Grade: Grade 5 Subject: Mathematics Unit: Volume SAT: Geometry+Trigonometry ACT: Math

Composite Volume

Learn to find the volume of complex shapes by breaking them apart or combining simpler shapes!

What is a Composite Shape?

Composite = Made of Parts

A composite shape is made up of two or more simpler shapes joined together. Think of an L-shaped building or a staircase - they're made of rectangles combined!

Real objects aren't always simple rectangles. A house might have an attached garage, a swimming pool might have a diving area, or a building might have wings. To find the volume of these shapes, we break them into simpler parts.

Two Strategies:
  • Addition Method: Break the shape into parts and ADD their volumes
  • Subtraction Method: Start with a larger shape and SUBTRACT the missing piece

Addition Method: Break It Apart

The most common approach is to divide the composite shape into rectangular prisms, find each volume, then add them together.

1 Identify the separate parts

Look for natural divisions where you can split the shape into rectangles.

2 Find the dimensions of each part

Determine the length, width, and height of each rectangular piece.

3 Calculate each volume

Use V = l × w × h for each part.

4 Add the volumes together

Total Volume = Volume A + Volume B + ...

Example: L-Shaped Room
A
B

Part A: 4 ft × 3 ft × 10 ft = 120 ft³

Part B: 6 ft × 3 ft × 10 ft = 180 ft³

Total Volume = 120 + 180 = 300 ft³

Subtraction Method: Remove the Missing Part

Sometimes it's easier to imagine the full rectangle and subtract what's been removed.

1 Imagine the complete shape

Picture what the shape would look like if it were a complete rectangular prism.

2 Calculate the full volume

Find the volume of the complete rectangular prism.

3 Calculate the missing piece

Find the volume of the part that's cut out or missing.

4 Subtract to find the answer

Total Volume = Complete Volume - Missing Volume

Example: Block with a Hole
Cut Out

Outer Block: 10 cm × 8 cm × 6 cm = 480 cm³

Cut Out: 4 cm × 4 cm × 6 cm = 96 cm³

Total Volume = 480 - 96 = 384 cm³

Which Method Should I Use?

Use Addition When...
  • The shape clearly splits into 2-3 parts
  • Parts are different sizes
  • L-shapes, T-shapes, staircases
  • Buildings with wings or extensions
Use Subtraction When...
  • There's a hole or cutout
  • A corner is missing
  • The shape is "almost" a rectangle
  • Only a small piece is removed
Pro Tip: Both methods should give you the same answer! If you're unsure, try both ways and check that your answers match.

Worked Examples

Example 1: T-Shaped Building

A T-shaped building has these dimensions:

  • Top bar: 20 m long, 8 m wide, 12 m tall
  • Stem: 6 m long, 15 m wide, 12 m tall

Solution using Addition:

Volume of top = 20 × 8 × 12 = 1,920 m³

Volume of stem = 6 × 15 × 12 = 1,080 m³

Total = 1,920 + 1,080 = 3,000 m³
Example 2: Pool with Wading Area

A swimming pool is 25 m × 10 m × 3 m deep, but has a shallow wading area (5 m × 10 m × 2 m) cut from one end.

Solution using Subtraction:

Full pool volume = 25 × 10 × 3 = 750 m³

Shallow cutout = 5 × 10 × 2 = 100 m³

Actual pool = 750 - 100 = 650 m³

Note: The wading area is 1 m deep, so we subtract the extra 2 m of depth that would have been there.

Example 3: Staircase

A 3-step staircase where each step is 10 in wide, 8 in deep, and 6 in tall.

Solution:

Step 1 (bottom, tallest): 10 × 8 × 18 = 1,440 in³

Step 2 (middle): 10 × 8 × 12 = 960 in³

Step 3 (top): 10 × 8 × 6 = 480 in³

Total = 1,440 + 960 + 480 = 2,880 in³

Real-World Composite Shapes

🏠
Houses

Main house + garage + additions

🏊
Pools

Deep end + shallow end

📦
Packaging

Boxes with inserts or cutouts

🏢
Buildings

Towers, wings, and lobbies

Composite Volume Calculator

Calculate the volume of two rectangular prisms combined!

Add Two Rectangular Prisms

Prism A (Blue)
Prism B (Green)
Enter dimensions and click "Calculate Total Volume"

Practice Problems

Solve these composite volume problems. Click the correct answer!

Problem 1: L-Shape

An L-shaped prism has two parts:
Part A: 5 × 3 × 4 cm
Part B: 3 × 3 × 4 cm
What is the total volume?

Problem 2: Block with Cutout

A block is 10 × 8 × 5 inches.
A 2 × 2 × 5 inch hole is cut through it.
What volume remains?

Problem 3: Two-Story Building

Ground floor: 20 × 15 × 10 ft
Second floor (smaller): 15 × 15 × 10 ft
What is the building's total volume?

Problem 4: T-Shape

Top of T: 12 × 4 × 6 m
Stem of T: 4 × 8 × 6 m
Total volume?

Problem 5: Corner Cut

A 6 × 6 × 6 cube has a 2 × 2 × 2 cube cut from one corner.
What is the remaining volume?

Problem 6: Word Problem

A shipping container is 12 × 8 × 8 feet.
Inside, there's a 4 × 4 × 8 ft refrigeration unit.
How much space is left for other cargo?

Check Your Understanding

When finding volume of a composite shape, you should:

The subtraction method is best when:

If you solve the same problem with addition and subtraction methods, you should get:

What We Learned

🧩

Composite Shapes

Made of multiple simpler shapes combined

Addition Method

Split into parts, add their volumes

Subtraction Method

Full shape minus missing piece

Check Your Work

Both methods should give the same answer

Key Takeaway: Complex shapes aren't scary! Any composite shape can be broken down into simple rectangular prisms. Choose addition when splitting makes sense, subtraction when there's a hole or cutout.

Next Steps

  • Practice identifying how to split real-world objects
  • Try solving the same problem both ways to check your work
  • Look for composite shapes in buildings and furniture around you
  • Challenge yourself with 3+ part composite shapes!