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OCR GCSE Maths (Higher) Study Notes

3.3.1 Basic Percentage Calculations

Percentages are a fundamental concept in maths, representing parts of a whole as fractions of 100. This makes them incredibly useful for a wide range of applications, from finance to everyday calculations. In this section, we delve into the basics of percentage calculations, focusing on techniques for computing the percentage of quantities and expressing quantities as percentages.

Understanding Percentages

A percentage is essentially a fraction with a denominator of 100, denoted by the symbol "%". This simple concept is pivotal in comparing proportions and understanding changes in quantities.

Percentage

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Calculating the Percentage of a Quantity

To find what one quantity is as a percentage of another, we use the formula:

Percentage=(PartWhole)×100\text{Percentage} = \left( \frac{\text{Part}}{\text{Whole}} \right) \times 100

Example 1: Finding a Percentage of a Quantity

Question: What is 25% of 200?

Solution:

Percentage of 200=(25100)×200=50\text{Percentage of 200} = \left( \frac{25}{100} \right) \times 200 = 50

Therefore, 25% of 200 is 50.

Expressing a Quantity as a Percentage of Another

This involves rearranging the formula above to solve for the percentage:

Percentage=(PartWhole)×100\text{Percentage} = \left( \frac{\text{Part}}{\text{Whole}} \right) \times 100

Example 2: Expressing One Quantity as a Percentage of Another

Question: If 50 is what percentage of 200?

Solution:

Percentage=(50200)×100=25%\text{Percentage} = \left( \frac{50}{200} \right) \times 100 = 25\%

Hence, 50 is 25% of 200.

Converting Decimals and Fractions to Percentages

Decimals and fractions can be easily converted to percentages by understanding their relationship to the whole.

Converting fraction and decimal to percent

Converting Decimals to Percentages

Multiply the decimal by 100 to find the equivalent percentage.

Example 3: Convert 0.75 to a percentage.

Solution:

0.75×100=75%0.75 \times 100 = 75\%

Converting Fractions to Percentages

Divide the numerator by the denominator, then multiply by 100.

Example 4: Convert 35\frac{3}{5} to a percentage.

Solution:

(35)×100=60%\left( \frac{3}{5} \right) \times 100 = 60\%

Applying Percentage Calculations in Real-Life Scenarios

Percentages are incredibly useful in a variety of contexts, including financial calculations and data analysis.

Example 5: Calculating a Discount

Question: A £120 item is on sale for 20% off. What is the sale price?

Solution:

First, calculate the discount amount:

Discount=(20100)×120=24\text{Discount} = \left( \frac{20}{100} \right) \times 120 = 24

Then, subtract the discount from the original price:

Sale Price=12024=96\text{Sale Price} = 120 - 24 = 96

Thus, the sale price is £96.

Example 6: Determining Interest Earned

Question: How much interest does £1000 earn in a year at an annual interest rate of 5%?

Solution:

Interest=(5100)×1000=50\text{Interest} = \left( \frac{5}{100} \right) \times 1000 = 50

Therefore, £1000 will earn £50 in interest over one year.

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