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Perimeter, Area, and Volume

CSEC Mathematics: Measurement

Essential Understanding: Measurement is fundamental to mathematics and everyday life. Whether you’re fencing a yard, painting a room, or filling a container, you need to understand perimeter (distance around), area (surface covered), and volume (space occupied).

Perimeter: Distance around

Area: Surface covered (units²)

Volume: Space inside (units³)

Understanding the Concepts

Perimeter

The total distance around the outside of a 2D shape.

Units: Linear (cm, m, km)

Think: Walking around the edge of a field

Area

The amount of surface a 2D shape covers.

Units: Square (cm², m², km²)

Think: Painting a wall or laying carpet

Volume

The amount of space inside a 3D solid.

Units: Cubic (cm³, m³, litres)

Think: Water filling a container

Perimeter of 2D Shapes

The perimeter is found by adding all the sides of a shape.

Rectangle

\( P = 2(l + w) \) or \( P = 2l + 2w \)

Square

\( P = 4s \)

Triangle

\( P = a + b + c \)

Circle (Circumference)

\( C = 2\pi r \) or \( C = \pi d \)

Area of 2D Shapes

Interactive Area Calculator

Length: 120

Width: 80

Perimeter: 400 units

Area: 9,600 square units

Area Formulas Reference

Shape	Diagram	Area Formula
Rectangle		\( A = l \times w \)
Square		\( A = s^2 \)
Triangle		\( A = \frac{1}{2} \times b \times h \)
Parallelogram		\( A = b \times h \)
Trapezium		\( A = \frac{1}{2}(a + b) \times h \)
Circle		\( A = \pi r^2 \)
Sector		\( A = \frac{\theta}{360} \times \pi r^2 \)

Circle: Arc Length and Sector Area

Interactive Sector Visualizer

Radius: 70

Angle (θ): 90°

Arc Length

109.96 units

\(\frac{\theta}{360} \times 2\pi r\)

Sector Area

3,848.45 units²

\(\frac{\theta}{360} \times \pi r^2\)

Arc Length and Sector Area

                    Arc Length:

                    \[ l = \frac{\theta}{360} \times 2\pi r \]

                    Sector Area:

                    \[ A = \frac{\theta}{360} \times \pi r^2 \]

Where \(\theta\) is the angle at the centre in degrees.

Worked Example: Sector

Problem: A sector has radius 14 cm and angle 60°. Find: (a) the arc length (b) the area of the sector. Use \(\pi = \frac{22}{7}\).

Arc Length: \[ l = \frac{\theta}{360} \times 2\pi r = \frac{60}{360} \times 2 \times \frac{22}{7} \times 14 \] \[ l = \frac{1}{6} \times 2 \times \frac{22}{7} \times 14 = \frac{1}{6} \times 88 = \frac{44}{3} = 14\frac{2}{3} \text{ cm} \]

Sector Area: \[ A = \frac{\theta}{360} \times \pi r^2 = \frac{60}{360} \times \frac{22}{7} \times 14^2 \] \[ A = \frac{1}{6} \times \frac{22}{7} \times 196 = \frac{1}{6} \times 616 = \frac{308}{3} = 102\frac{2}{3} \text{ cm}^2 \]

Surface Area of 3D Solids

The surface area is the total area of all the faces (outer surfaces) of a 3D solid.

Cube

\( SA = 6s^2 \)

Cuboid

\( SA = 2(lw + lh + wh) \)

Cylinder

\( SA = 2\pi r^2 + 2\pi rh \)

Cone

\( SA = \pi r^2 + \pi rl \)

Sphere

\( SA = 4\pi r^2 \)

Square Pyramid

\( SA = b^2 + 2bl \)

Volume of 3D Solids

3D Volume Visualizer

Cube

\( V = s^3 \)

Example: If s = 5 cm, V = 125 cm³

Volume Formulas Reference

Solid	Volume Formula	Description
Cube	\( V = s^3 \)	Side cubed
Cuboid	\( V = l \times w \times h \)	Length × Width × Height
Prism	\( V = A_{base} \times h \)	Base area × Height
Cylinder	\( V = \pi r^2 h \)	Circle area × Height
Cone	\( V = \frac{1}{3}\pi r^2 h \)	⅓ × Cylinder volume
Pyramid	\( V = \frac{1}{3} \times A_{base} \times h \)	⅓ × Base area × Height
Sphere	\( V = \frac{4}{3}\pi r^3 \)	Four-thirds π r cubed

Volume Memory Tips

Prisms & Cylinders: \( V = \text{Base Area} \times \text{Height} \) (Think: stacking the base shape)
Cones & Pyramids: \( V = \frac{1}{3} \times \text{Base Area} \times \text{Height} \) (One-third of corresponding prism/cylinder)
Sphere: \( V = \frac{4}{3}\pi r^3 \) (Remember: “four-thirds pi r cubed”)

Worked Example: Cylinder

Problem: A cylindrical tank has radius 7 m and height 10 m. Calculate: (a) the volume (b) the curved surface area (c) the total surface area. Use \(\pi = \frac{22}{7}\).

Volume: \[ V = \pi r^2 h = \frac{22}{7} \times 7^2 \times 10 = \frac{22}{7} \times 49 \times 10 = 22 \times 70 = 1540 \text{ m}^3 \]

Curved Surface Area: \[ CSA = 2\pi rh = 2 \times \frac{22}{7} \times 7 \times 10 = 2 \times 22 \times 10 = 440 \text{ m}^2 \]

Total Surface Area: \[ TSA = 2\pi r^2 + 2\pi rh = 2 \times \frac{22}{7} \times 49 + 440 = 308 + 440 = 748 \text{ m}^2 \]

Worked Example: Sphere

Problem: A sphere has radius 21 cm. Find: (a) its surface area (b) its volume. Use \(\pi = \frac{22}{7}\).

