Aftrekken geeft \(-y=-7\text{,}\) dus \(y=7\text{.}\)

\(\begin{rcases}2x+y=-4 \\ y=7\end{rcases}\begin{matrix}2x+7=-4 \\ 2x=-11 \\ x=-5\frac{1}{2}\end{matrix}\)

De oplossing is \((x, y)=(-5\frac{1}{2}, 7)\text{.}\)

\(\begin{cases}2a+6b=-6 \\ a-b=5\end{cases}\) \(\begin{vmatrix}1 \\ 6\end{vmatrix}\) geeft \(\begin{cases}2a+6b=-6 \\ 6a-6b=30\end{cases}\)

Optellen geeft \(8a=24\text{,}\) dus \(a=3\text{.}\)

\(\begin{rcases}2a+6b=-6 \\ a=3\end{rcases}\begin{matrix}2⋅3+6b=-6 \\ 6b=-12 \\ b=-2\end{matrix}\)

De oplossing is \((a, b)=(3, -2)\text{.}\)

\(\begin{cases}6p-6q=3 \\ 5p-4q=-5\end{cases}\) \(\begin{vmatrix}2 \\ 3\end{vmatrix}\) geeft \(\begin{cases}12p-12q=6 \\ 15p-12q=-15\end{cases}\)

Aftrekken geeft \(-3p=21\text{,}\) dus \(p=-7\text{.}\)

\(\begin{rcases}6p-6q=3 \\ p=-7\end{rcases}\begin{matrix}6⋅-7-6q=3 \\ -6q=45 \\ q=-7\frac{1}{2}\end{matrix}\)

De oplossing is \((p, q)=(-7, -7\frac{1}{2})\text{.}\)

Gelijk stellen geeft \(9x+33=3x+9\)

\(6x=-24\) dus \(x=-4\)

\(\begin{rcases}y=9x+33 \\ x=-4\end{rcases}\begin{matrix}y=9⋅-4+33 \\ y=-3\end{matrix}\)

De oplossing is \((x, y)=(-4, -3)\text{.}\)

Substitutie geeft \(8(2b-14)+5b=-28\)

Haakjes wegwerken geeft
\(16b-112+5b=-28\)
\(21b=84\)
\(b=4\)

\(\begin{rcases}a=2b-14 \\ b=4\end{rcases}\begin{matrix}a=2⋅4-14 \\ a=-6\end{matrix}\)

De oplossing is \((a, b)=(-6, 4)\text{.}\)

Substitutie geeft \(y=9(5y-16)+56\)

Haakjes wegwerken geeft
\(y=45y-144+56\)
\(-44y=-88\)
\(y=2\)

\(\begin{rcases}x=5y-16 \\ y=2\end{rcases}\begin{matrix}x=5⋅2-16 \\ x=-6\end{matrix}\)

De oplossing is \((x, y)=(-6, 2)\text{.}\)