Percentage Calculator
Six modes: find a percentage, % of total, % change, % difference, % error, and reverse percentage. Instant results.
💯 What is Percentage?
A percentage is a way of expressing a number as a fraction of 100. The word itself comes from the Latin per centum, meaning "by the hundred." When you say 35 percent, you mean 35 out of every 100, or equivalently the decimal 0.35 or the fraction 35/100.
Percentages are used everywhere in daily life - from exam scores and discounts to tax rates, interest rates, and nutritional information on food labels. They provide a universal, normalised way to compare proportions. Instead of saying "42 out of 150 customers complained," you can say "28% of customers complained," which is immediately comparable regardless of the total sample size.
This calculator covers six distinct percentage operations in one place. First, finding a percentage of a number (for example, calculating a 15% tip on a bill). Second, finding what percentage one number is of another (for example, expressing exam marks as a percentage of the total). Third, calculating percentage change between an old and new value - useful for salary increases or stock returns. Fourth, percentage difference between two values where neither is the "original" - used when comparing two measurements or two stores' prices. Fifth, percentage error for science and engineering experiments, where you know both the theoretical value and your measured result. Sixth, reverse percentage - working backwards to find the original value before a percentage was applied (for example, finding the pre-tax price from a final total).
A common source of confusion is the difference between a percentage and a percentage point. If a bank's interest rate rises from 4% to 6%, it has risen by 2 percentage points - but by 50% in relative terms (since 2 is 50% of 4). News and financial reports frequently conflate these two concepts, so it is important to know the distinction when reading about interest rates, election polling, or economic statistics.
📐 Percentage Formulas
📖 How to Use This Calculator
Steps to Calculate Percentages
💡 Example Calculations
Example 1 — Find X% of Y (GST Calculation)
Calculate 18% GST on ₹2,400
Example 2 — Marks to Percentage
A student scored 347 out of 500 in board exams. What is their percentage?
Example 3 — Percentage Change
A product's price went from ₹1,200 to ₹960. What is the percentage decrease?
Example 4 — Percentage Difference
Store A sells a phone for ₹18,500; Store B sells the same phone for ₹21,000. What is the percentage difference?
Example 5 — Reverse Percentage
A shop lists a product as "20% off." The sale price is 960. What was the original price?
Example 6 — Percentage Error
The theoretical density of copper is 8.96 g/cm³. A lab measurement gives 8.72 g/cm³. What is the percentage error?
❓ Frequently Asked Questions
🔗 Related Calculators
What is the formula for percentage?
Percentage = (Part / Whole) × 100. For example, if 30 out of 200 students passed, the pass rate is (30 / 200) × 100 = 15%.
How do I calculate percentage increase or decrease?
Percentage change = ((New Value - Old Value) / Old Value) × 100. A positive result means an increase; a negative result means a decrease.
How do I find what percentage one number is of another?
Divide the first number by the second and multiply by 100. For example, 45 is what percentage of 180? = (45 / 180) × 100 = 25%.
How do I calculate a percentage of a number?
Multiply the number by the percentage divided by 100. For example, 15% of 240 = (15 / 100) × 240 = 36.
What is percentage point vs percentage change?
A percentage point is the arithmetic difference between two percentages. If interest rate rises from 5% to 8%, it rises by 3 percentage points, but by 60% in relative terms. These are very different concepts and often confused in news articles.
How do I calculate percentage discount on a product?
Discount % = ((Original Price - Sale Price) / Original Price) × 100. For example, a product originally priced at ₹2,500 selling at ₹1,750: discount = ((2,500 - 1,750) / 2,500) × 100 = 30%. To find the sale price given a discount: Sale Price = Original Price × (1 - Discount%/100). So 25% off ₹3,000 = ₹3,000 × 0.75 = ₹2,250.
What is 15% of 1200?
15% of 1200 = (15 / 100) × 1200 = 0.15 × 1200 = 180. A quick mental method: 10% of 1200 = 120, and 5% = 60, so 15% = 120 + 60 = 180. This approach works well for common percentages like 5%, 10%, 15%, 20%, and 25%.
How do you find the original price before a percentage increase or decrease?
To reverse a percentage change: Original = Final / (1 ± change%). If a price rose by 20% to reach ₹1,800: original = 1,800 / 1.20 = ₹1,500. If a price fell by 15% to reach ₹850: original = 850 / 0.85 = ₹1,000. This is also called 'back-calculating' and is useful when you know the result but not the starting value.
What is percentage difference between two numbers?
Percentage difference = |V1 - V2| / ((V1 + V2) / 2) × 100. This formula is used when neither value is the reference or 'original' - for example, comparing the prices of the same item at two different stores. It is symmetric: the result is the same regardless of which value you call V1 or V2. This is different from percentage change, which requires a clear 'old' and 'new' value.
What is percentage error and how is it calculated?
Percentage error = |Experimental - Theoretical| / |Theoretical| × 100. It measures how far an experimental or measured value is from the known or accepted theoretical value. For example, if the theoretical speed of sound is 343 m/s and you measured 355 m/s in an experiment, the percentage error = |355 - 343| / 343 × 100 = 3.5%. It is always expressed as a positive number.
How do I convert marks to percentage?
Marks percentage = (Total marks scored / Maximum marks) × 100. For example, if you scored 347 out of 500: percentage = (347 / 500) × 100 = 69.4%. For multiple subjects, add all scored marks and divide by the sum of all maximum marks. For example, 5 subjects with totals 85+78+90+72+68 = 393 out of 500: percentage = (393 / 500) × 100 = 78.6%.
How is percentage used in everyday life?
Percentages appear in almost every area of life: bank interest rates and loan EMIs, tax calculations (GST, income tax), exam scores and grades, stock market returns, discounts and offers, inflation rates, nutrition labels (daily value %), opinion polls, and sports statistics. Understanding how to read and calculate percentages is one of the most practical math skills for financial and daily decision-making.