Detailed definition
Understanding Vectors
Vectors combine magnitude with direction in one object. A vector has both magnitude and direction. In geometric pictures, a vector is usually shown as a directed line segment or arrow whose length represents size and whose arrowhead shows direction.
Unlike an ordinary segment, a free vector is not tied to one fixed position. If you slide it without changing its length or direction, it still represents the same vector. That is why vectors are so useful in coordinate geometry and mechanics.
Vector thinking also prepares students for component form, addition, subtraction, and scalar multiplication. The picture on the page is not separate from the notation; it is the geometric meaning behind the notation.
Key facts
Important ideas to remember
- A vector has both magnitude and direction.
- A vector is determined by magnitude and direction, not by where it is placed on the page.
- Vectors are commonly represented by arrows and can also be written by components in coordinate form.
- Sliding a vector without changing its size or direction produces an equivalent geometric vector.
Where it is used
Where vectors shows up
- Use vectors to represent displacement, velocity, force, and other directed quantities in science and engineering.
- Use them in analytic geometry to describe motion, translation, and coordinate changes.
- Use vector notation in higher mathematics when combining geometric direction with algebraic calculation.
Common mistakes
What to watch out for
- Do not confuse a vector with a segment that is fixed at one location.
- Do not ignore direction; two arrows with the same length but opposite directions are different vectors.
- Do not mix the components with the magnitude, because they describe the vector in different ways.