Malha 1

${\displaystyle -6+2(i_{1}-i_{2})+1(i_{1}-i_{3})=0\quad \to \quad -6+2i_{1}-2i_{2}+1i_{1}-2i_{3}=0}$

Malha 2

${\displaystyle 4i_{2}+3(i_{2}-i_{3})+2(i_{2}-i_{1})=0\quad \to \quad 4i_{2}+3i_{2}-3i_{3}+2i_{2}-2i_{1}=0}$

Malha 3

${\displaystyle -12+2i_{3}+1(i_{3}-i_{1})+3(i_{3}-i_{2})=0\quad \to \quad -12+2i_{3}+1i_{3}-1i_{1}+3i_{3}-3i_{2}=0}$

Arrumando...

${\displaystyle 3i_{1}-2i_{2}-i_{3}=6\,}$

${\displaystyle -2i_{1}+9i_{2}-3i_{3}=0\,}$

${\displaystyle -i_{1}-3i_{2}+6i_{3}=12\,}$

${\displaystyle \Delta ={\begin{vmatrix}3&-2&-1\\-2&9&-3\\-1&-3&6\end{vmatrix}}\,.\,{\begin{vmatrix}6\\0\\12\end{vmatrix}}}$

${\displaystyle det\Delta ={\begin{vmatrix}3&-2&-1\\-2&9&-3\\-1&-3&6\end{vmatrix}}\,=\,90}$

${\displaystyle det\Delta \,i_{1}={\begin{vmatrix}6&-2&-1\\0&9&-3\\12&-3&6\end{vmatrix}}\,=450}$

${\displaystyle det\Delta \,i_{2}={\begin{vmatrix}3&6&-1\\-2&0&-3\\-1&12&6\end{vmatrix}}\,=222}$

${\displaystyle det\Delta \,i_{3}={\begin{vmatrix}3&-2&6\\-2&9&0\\-1&-3&12\end{vmatrix}}\,=366}$

${\displaystyle i_{1}={\frac {\Delta \,i_{1}}{\Delta }}\,\qquad i_{1}={\frac {450}{90}}=5A}$

${\displaystyle i_{2}={\frac {\Delta \,i_{2}}{\Delta }}\,\qquad i_{2}={\frac {222}{90}}=2,47A}$

${\displaystyle i_{3}={\frac {\Delta \,i_{3}}{\Delta }}\,\qquad i_{3}={\frac {366}{90}}=4,07A}$

Sabe-se

${\displaystyle i_{3}=6A\,}$

malha 1

${\displaystyle -6+2(i_{1}-i_{2})+1(i_{1}-i_{3})=0\,}$

${\displaystyle -6+2i_{1}-2i_{2}+1_{1}-6=0\,}$

${\displaystyle 3i_{1}-2i_{2}=12\,}$

malha 2

${\displaystyle 4i_{2}+3(i_{2}-i_{3})+2(i_{2}-i_{1})=0\,}$

${\displaystyle 4i_{2}+3i_{2}-18+2i_{2}-2i_{1}=0\,}$

${\displaystyle -2i_{1}+9_{i}2=18\,}$

Resolvendo o sistema (Cramer)

${\displaystyle \Delta ={\begin{vmatrix}3&-2\\-2&9\end{vmatrix}}\,.\,{\begin{vmatrix}12\\18\end{vmatrix}}}$

${\displaystyle \Delta ={\begin{vmatrix}3&-2\\-2&9\end{vmatrix}}\,=27-(4)\qquad \Delta =23}$

${\displaystyle \Delta i_{1}={\begin{vmatrix}12&-2\\18&9\end{vmatrix}}\,=108-(-36)\qquad \Delta i_{1}=144}$

${\displaystyle \Delta i_{2}={\begin{vmatrix}3&12\\-2&18\end{vmatrix}}\,=54-(-24)\qquad \Delta i_{2}=78}$

${\displaystyle i_{1}={\frac {\Delta i_{1}}{\Delta }}={\frac {144}{23}}\qquad i_{1}=6,26A\,}$

${\displaystyle i_{2}={\frac {\Delta i_{2}}{\Delta }}={\frac {78}{23}}\qquad i_{2}=3,39A\,}$

Malha 1

${\displaystyle -26+1ki_{1}+2k(i_{1}-i_{2})+13k(i_{1}-i_{3})=0\,\to \,-26+1ki_{1}+2ki_{1}-2ki_{2}+13ki_{2}-13ki_{3}=0\,\to \,16ki_{1}-2ki_{2}-13ki_{3}=26}$

Malha 2

${\displaystyle 4ki_{2}+5k(i_{2}-i_{3})+2k(i_{2}-i_{1})=0\,\to \,4ki_{2}+5ki_{2}-5ki_{3}+2ki_{2}-2ki_{1}=0\,\to \,-2ki_{1}+11ki_{2}-5ki_{3}=0}$

Malha 3

${\displaystyle 5k(i_{3}-i_{2})+0.5ki_{3}+13k(i_{3}-i_{1})=0\,\to \,5ki_{3}-5ki_{2}+0.5ki_{3}+13ki_{3}-13ki_{1}=0\,\to \,-13ki_{1}-5ki_{2}+18.5ki_{3}=0}$

Organizando

${\displaystyle 16000i_{1}-2000i_{2}-13000i_{3}=26\,}$

${\displaystyle -2000i_{1}+11000i_{2}-5000i_{3}=0\,}$

${\displaystyle -13000i_{1}-5000i_{2}+18500i_{3}=0\,}$

Resolvendo por Cramer

${\displaystyle \Delta ={\begin{vmatrix}16000&-2000&-13000\\-2000&11000&-5000\\-13000&-5000&18500\end{vmatrix}}\,.\,{\begin{vmatrix}26\\0\\0\end{vmatrix}}}$

Resultado confirmado (matlab/calc)

${\displaystyle \Delta =663000000000\,}$

${\displaystyle \Delta i_{1}=4641000000\,}$

${\displaystyle \Delta i_{2}=2652000000\,}$

${\displaystyle \Delta i_{3}=3978000000\,}$

${\displaystyle i_{1}=0,007A\,}$

${\displaystyle i_{2}=0,004A\,}$

${\displaystyle i_{3}=0,006A\,}$

${\displaystyle V_{1k}=7V\,}$

${\displaystyle V_{2k}=6V\,}$

${\displaystyle V_{4k}=16V\,}$

${\displaystyle V_{5k}=-10V\,}$

${\displaystyle V_{13k}=13V\,}$

${\displaystyle V_{500}=3V\,}$

Resposta: i1=-0,1425A, i2=-0,714A

Resposta: i1=-3,06A, i2=0,19A

Resposta: i1=1,445mA, i2=-8,5mA

Resposta: I₃=-63,69mA

Resposta: i₁=0,393A; i₂=0,177A; i₃=0,138A; i_R5=(0,138-0,177)=-0,039A

Resposta: i₁=2,96A; i₂=3A; i₃=4,13A

Resposta: i₁=-2A; i₂=0,785A; i₃=-0,86A; V₀=-1,72V

Resposta: I_x=8,4A (corrigido!)

Resposta: I₁=5A; I₂=7A; I₃=-6A (confirmado!!!)