Surface Area: \[ SA = 4\pi r^2 = 4 \times \frac{22}{7} \times 21^2 = 4 \times \frac{22}{7} \times 441 = 4 \times 22 \times 63 = 5544 \text{ cm}^2 \]

Volume: \[ V = \frac{4}{3}\pi r^3 = \frac{4}{3} \times \frac{22}{7} \times 21^3 = \frac{4}{3} \times \frac{22}{7} \times 9261 \] \[ V = \frac{4 \times 22 \times 9261}{3 \times 7} = \frac{815016}{21} = 38808 \text{ cm}^3 \]

Compound Shapes

Compound shapes are made up of two or more basic shapes. To find the area or volume:

Divide the compound shape into basic shapes
Calculate the area/volume of each part
Add or subtract as needed

Worked Example: Compound Shape

Problem: Find the area of the L-shaped figure below.

Divide into rectangles:
Rectangle A (top): 10 cm × 6 cm
Rectangle B (bottom): 5 cm × 16 cm

Calculate each area:
Area A = 10 × 6 = 60 cm²
Area B = 5 × 16 = 80 cm²

Add together:
Total Area = 60 + 80 = 140 cm²

Past Paper Style Questions

CSEC-Style Question 1

A rectangular swimming pool is 25 m long and 10 m wide. The depth is 1.5 m at the shallow end and 3 m at the deep end.

(a) Calculate the area of the trapezoidal cross-section. [2 marks]

(b) Calculate the volume of water needed to fill the pool. [2 marks]

(c) If 1 m³ = 1000 litres, how many litres of water are needed? [1 mark]

Solutions:

(a) Cross-section is a trapezium with parallel sides 1.5 m and 3 m, width 10 m:

\( A = \frac{1}{2}(a + b) \times h = \frac{1}{2}(1.5 + 3) \times 10 = \frac{1}{2} \times 4.5 \times 10 = 22.5 \text{ m}^2 \)

(b) Volume = Cross-section area × Length = 22.5 × 25 = 562.5 m³

(c) 562.5 × 1000 = 562,500 litres

CSEC-Style Question 2

A sector of a circle has radius 12 cm and angle 150°. Calculate:

(a) the length of the arc [2 marks]

(b) the area of the sector [2 marks]

(c) the perimeter of the sector [2 marks]

Use \(\pi = 3.14\).

Solutions:

(a) Arc length: \( l = \frac{150}{360} \times 2 \times 3.14 \times 12 = \frac{150}{360} \times 75.36 = 31.4 \text{ cm} \)

(b) Sector area: \( A = \frac{150}{360} \times 3.14 \times 12^2 = \frac{150}{360} \times 452.16 = 188.4 \text{ cm}^2 \)

(c) Perimeter = arc + 2 radii = 31.4 + 12 + 12 = 55.4 cm

CSEC Practice Arena

Test Your Understanding

A rectangle has length 12 cm and width 5 cm. What is its perimeter?

60 cm

34 cm

17 cm

24 cm

Solution: P = 2(l + w) = 2(12 + 5) = 2 × 17 = 34 cm

What is the area of a circle with radius 7 cm? (Use \(\pi = \frac{22}{7}\))

44 cm²

49 cm²

154 cm²

308 cm²

Solution: A = πr² = (22/7) × 7² = (22/7) × 49 = 22 × 7 = 154 cm²

What is the volume of a cube with side 4 cm?

16 cm³

48 cm³

64 cm³

96 cm³

Solution: V = s³ = 4³ = 4 × 4 × 4 = 64 cm³

The surface area of a sphere is given by which formula?

\( 2\pi r^2 \)

\( 4\pi r^2 \)

\( \frac{4}{3}\pi r^3 \)

\( \pi r^2 h \)

Solution: The surface area of a sphere is SA = 4πr². Note: (4/3)πr³ is the volume formula.

A cone has the same base and height as a cylinder. The volume of the cone is:

Half the cylinder

One-third the cylinder

One-quarter the cylinder

Equal to the cylinder

Solution: Cone volume = (1/3)πr²h, Cylinder volume = πr²h. The cone is exactly one-third of the cylinder.

Target

CSEC Examination Tips

Units matter: Area uses square units (cm², m²), Volume uses cubic units (cm³, m³)
Show formulas: Always write the formula before substituting values
Use given π: Use the value of π given in the question (usually 22/7 or 3.14)
Sector questions: Remember the fraction \(\frac{\theta}{360}\) appears in both arc length and sector area formulas
Compound shapes: Break them into basic shapes, calculate separately, then add/subtract
3D solids: Draw and label diagrams to visualize the problem
Check reasonableness: Does your answer make sense? Volume should be positive and appropriately sized

Summary: Essential Formulas

2D Shapes

Rectangle: P = 2(l+w), A = lw
Circle: C = 2πr, A = πr²
Triangle: A = ½bh
Trapezium: A = ½(a+b)h

Circle Parts

Arc: l = (θ/360) × 2πr
Sector: A = (θ/360) × πr²

3D Solids

Cylinder: V = πr²h
Cone: V = ⅓πr²h
Sphere: V = (4/3)πr³, SA = 4πr²