IB Math AI HL - Distance & midpoint in 3D | Free Notes

Extending to 3D: In 3D space, points have three coordinates (x, y, z).

The distance formula gains one extra term inside the square root — one for each axis.

[Diagram: math-coord-distance] - Available in full study mode

Worked example — distance in 3D

Find the distance between A(1, 0, 2) and B(4, 3, 6).

Step by step

Write the general 3D distance formula. It is the straight-line gap between two points, found by squaring the difference along each axis, adding, then taking the square root.
Substitute A(1, 0, 2) and B(4, 3, 6).
Work out each squared difference and add.
Take the square root.

Final answer

Distance AB ≈ 5.83 units (3 s.f.).

Where 3D distance appears in IB: IB questions often place a solid in a coordinate grid. You may be asked for the length of a space diagonal — the distance between two opposite corners of a cuboid.

Average all three coordinates: The midpoint in 3D works exactly like 2D — just average the z-coordinates as well as the x and y.

Worked example — midpoint in 3D

Find the midpoint of A(2, −1, 4) and B(6, 3, 10).

Step by step

Write the general 3D midpoint formula. The midpoint is the average of the two points, taken one coordinate at a time.
Substitute A(2, −1, 4) and B(6, 3, 10).
Simplify each coordinate.

Final answer

Midpoint M = (4, 1, 7).

Add then halve: Add the two coordinates and divide by 2 — never subtract (that gives a gap, not the middle). Given the midpoint and one end, the other end is B = 2M − A.

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Put a solid on a grid: A length inside a solid is just a 3D distance. Put one corner at the origin, read off the opposite corner, and apply the formula.

[Diagram: math-coord-distance] - Available in full study mode

Worked example — space diagonal of a cuboid

A cuboid has length 6 cm, width 4 cm, and height 3 cm.

Find the length of the space diagonal (corner to opposite corner).

Step by step

Write the general 3D distance formula. The space diagonal joins two opposite corners, so it is the distance between them.
Place one corner at A(0, 0, 0) and the opposite corner at B(6, 4, 3), then substitute.
Square each edge and add.
Round to 3 s.f.

Final answer

The space diagonal is √61 ≈ 7.81 cm.

Common mistake: Square each difference separately. A frequent error is √(6+4+3) = √13 instead of √(36+16+9) = √61.

Extending to 3D: In 3D space, points have three coordinates (x, y, z).

The distance formula gains one extra term inside the square root — one for each axis.

[Diagram: math-coord-distance] - Available in full study mode

Worked example — distance in 3D

Find the distance between A(1, 0, 2) and B(4, 3, 6).

Step by step

Write the general 3D distance formula. It is the straight-line gap between two points, found by squaring the difference along each axis, adding, then taking the square root.
Substitute A(1, 0, 2) and B(4, 3, 6).
Work out each squared difference and add.
Take the square root.

Final answer

Distance AB ≈ 5.83 units (3 s.f.).

Where 3D distance appears in IB: IB questions often place a solid in a coordinate grid. You may be asked for the length of a space diagonal — the distance between two opposite corners of a cuboid.

Average all three coordinates: The midpoint in 3D works exactly like 2D — just average the z-coordinates as well as the x and y.

Worked example — midpoint in 3D

Find the midpoint of A(2, −1, 4) and B(6, 3, 10).

Step by step

Write the general 3D midpoint formula. The midpoint is the average of the two points, taken one coordinate at a time.
Substitute A(2, −1, 4) and B(6, 3, 10).
Simplify each coordinate.

Final answer

Midpoint M = (4, 1, 7).

Add then halve: Add the two coordinates and divide by 2 — never subtract (that gives a gap, not the middle). Given the midpoint and one end, the other end is B = 2M − A.

Feeling unprepared for exams?

Get a clear study plan, practice with real questions, and know exactly where you stand before exam day. No more guessing.

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Put a solid on a grid: A length inside a solid is just a 3D distance. Put one corner at the origin, read off the opposite corner, and apply the formula.

[Diagram: math-coord-distance] - Available in full study mode

Worked example — space diagonal of a cuboid

A cuboid has length 6 cm, width 4 cm, and height 3 cm.

Find the length of the space diagonal (corner to opposite corner).

Step by step

Write the general 3D distance formula. The space diagonal joins two opposite corners, so it is the distance between them.
Place one corner at A(0, 0, 0) and the opposite corner at B(6, 4, 3), then substitute.
Square each edge and add.
Round to 3 s.f.

Final answer

The space diagonal is √61 ≈ 7.81 cm.

Common mistake: Square each difference separately. A frequent error is √(6+4+3) = √13 instead of √(36+16+9) = √61.

Distance & midpoint in 3D

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Distance & midpoint in 3D

Study like the top scorers do

Feeling unprepared for exams?

Try an IB Exam Question — Free AI Feedback

Related Math AI HL Topics

4 exam-style questions ready for you