Final answer:
The two important properties of vector addition are the commutative property and the associative property.
Step-by-step explanation:
The two important properties of vector addition are:
- Commutative Property: Vector addition is commutative, which means that the order of adding vectors does not affect the result. For example, if we have vectors A and B, then A + B is equal to B + A. This property can be represented as A + B = B + A.
- Associative Property: Vector addition is associative, which means that the way vectors are grouped when adding them together does not affect the result. For example, if we have vectors A, B, and C, then (A + B) + C is equal to A + (B + C). This property can be represented as (A + B) + C = A + (B + C).