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

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

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

\(\begin{cases}a+b=-4 \\ 2a-3b=2\end{cases}\) \(\begin{vmatrix}3 \\ 1\end{vmatrix}\) geeft \(\begin{cases}3a+3b=-12 \\ 2a-3b=2\end{cases}\)

Optellen geeft \(5a=-10\text{,}\) dus \(a=-2\text{.}\)

\(\begin{rcases}a+b=-4 \\ a=-2\end{rcases}\begin{matrix}-2+b=-4 \\ b=-2\end{matrix}\)

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

\(\begin{cases}3a-5b=-3 \\ 2a-3b=-5\end{cases}\) \(\begin{vmatrix}3 \\ 5\end{vmatrix}\) geeft \(\begin{cases}9a-15b=-9 \\ 10a-15b=-25\end{cases}\)

Aftrekken geeft \(-a=16\text{,}\) dus \(a=-16\text{.}\)

\(\begin{rcases}3a-5b=-3 \\ a=-16\end{rcases}\begin{matrix}3⋅-16-5b=-3 \\ -5b=45 \\ b=-9\end{matrix}\)

De oplossing is \((a, b)=(-16, -9)\text{.}\)

Gelijk stellen geeft \(6x+20=2x+8\)

\(4x=-12\) dus \(x=-3\)

\(\begin{rcases}y=6x+20 \\ x=-3\end{rcases}\begin{matrix}y=6⋅-3+20 \\ y=2\end{matrix}\)

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

Substitutie geeft \(7(6y+1)+2y=-37\)

Haakjes wegwerken geeft
\(42y+7+2y=-37\)
\(44y=-44\)
\(y=-1\)

\(\begin{rcases}x=6y+1 \\ y=-1\end{rcases}\begin{matrix}x=6⋅-1+1 \\ x=-5\end{matrix}\)

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

Substitutie geeft \(p=6(9p+37)-10\)

Haakjes wegwerken geeft
\(p=54p+222-10\)
\(-53p=212\)
\(p=-4\)

\(\begin{rcases}q=9p+37 \\ p=-4\end{rcases}\begin{matrix}q=9⋅-4+37 \\ q=1\end{matrix}\)

De oplossing is \((p, q)=(-4, 1)\text{.}\)