## Linear and quadratic graphs
-$$y=mx+c, \quad {x \over a} + {y \over b}=1$$
+### Forms of linear equations
-Parallel lines - $m_1 = m_2$
-Perpendicular lines - $m_1 \times m_2 = -1$
+$y=mx+c$ where $m$ is gradient and $c$ is $y$-intercept
+${x \over a} + {y \over b}=1$ where $m$ is gradient and $(x_1, y_1)$ lies on the graph
+$y-y_1 = m(x-x_1)$ where $(a,0)$ and $(0,b)$ are $x$- and $y$-intercepts
+
+## Line properties
+
+Parallel lines: $m_1 = m_2$
+Perpendicular lines: $m_1 \times m_2 = -1$
+Distance: $\vec{AB} = \sqrt{(x_2 - x_1)^2 + (y_2 - y_1)^2}$
## Cubic graphs
## Quartic graphs
-$$y=ax^4$$
-
-$$=a(x-b)(x-c)(x-d)(x-e)$$
-
-$$=ax^4+cd^2 (c \ge 0)$$
-
-$$=ax^2(x-b)(x-c)$$
-
-$$=a(x-b)^2(x-c)^2$$
-
-$$=a(x-b)(x-c)^3$$
-
-where
-- $x$-intercepts at $x=b,c,d,e$
+### Forms of quadratic equations
+$y=ax^4$
+$y=a(x-b)(x-c)(x-d)(x-e)$
+$y=ax^4+cd^2 (c \ge 0)$
+$y=ax^2(x-b)(x-c)$
+$y=a(x-b)^2(x-c)^2$
+$y=a(x-b)(x-c)^3$
+
+## Literal equations
+
+Equations with multiple pronumerals. Solutions are expressed in terms of pronumerals (parameters)
+
+## Simultaneous equations (linear)
+
+- **Unique solution** - lines intersect at point
+- **Infinitely many solutions** - lines are equal
+- **No solution** - lines are parallel
+
+### Solving $\begin{cases}px + qy = a \\ rx + sy = b\end{cases}$ for one, infinite and no solutions
+
+where all coefficients are known except for one, and $a, b$ are known
+
+1. Write as matrices: $\begin{bmatrix}p & q \\ r & s \end{bmatrix}
+ \begin{bmatrix} x \\ y \end{bmatrix}
+ =
+ \begin{bmatrix} a \\ b \end{bmatrix}$
+2. Find determinant of first matrix: $\Delta = ps-qr$
+3. Let $\Delta = 0$ for number of solutions $\ne 1$
+ or let $\Delta \ne 0$ for one unique solution.
+4. Solve determinant equation to find variable
+ - *--- for infinite/no solutions: ---*
+5. Substitute variable into both original equations
+6. Rearrange equations so that LHS of each is the same
+7. If $\text{RHS}(1) = \text{RHS}(2)$, lines are coincident (infinite solutions)
+ If $\text{RHS}(1) \ne \text{RHS}(2)$, lines are parallel (no solutions)
+
+Or use Matrix -> `det` on CAS.
+
+### Solving $\begin{cases}a_1 x + b_1 y + c_1 z = d_1 \\
+a_2 x + b_2 y + c_2 z = d_2 \\
+a_3 x + b_3 y + c_3 z = d_3\end{cases}$
+
+- Use elimination
+- Generate two new equations with only two variables
+- Rearrange & solve
+- Substitute one variable into another equation to find another variable
+- etc.
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