Surface Area, Volume and Capacity

1. Cube

A cube has 6 EQUAL square faces.

MeasurementFormulaExample (side = 5 cm)
Lateral Surface Area (LSA)4a²4 × 5² = 100 cm²
Total Surface Area (TSA)6a²6 × 5² = 150 cm²
Volume5³ = 125 cm³
Diagonala√35√3 ≈ 8.66 cm

LSA = area of FOUR walls (excluding top and bottom). TSA = area of ALL six faces.


2. Cuboid

A cuboid has 6 RECTANGULAR faces (opposite faces equal).

Let length = l, breadth = b, height = h.

MeasurementFormulaExample (5 cm × 3 cm × 4 cm)
LSA2h(l + b)2×4(5+3) = 64 cm²
TSA2(lb + bh + hl)2(15+12+20) = 94 cm²
Volumel × b × h5×3×4 = 60 cm³
Diagonal√(l² + b² + h²)√(25+9+16) = √50 ≈ 7.07 cm

Worked Example: Find the TSA of a cuboid with length 8 cm, breadth 6 cm, and height 5 cm.

TSA = 2(8×6 + 6×5 + 5×8) = 2(48 + 30 + 40) = 2 × 118 = 236 cm²


3. Cylinder

A cylinder has TWO circular bases and ONE curved surface.

Let radius = r, height = h.

MeasurementFormulaExample (r = 7 cm, h = 10 cm)
Curved Surface Area (CSA)2πrh2 × 22/7 × 7 × 10 = 440 cm²
Total Surface Area (TSA)2πr(r + h)2 × 22/7 × 7 × 17 = 748 cm²
Volumeπr²h22/7 × 49 × 10 = 1540 cm³

Worked Example: Find the CSA and TSA of a cylinder with radius 5 cm and height 14 cm. (Use π = 22/7)

CSA = 2 × 22/7 × 5 × 14 = 2 × 22 × 5 × 2 = 440 cm² TSA = 2 × 22/7 × 5(5 + 14) = 2 × 22/7 × 5 × 19 = 2 × 22 × 5 × 19/7 = 4180/7 ≈ 597.14 cm²


4. Hollow Cylinder

For a hollow cylinder with external radius R and internal radius r:

MeasurementFormula
CSA (external)2πRh
CSA (internal)2πrh
Total surface area2πRh + 2πrh + 2π(R² — r²)
Volume of materialπ(R² — r²)h

5. Capacity and Volume Conversion

Capacity is the volume of liquid a container can HOLD.

Conversion: 1 m³ = 1000 litres 1 cm³ = 1 millilitre (mL) 1 litre = 1000 cm³

Worked Example: A water tank is 2 m long, 1.5 m wide, and 1 m deep. Find its capacity in litres.

Volume = 2 × 1.5 × 1 = 3 m³ Capacity = 3 × 1000 = 3000 litres

Worked Example: A cylindrical container has radius 35 cm and height 40 cm. Find its capacity in litres. (Use π = 22/7)

Volume = πr²h = 22/7 × 35² × 40 = 22/7 × 1225 × 40 = 22 × 175 × 40 = 154000 cm³ Capacity = 154000/1000 = 154 litres


6. Comparison of Solids

SolidTSAVolume
Cube (a)6a²
Cuboid (l,b,h)2(lb+bh+hl)lbh
Cylinder (r,h)2πr(r+h)πr²h

'For a GIVEN surface area, a sphere has the MAXIMUM volume. For a GIVEN volume, a sphere has the MINIMUM surface area.'


Common Mistakes and Fixes

MistakeFix
'Confusing LSA and TSA'LSA excludes the top and bottom faces. TSA includes ALL faces
'Using diameter instead of radius'ALL cylinder formulas use RADIUS (r). If diameter is given, HALVE it
'Volume of cylinder = 2πrh'That is the CSA formula. Volume = πr²h
'Not converting cm³ to litres correctly'1 litre = 1000 cm³. Divide by 1000 to get litres
'Forgetting units — cm² vs cm³'Area: square units (cm²). Volume: cubic units (cm³)

ICSE Exam Focus (6–8 marks)

  • 2-mark questions: Find LSA/TSA of cube/cuboid given dimensions
  • 3-mark questions: Find volume of cube/cuboid/cylinder
  • 4-mark questions: Find missing dimension given surface area or volume
  • 6-mark questions: Capacity conversion problems with cost
  • 8-mark questions: Composite solids or comparison problems

Self-Test

Q1. Find the TSA of a cube with side 8 cm. A1. TSA = 6 × 8² = 6 × 64 = 384 cm².

Q2. Find the volume of a cuboid with l = 12 cm, b = 8 cm, h = 5 cm. A2. Volume = 12 × 8 × 5 = 480 cm³.

Q3. Find the CSA of a cylinder with radius 7 cm and height 12 cm. (π = 22/7) A3. CSA = 2 × 22/7 × 7 × 12 = 2 × 22 × 12 = 528 cm².

Q4. A water tank is 3 m × 2 m × 1.5 m. Find its capacity in litres. A4. Volume = 3 × 2 × 1.5 = 9 m³. Capacity = 9 × 1000 = 9000 litres.

Q5. The TSA of a cube is 294 cm². Find its side and volume. A5. 6a² = 294 → a² = 49 → a = 7 cm. Volume = 7³ = 343 cm³.

Q6. A cylindrical tank has radius 1.4 m and height 2 m. Find its capacity in litres. (π = 22/7) A6. Volume = 22/7 × 1.4² × 2 = 22/7 × 1.96 × 2 = 22 × 0.28 × 2 = 12.32 m³. Capacity = 12320 litres.

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