Back to all Math AA topics
Topic 3.18Math AA HL16 flashcards

Lines & planes (HL only)

Practice Flashcards

Flip cards to reveal answers
Card 1 of 163.18.1
3.18.1
Question

How do you find where a line meets a plane?

Click to reveal answer

Track your progress — Sign up free to save your progress and get smart review reminders based on spaced repetition.

All Flashcards in Topic 3.18

Below are all 16 flashcards for this topic. Sign up free to track your progress and get personalized review schedules.

3.18.18 cards

Card 1concept
Question

How do you find where a line meets a plane?

Answer

Write the line's x, y, z in terms of λ, substitute into the plane's Cartesian equation, solve the resulting equation for λ, then put λ back into the line for the point.

Card 2concept
Question

After substituting, you solve for λ in which equation?

Answer

The plane's equation becomes one equation in λ; solve that.

Card 3concept
Question

Do you put λ back into the line or the plane to get the point?

Answer

Back into the LINE — that gives the (x, y, z) coordinates of the intersection.

Card 4concept
Question

What does it mean if substitution gives a false statement like 2 = 5?

Answer

The line is parallel to the plane and never meets it (no intersection).

Card 5concept
Question

What does it mean if substitution gives 0 = 0 (always true)?

Answer

Every λ works, so the line lies entirely in the plane.

Card 6concept
Question

When are the λ-terms guaranteed to cancel after substituting?

Answer

When the line's direction d is perpendicular to the plane's normal n, i.e. d·n = 0 (the line skims the plane).

Card 7concept
Question

Line r = (1,0,2)+λ(2,1,−1) and plane x+2y+z=9 — find the point.

Answer

x=1+2λ, y=λ, z=2−λ ⇒ (1+2λ)+2λ+(2−λ)=9 ⇒ 3λ+3=9 ⇒ λ=2 ⇒ (5, 2, 0).

Card 8concept
Question

If d·n = 0 but a point of the line does NOT satisfy the plane, the line is…

Answer

Parallel to the plane and outside it (misses it). If a point DID satisfy it, the line would lie in the plane.

3.18.28 cards

Card 9concept
Question

How do you find the DIRECTION of the line where two planes meet?

Answer

Take the cross product of the two normals: d = n₁ × n₂ (it lies in both planes).

Card 10concept
Question

How do you find a POINT on the line of intersection of two planes?

Answer

Fix one coordinate (often z = 0), then solve the two plane equations as a 2×2 system for the other two coordinates.

Card 11formula
Question

Formula for the angle between two planes?

Answer

cos θ = |n₁·n₂| / (|n₁||n₂|), using the planes' normals (absolute value gives the acute angle).

Card 12formula
Question

Formula for the angle between a line and a plane?

Answer

sin θ = |d·n| / (|d||n|) — SINE, because the angle is measured to the surface (90° from the normal).

Card 13concept
Question

Why does the line–plane angle use SINE but plane–plane uses COSINE?

Answer

The plane's normal is 90° to its surface, so the line-to-surface angle is the complement of the line-to-normal angle, swapping cos for sin.

Card 14concept
Question

Two planes have perpendicular normals (n₁·n₂ = 0). What's the angle between the planes?

Answer

90° — the planes are perpendicular when their normals are.

Card 15concept
Question

Find the line of intersection of x+y+z=6 and x−y+2z=5.

Answer

d = n₁×n₂ = (3,−1,−2); set z=0 ⇒ x=11/2, y=1/2. r = (11/2, 1/2, 0) + λ(3,−1,−2).

Card 16concept
Question

Why take the absolute value of the dot product in these angle formulas?

Answer

To report the ACUTE angle — without it a negative dot product would give the obtuse angle.

Want smart review reminders?

Sign up free to track your progress. Our spaced repetition algorithm will tell you exactly which cards to review and when.

Start Free
IB Math AA HL Topic 3.18 Flashcards | Lines & planes (HL only) | Aimnova | Aimnova