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SAT Percentage: Learn Concept, Formulas, Applications with Example

Last Updated on Mar 18, 2025
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Let’s break it down—percentage simply means “per hundred.” Anytime you see the word “percent” or the symbol %, it’s basically saying out of 100. So, when you spot something like 30%, think of it as 30 out of 100. Easy, right? Percentages are super useful, especially when comparing numbers or figuring out portions.

Now, here’s the cool part: anytime a % symbol is attached to a number—whether it’s known or unknown—you read it as percent, not percentage. It’s a small detail, but knowing it can make you sound like a math pro!

In this article, we’re diving deep into all things Percentages—from the must-know concepts to the different types of questions you’ll likely see on exams like the SAT, ACT, PSAT/NMSQT, GED, GRE, GMAT, AP Exams, PERT, Accuplacer, or even the MCAT. Plus, we’ve thrown in some smart tips, tricks, and step-by-step solved examples to help you master the topic fast. So stick around—you’ll walk away feeling way more confident tackling percentage problems on test day!

What is the Percentage of a Number?

In mathematics calculations, a percentage is a numeral or ratio that can be defined as a fraction of 100. In other words, we can say that the percentage is specified as a given fraction or part in every hundred. This implies that it is a fraction with 100 as the denominator and is commonly symbolised by the symbol “%” symbol.
For example, if we have to estimate the percent of a number, then divide the number by total and multiply it by 100. In a live test, Savita scored 45% marks, which means that she scored 45 marks out of 100.

Percentage Formula

To hold a better command on percentage calculation we need to know all percentage formulas. The basic formula used to calculate the percentage is equivalent to the ratio of actual value to the complete value multiplied by 100. The formula of the percentages is expressed as:


For Example: \(\frac{2}{4}\times100=0.5\times100=50\%\)

Percentage Difference Formula

The percentage difference can be understood as the change in the value of an amount over some time in terms of percentage. If there are two values and we need to determine the percentage difference between the given two values, then this can be calculated by the below steps:

  • Step 1: Compute the difference (i.e subtract one value from the other) skip any negative sign if obtained.
  • Step 2: Estimate the average of the two values (add the values, then divide by 2).
  • Step 3: Finally divide the difference by the average obtained.
  • Step 4: Transform the obtained answer to a percentage for the result to be in percentages.

Percentage Difference Formula=\(\left|\frac{\text{First Value}−\text{Second Value}}{\left(\frac{\text{First Value}+\text{Second Value}}{2}\right)}\right|\times100\%\)

The modulus symbols represent absolute value so that any negative outcome becomes positive.

Percentage Increase and Decrease Formula

Two cases might appear while computing percentage difference namely:

  • Percentage increase.
  • Percentage decrease.

Let us learn how to calculate both through the formula:
The percentage increase is equivalent to subtracting the original number from the new number and dividing the obtained answer by the original number. Multiply the final answer by 100 for the answer to be in percentage.

Percentage Increase=\(\frac{\text{Rise in the Number}}{\text{Original Number}}\times100\%\)
Rise in the Value= New number – Original number
Likewise, percentage decrease is comparable to subtracting the new number from the original numeral and dividing the obtained answer by the original number. Multiply the final answer by 100 for the answer to be in percentage.

Percentage Decrease=\(\frac{\text{Decrease in the Number}}{\text{Original Number}}\times100\%\)

Decrease in the Number=Original number – New number
We should remember that when the new value/number is greater than the old number/value, it is a percentage increase, otherwise, it is a decreasing percentage.

Percentage Formula in terms of a Fraction

To transform a fraction into a percentage divide the top/numerator number by the bottom/denominator number and lastly multiply the result by 100%.

\(\frac{\text{Numerator Value}}{\text{Denominator Value}}\times100\%\)

Percentage Change Formula

Sometimes when it is required to get the increase or decrease in any quantity as percentages, which is also directed to as percentage change is given by the formula:

Percentage Change=

How to Find Percentage?

To estimate the percentage of any value/ data/ number, we can apply the various formulas as discussed above as per the condition applied. Let us learn the basic method to find the percentage.
A% of a data = B
Here B is the necessary percentage.
If we wish to remove the % sign, then the formula is expressed as:
A/100 * given data = B
For example:
How to calculate 20% of 60.
Let 20% of 60 = Y
20/100 * 60 = Y
Y = 12

Similarly; 8% means 8 out of every 100, or in fraction we write 8/100.
In the same way, 50% can be composed as a fraction, 1/2, or a decimal, 0.5.

Percentage Table

Some common fraction and their percentages equivalents are given below.

Fraction Percentage
1/1 100%
1/2 50%
1/3 33.33%
1/4 25%
1/5 20%
1/6 16.66%
1/7 14.28%
1/8 12.5%
1/9 11.11%
1/10 10%
1/11 9.09%
1/12 8.33%

How to Convert Fractions to Percentages?

A fraction can be represented by; and can be converted into percentage by the below formula:

Therefore by the formula, it is clear that we can convert fraction to percentage merely by multiplying the given fraction by 100.

Note:

To convert percentages into fraction, divide it by 100.

Example: 25% = 25/100 = ¼

To convert a fraction into percentage, multiply in by 100.

Example: ⅕ = ⅕ x 100 = 20%

Difference between Percentage and Percent

The words percentage and percent are nearly related to one another. The tradition for operating percent and percentage is as specified. The word percent (or the symbol %) accompanies a specific number, on the other hand, the word percentage is used without a number.

An example of Percent:
More than 65% of the country’s population have been vaccinated with the first dose of Covid-19.
An example of Percentage:
A very large percentage of the world’s population has been exposed to Covid-19 pandemic.

