Geometric definition in $\mathbb{R}^3$

Intermediate Mathematics
Created by Best · 01.06.2026 at 06:20 UTC

The cross product $\mathbf{a}\times\mathbf{b}$ in $\mathbb{R}^3$ is a vector perpendicular to both $\mathbf{a}$ and $\mathbf{b}$, with magnitude equal to the area of the parallelogram they span. Orientation follows the right-hand rule: curl fingers from $\mathbf{a}$ toward $\mathbf{b}$; the thumb points along $\mathbf{a}\times\mathbf{b}$ .

Magnitude satisfies $\|\mathbf{a}\times\mathbf{b}\|=\|\mathbf{a}\|\|\mathbf{b}\|\sin\theta$ because sine captures the height of the parallelogram relative to the base. Unlike the dot product, the output is a vector, not a scalar.

Compare with the dot product, which uses cosine and returns a scalar measuring alignment. Cross and dot together form the backbone of vector calculus in three dimensions: one detects parallel components, the other builds a perpendicular direction tied to area.

Anticommutativity $\mathbf{a}\times\mathbf{b}=-\mathbf{b}\times\mathbf{a}$ flips the normal direction while keeping the same area. Self-cross vanishes: $\mathbf{a}\times\mathbf{a}=\mathbf{0}$ since the parallelogram collapses.

Volume of the parallelepiped from $\mathbf{a},\mathbf{b},\mathbf{c}$ uses the scalar triple product: $\lvert\mathbf{c}\cdot(\mathbf{a}\times\mathbf{b})\rvert$. That connects cross products to signed volume in three dimensions.

Memorize the right-hand rule with a physical gesture: it links order of inputs to the direction of the output normal. Reversing inputs reverses the normal, matching anticommutativity.

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Question 1

Why does $\|\mathbf{a}\times\mathbf{b}\| = \|\mathbf{a}\|\,\|\mathbf{b}\|\sin\theta$ use $\sin\theta$?

Hint

Skim the paragraphs on use in Geometric definition in before choosing. Eliminate options that contradict a definition stated in the card.

Question 2

The anticommutativity $\mathbf{a}\times\mathbf{b} = -\mathbf{b}\times\mathbf{a}$ means swapping the inputs flips:

Hint

Skim the paragraphs on anticommutativity means swapping inputs flips in Geometric definition in before choosing. Eliminate options that contradict a definition stated in the card.

Question 3

The cross product $\mathbf{a}\times\mathbf{a}$ equals:

Hint

Skim the paragraphs on cross product equals in Geometric definition in before choosing. Eliminate options that contradict a definition stated in the card.

Question 4

The volume of the parallelepiped spanned by $\mathbf{a},\mathbf{b},\mathbf{c}$ is given by:

Hint

Skim the paragraphs on volume parallelepiped spanned given in Geometric definition in before choosing. Eliminate options that contradict a definition stated in the card.

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  • Topic: Mathematics
  • Difficulty: Intermediate
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