⚖️ Ratio & Proportion
Compare quantities, unitary method, partnership basics.
💡 Comparing Two Quantities
A ratio compares two amounts. 3 : 5 means "3 parts to 5 parts". A ratio is just a fraction written differently — 3:5 = 3/5.
A proportion is when two ratios are equal: 2 : 3 = 4 : 6. Multiply or divide both sides by the same number — the ratio stays equivalent.
Dividing money in a ratio — most common SSC question type:
Example: Divide ₹6,000 between A and B in ratio 2:3.
Total parts = 2+3 = 5. A gets (2/5)×6000 = ₹2,400. B gets (3/5)×6000 = ₹3,600.
If N units cost ₹X, find cost of M units:
1 unit = X/N. So M units = (X/N) × M = (X × M) / N.
Example: 5 pens cost ₹40, what do 8 pens cost? (40 × 8)/5 = ₹64.
Direct: as one ↑, other ↑. More workers → more output. More speed → more distance covered.
Inverse: as one ↑, other ↓. More workers → less time. More speed → less travel time.
Inverse formula: N₁ × T₁ = N₂ × T₂ (work-rate principle).
If 4 men do work in 12 days, 6 men do it in: 4 × 12 = 6 × T → T = 8 days.
Dividing in a Ratio
AnimationBar widths visualize how the total splits. The longer bar belongs to the bigger ratio.
Ratio Calculators
CalculatorTotal ₹ in ratio :
A = ₹2,400 · B = ₹3,600
If units cost ₹, then units cost ₹64
1 unit = ₹40 ÷ 5 = ₹8. So 8 units = 8 × ₹8 = ₹64.
If men finish in days, then men finish in 8 days