall percentage increase?
The overall percentage increase when the price is increased by $40%$40% twice is $2\times40%$2×40%. True or false?
True
AFalse
B
QUESTION 3
A country's GDP (Gross Domestic Product) contracted by $4%$4% one year due to a drought, but then grew by $6%$6% the next year when the weather returned to normal.
Express the country's GDP during the drought as a percentage of the previous year's GDP.
Express the country's GDP in the year after the drought as a percentage of the drought affected GDP.
Calculate the new GDP as a percentage of the original.
Hence, evaluate the percentage change over the two years.
Is this change an overall increase or decrease?
Increase
ADecrease
B
Finding original amount
The process of finding the final(net) amount after a series of percentage increases/decreases can be reversed through division to find the original amount.
Worked example
Example 3
Solve: A computer is on sale for $\$957$$957 after being discounted by $25%$25% and then a further $12%$12%, what was the original selling price of the computer?
Think: To obtain the sale(net) price the original price would need to be multiplied by $0.75$0.75 to discount by $25%$25% and also multiplied by $0.88$0.88 to discount by $12%$12%. Set this up as an equation and then undo the multiplications by division.
Do:
| $\text{Net price}$Net price | $=$= | $\text{original price}\times0.75\times0.88$original price×0.75×0.88 | |
| $\$957$$957 | $=$= | $\text{original price}\times0.75\times0.88$original price×0.75×0.88 | Substitute in sale price |
| $\therefore\text{original price}$∴original price | $=$= | $\$957\div0.75\div0.88$$957÷0.75÷0.88 | Find the original price by dividing by the discount multipliers |
| $=$= | $\$1450$$1450 |
The original selling price of the computer was $\$1450$$1450.
Practice question
Question 4
A guitar is on sale for $\$403.69$$403.69 after a discount of $21%$21% and an additional discount of $27%$27%.
Fill in the gaps below:
Sale price$=$=Original price$\times$×$\editable{}\times\editable{}$×
What overall percentage change is this equivalent to?
Find the original selling price of the guitar.
Round your answer to the nearest dollar.