Percent and Percentage

1. Meaning of Percent

'Per cent' means 'out of 100' or 'for every hundred.' The symbol is %.

x% = x/100 (x divided by 100).

'Percentage is a way of expressing a number as a FRACTION of 100. It makes comparison EASY.'

Conversions:

ConvertMethodExample
Fraction to %Multiply by 1003/5 = 3/5 × 100 = 60%
Decimal to %Multiply by 1000.45 = 0.45 × 100 = 45%
% to fractionDivide by 10075% = 75/100 = 3/4
% to decimalDivide by 10012.5% = 12.5/100 = 0.125
Ratio to %Convert to fraction, then multiply by 1003 : 4 = 3/4 × 100 = 75%
% to ratioWrite as fraction, simplify40% = 40/100 = 2 : 5

2. Finding Percentage of a Given Number

Worked Example: Find 15% of 250.

15% of 250 = (15/100) × 250 = 3750/100 = 37.5

Worked Example: A student scored 42 out of 50 in a test. Find the percentage.

Percentage = (42/50) × 100 = 84%


3. Expressing One Quantity as a Percentage of Another

Formula: (First quantity / Second quantity) × 100%

Worked Example: What percent of 80 is 20?

(20/80) × 100 = 25%

Worked Example: In a class of 45 students, 27 are girls. What percentage are boys?

Boys = 45 — 27 = 18 Percentage of boys = (18/45) × 100 = 40%


4. Percentage Increase and Decrease

Formula: Percentage increase = (Increase in value / Original value) × 100% Percentage decrease = (Decrease in value / Original value) × 100%

Worked Example: The price of a book increased from Rs 120 to Rs 150. Find the percentage increase.

Increase = 150 — 120 = 30 Percentage increase = (30/120) × 100 = 25%

Worked Example: A shirt costing Rs 800 is now available for Rs 680. Find the percentage decrease.

Decrease = 800 — 680 = 120 Percentage decrease = (120/800) × 100 = 15%


5. Finding Original Value After Increase/Decrease

Worked Example: After a 12% increase, the population of a town is 56,000. What was the original population?

Let original population = P. P + 12% of P = P(1 + 12/100) = P × 1.12 = 56000 P = 56000/1.12 = 50000

Worked Example: A laptop is sold at a 15% discount for Rs 34,000. Find its marked price.

Let marked price = M. M — 15% of M = M × 0.85 = 34000 M = 34000/0.85 = 40000


6. Applications of Percentage

Passing Percentage

Worked Example: A student scored 78 marks and failed by 12 marks. If the passing percentage is 45%, find the maximum marks.

Passing marks = 78 + 12 = 90 45% of Max marks = 90 Max marks = 90 × 100/45 = 200

Percentage of Pure Substance

Worked Example: 15 g of salt is dissolved in 285 g of water. Find the percentage of salt in the solution.

Total solution = 15 + 285 = 300 g Percentage of salt = (15/300) × 100 = 5%

Income and Expenditure

Worked Example: A person spends 70% of his income. If his income increases by 20% and his expenditure increases by 10%, find the percentage change in savings.

Let original income = Rs 100. Original expenditure = Rs 70. Original savings = Rs 30. New income = 100 × 1.20 = Rs 120. New expenditure = 70 × 1.10 = Rs 77. New savings = 120 — 77 = Rs 43. Increase in savings = 43 — 30 = Rs 13. Percentage increase in savings = (13/30) × 100 = 43⅓%


Common Mistakes and Fixes

MistakeFix
'x% of y = y% of x is FALSE'It IS true: x% of y = (x/100) × y = xy/100 = (y/100) × x = y% of x
'Percentage increase is calculated on the NEW value'Always calculate on the ORIGINAL value
'Discount of 20% + 30% = 50%'SUCCESSIVE discounts are NOT additive. Final = Original × 0.8 × 0.7
'100% means nothing'100% means the WHOLE. 100% of a number = the number itself

ICSE Exam Focus (4–6 marks)

  • 2-mark questions: Convert fractions/decimals to percentages and vice versa
  • 3-mark questions: Simple applications (marks, expenditure)
  • 4-mark questions: Percentage increase/decrease word problems
  • 6-mark questions: Multi-step applications (population growth, successive discounts)

Self-Test

Q1. Convert 7/8 to percentage. A1. 7/8 × 100 = 700/8 = 87.5%.

Q2. Find 12½% of 360. A2. 12½% = 12.5% = 12.5/100 = 1/8. 1/8 × 360 = 45.

Q3. What percent of 125 is 30? A3. (30/125) × 100 = 3000/125 = 24%.

Q4. A man spends 75% of his income. If his income increases by 30%, by what percentage should his expenditure increase so that his savings remain the same? A4. Let income = 100. Savings = 25, Expenditure = 75. New income = 130. Need new savings = 25. New expenditure = 105. Increase in expenditure = 30. Percentage increase = (30/75) × 100 = 40%.

Q5. The value of a car depreciates 12% every year. If its present value is Rs 5,50,000, what was its value one year ago? A5. Let value one year ago = V. V(1 — 12/100) = 550000. V × 0.88 = 550000. V = 550000/0.88 = Rs 6,25,000.

Q6. In an election, a candidate gets 65% of the valid votes. If 15% of the total votes are invalid and the total votes are 20,000, how many votes did the winning candidate get? A6. Valid votes = 85% of 20000 = 17000. Winning candidate's votes = 65% of 17000 = 11050.

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