notes/education/math/MATH1060 (trig)/Vectors.md

A vector is a mathematical concept that denotes direction and magnitude. They're often notated using an arrow ($\vec{v}$), or with a bold, lowercase letter. (**v**).


Vectors are often denoted as a matrix with two rows: $\begin{bmatrix}1 \\2\end{bmatrix}$

# Magnitude
The magnitude of a vector is $|\vec{v}| = \sqrt{a^2 + b^2}$

# Direction
The direction of a vector is $\theta = \tan^-1(\frac{b}{a})$.

# Addition
To find $\vec{u} + \vec{v}$, we can put one vector on the end of another vector. The resulting vector will share the same tail as the first vector, and the same head as the second vector.

# Scalar Multiplication
A **scalar** is just a real number. Scalar multiplication is multiplying a vector with a real number. This will scale or shrink a vector, but does not change the direction it points at.

We do not multiply two vectors together.
# Unit Vector
A vector with a magnitude of 1 is a **unit vector**.

If $\vec{v}$ is a nonzero vector, the unit vector can be found using the equation $\vec{u} = \dfrac{1}{|\vec{v}|}\vec{v}$ . In other words, to find a unit vector, divide the vector by its magnitude.

# $i$, $j$ Notation
Every 2
vault backup: 2024-11-25 09:51:37 2024-11-25 16:51:37 +00:00			`A vector is a mathematical concept that denotes direction and magnitude. They're often notated using an arrow ($\vec{v}$), or with a bold, lowercase letter. (v).`
sync 2024-11-25 16:43:43 +00:00

vault backup: 2024-11-25 09:51:37 2024-11-25 16:51:37 +00:00			`Vectors are often denoted as a matrix with two rows: $\begin{bmatrix}1 \\2\end{bmatrix}$`
vault backup: 2024-11-25 09:46:37 2024-11-25 16:46:37 +00:00
			`# Magnitude`
vault backup: 2024-11-25 09:51:37 2024-11-25 16:51:37 +00:00			`The magnitude of a vector is $\|\vec{v}\| = \sqrt{a^2 + b^2}$`
vault backup: 2024-11-25 09:56:37 2024-11-25 16:56:37 +00:00
vault backup: 2024-11-25 09:46:37 2024-11-25 16:46:37 +00:00			`# Direction`
vault backup: 2024-11-25 09:51:37 2024-11-25 16:51:37 +00:00			`The direction of a vector is $\theta = \tan^-1(\frac{b}{a})$.`
vault backup: 2024-11-25 09:56:37 2024-11-25 16:56:37 +00:00
			`# Addition`
			`To find $\vec{u} + \vec{v}$, we can put one vector on the end of another vector. The resulting vector will share the same tail as the first vector, and the same head as the second vector.`

			`# Scalar Multiplication`
vault backup: 2024-11-25 10:01:37 2024-11-25 17:01:37 +00:00			`A scalar is just a real number. Scalar multiplication is multiplying a vector with a real number. This will scale or shrink a vector, but does not change the direction it points at.`
vault backup: 2024-11-25 09:56:37 2024-11-25 16:56:37 +00:00
vault backup: 2024-11-25 10:01:37 2024-11-25 17:01:37 +00:00			`We do not multiply two vectors together.`
			`# Unit Vector`
			`A vector with a magnitude of 1 is a unit vector.`

			`If $\vec{v}$ is a nonzero vector, the unit vector can be found using the equation $\vec{u} = \dfrac{1}{\|\vec{v}\|}\vec{v}$ . In other words, to find a unit vector, divide the vector by its magnitude.`

			`# $i$, $j$ Notation`
			`Every 2`