Solve for the unknown variables, using Cramer's rule \( \begin{array}{l}2 x+z=4+y \\ 3 x+6 y=21-9 z \\ -2 z+3 y-x=-5\end{array} \)

Solve the system of equations \( 2x+z=4+y;3x+6y=21-9z;-2z+3y-x=-5 \). Solve the system of equations by following steps: - step0: Solve using the substitution method: \(\left\{ \begin{array}{l}2x+z=4+y\\3x+6y=21-9z\\-2z+3y-x=-5\end{array}\right.\) - step1: Solve the equation: \(\left\{ \begin{array}{l}z=4+y-2x\\3x+6y=21-9z\\-2z+3y-x=-5\end{array}\right.\) - step2: Substitute the value of \(z:\) \(\left\{ \begin{array}{l}3x+6y=21-9\left(4+y-2x\right)\\-2\left(4+y-2x\right)+3y-x=-5\end{array}\right.\) - step3: Simplify: \(\left\{ \begin{array}{l}3x+6y=-15-9y+18x\\-8+y+3x=-5\end{array}\right.\) - step4: Solve the equation: \(\left\{ \begin{array}{l}3x+6y=-15-9y+18x\\y=3-3x\end{array}\right.\) - step5: Substitute the value of \(y:\) \(3x+6\left(3-3x\right)=-15-9\left(3-3x\right)+18x\) - step6: Simplify: \(-15x+18=-42+45x\) - step7: Move the expression to the left side: \(-15x-45x=-42-18\) - step8: Add and subtract: \(-60x=-42-18\) - step9: Add and subtract: \(-60x=-60\) - step10: Change the signs: \(60x=60\) - step11: Divide both sides: \(\frac{60x}{60}=\frac{60}{60}\) - step12: Divide the numbers: \(x=1\) - step13: Substitute the value of \(x:\) \(y=3-3\times 1\) - step14: Substitute back: \(y=3-3\) - step15: Calculate: \(y=0\) - step16: Substitute the values of \(y,x:\) \(z=4+0-2\times 1\) - step17: Substitute back: \(z=4-2\) - step18: Calculate: \(z=2\) - step19: Calculate: \(\left\{ \begin{array}{l}x=1\\y=0\\z=2\end{array}\right.\) - step20: Check the solution: \(\left\{ \begin{array}{l}x=1\\y=0\\z=2\end{array}\right.\) - step21: Rewrite: \(\left(x,y,z\right) = \left(1,0,2\right)\) The solution to the system of equations is \( x = 1, y = 0, z = 2 \).