Important Definitions related to Percentages

Let us know some of the important definitions related to the percentage.

Percentage Entity Definition
Cost Price  Cost Price is the price at which a person purchases a product.
Selling Price Selling price is the price at which a person sells a product.
Market Price It is the price that is marked on an article or commodity.
It is also known as list price or tag price.
If there is no discount on the marked price,
then the selling price is equal to marked price.
Markup It is the amount by which cost price is increased to reach market price.
Markup = market price – cost price
Discount The reduction offered by a merchant on marked price is called discount.
Profit When a person sells a product at a higher rate than the cost price,
the difference of both amounts is called profit.
Profit = Selling price – Cost price
Loss When a person sells a product at a lower rate than the cost price,
then the difference of both amounts is called loss.
Loss = Cost Price – Selling Price
Percentage Points It is the difference between two percentages. For example,
if the Reserve Bank of India increases the rate of interest from 8% to 10%,
we can say that an increase in the rate of interest is 2 percentage points,
while the percentage increase in rate of {(10 – 8) / 8} x 100 = 25%.

Marks Percentage

Marks obtained by students in various exams during school and colleges are mostly out of 100. These marks are calculated in terms of percent. For example, consider if a student has scored X marks out of total marks. And, if we have to decide the percentage score; then we divide the scored mark from total marks and multiply the result by 100.

Tips and Tricks to solve Percentage based Questions Faster

Candidates can find different tips and tricks from below for solving the questions related to percentage.

Tip # 1:  Candidates need to make sure that they know all the important formulas of percentage which are mentioned below.

  • Profit % = profit x 100 / cost price
  • Loss % = loss x 100 / cost price
  • Markup % = (markup / cost price) x 100
  • Discount % = (discount / market price) x 100

Tip # 2: Successive Percentage Change: We can use successive percentage change formulas to solve percentage related problems where the product of two quantities equal the third quantity. For example,

⇒Length x Breadth = Area

⇒Price x Quantity purchased = Expenditure

⇒If any quantity is increased by x%, then y% and later on z%, the overall or effective percentage increase is:

⇒[(100 + x) / 100) (100 + y) / 100) (100 + z / 100) -1] x 100

Percentage Solved Example for Competitive Exams

Question 1: 20 gram is what percentage of 1 kg?

Solution 1: Here, quantity 1 = 20 grams and quantity 2 = 1kg = 1000 grams

⇒Hence, required percentage = 20/1000 × 100 = 2%

Question 2: If the price of sugar is increased by 10%, then by how much percent consumption should be reduced so that the expenditure remains the same?

Solution 2: Let the price be Rs. x /kg Consumption be y kg

⇒Hence, expenditure = price × consumption ⇒ Expenditure = xy

⇒Price of sugar is increased by 10% Hence, new price of sugar = 1.1x per kg

⇒Let new consumption be z kg

⇒Hence, new expenditure = (1.1x) × z Now, new expenditure = old expenditure

⇒ (1.1x) × z = x × y ⇒ z = y/1.1

Reduction in consumption = (y – z) = y – (y/1.1) = y/11

∴ Percentage reduction in consumption = [(y/11)/y] × 100 = 100/11 = 9.09%

Question 3: The population of a town 2 years ago was 245000. It increased by 15% in the first year and then increased by 20% in the second year. What is the current population of the town?

Solution 3: The population of a town 2 years ago was 245000 It increased by 15% in the first year

∴ The population after first year will be = (115 / 100) x 245000 = 281750

⇒The population then increased by 20% in the second year.

∴ The population after second year will be = (120 / 100) x 281750 = 338100

Question 4: An electric bully was bought at Rs. 4100. Its value depreciates at the rate of 7% per annum. Its value after one year will be:

Solution: Actual price of the electric bully = Rs. 4100

⇒ Depreciation rate = 7%

∴ Value after 1 year = 4100 – 7% of 4100 = 4100 – 4100 × (7/100) = Rs. 3813

Question 5: If A’s income is 40% more than the income of B, then what percentage of B’s income is less than income of A?

Solution: Let the income of B be 100

∴ Income of A = 140

⇒B’s income is less than income of A by (140 – 100) = 40

⇒Required percentage = (40 / 140) x 100 = 200 / 7 = 28 (4/7) %

Question 6: If A is 40% less than B, then B is how much percentage more than A?

Solution: Given, A is 40% less than B Let B be 100

⇒A = B – 40% of B = 100 – 40% of 100 = 100 – 40 = 60

∴ Required % = {(100 – 60)/60} × 100 = (40/60) × 100 = 66.66%

Conclusion

Percentages might seem a bit confusing at first, but once you get the hang of the basics, they’re actually pretty simple and super useful. Whether you're gearing up for the SAT, ACT, GED, or any other major test, knowing how to quickly solve percentage problems gives you a real edge. Keep practicing those formulas, apply the tips, and soon enough, percentage questions will feel second nature. Stay confident—you’ve got this covered!

Percentages FAQs

Percentage means per hundred, wherever you see the word “percent” or symbol %, it means 1/100.

The percentage can be computed by dividing the given value by the whole value and then multiplying the outcome by 100.

The easiest way to find a percentage of a number is to multiply the given number in question by the ​decimal​ form of the percent. For example, the decimal form of 20 percent is 0.2.

In mathematical calculations, a percentage is a number or ratio that represents a fraction of 100. For example, 42% is equivalent to the decimal 0.42, or the fraction 42/100.

04 as a percent is equivalent to: 0.04=4/100=4%.

20/100=0.2Therefore, 20 is 20 % of 100.

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