Aftrekken geeft \(2x=3\text{,}\) dus \(x=1\frac{1}{2}\text{.}\)

\(\begin{rcases}4x-2y=-1 \\ x=1\frac{1}{2}\end{rcases}\begin{matrix}4⋅1\frac{1}{2}-2y=-1 \\ -2y=-7 \\ y=3\frac{1}{2}\end{matrix}\)

De oplossing is \((x, y)=(1\frac{1}{2}, 3\frac{1}{2})\text{.}\)

\(\begin{cases}2a+2b=-6 \\ a+3b=-2\end{cases}\) \(\begin{vmatrix}1 \\ 2\end{vmatrix}\) geeft \(\begin{cases}2a+2b=-6 \\ 2a+6b=-4\end{cases}\)

Aftrekken geeft \(-4b=-2\text{,}\) dus \(b=\frac{1}{2}\text{.}\)

\(\begin{rcases}2a+2b=-6 \\ b=\frac{1}{2}\end{rcases}\begin{matrix}2a+2⋅\frac{1}{2}=-6 \\ 2a=-7 \\ a=-3\frac{1}{2}\end{matrix}\)

De oplossing is \((a, b)=(-3\frac{1}{2}, \frac{1}{2})\text{.}\)

\(\begin{cases}5a+5b=5 \\ 2a-2b=-4\end{cases}\) \(\begin{vmatrix}2 \\ 5\end{vmatrix}\) geeft \(\begin{cases}10a+10b=10 \\ 10a-10b=-20\end{cases}\)

Optellen geeft \(20a=-10\text{,}\) dus \(a=-\frac{1}{2}\text{.}\)

\(\begin{rcases}5a+5b=5 \\ a=-\frac{1}{2}\end{rcases}\begin{matrix}5⋅-\frac{1}{2}+5b=5 \\ 5b=7\frac{1}{2} \\ b=1\frac{1}{2}\end{matrix}\)

De oplossing is \((a, b)=(-\frac{1}{2}, 1\frac{1}{2})\text{.}\)

Gelijk stellen geeft \(8y+36=2y+12\)

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

\(\begin{rcases}x=8y+36 \\ y=-4\end{rcases}\begin{matrix}x=8⋅-4+36 \\ x=4\end{matrix}\)

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

Substitutie geeft \(8x+9(6x-18)=-38\)

Haakjes wegwerken geeft
\(8x+54x-162=-38\)
\(62x=124\)
\(x=2\)

\(\begin{rcases}y=6x-18 \\ x=2\end{rcases}\begin{matrix}y=6⋅2-18 \\ y=-6\end{matrix}\)

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

Substitutie geeft \(q=9(5q-22)+22\)

Haakjes wegwerken geeft
\(q=45q-198+22\)
\(-44q=-176\)
\(q=4\)

\(\begin{rcases}p=5q-22 \\ q=4\end{rcases}\begin{matrix}p=5⋅4-22 \\ p=-2\end{matrix}\)

De oplossing is \((p, q)=(-2, 4)\text{.}\)