Solve using substitution $$ \begin{array}{l}-10 x+9 y=-10 \ x=10\end{array} $$

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Solve the system of equations $$ -10x+9y=-10;x=10 $$.
Solve the system of equations by following steps:
- step0: Solve using the substitution method:
  $$\left\{ \begin{array}{l}-10x+9y=-10\x=10\end{array}ight.$$
- step1: Substitute the value of $$x:$$
  $$-10	imes 10+9y=-10$$
- step2: Simplify:
  $$-100+9y=-10$$
- step3: Move the constant to the right side:
  $$9y=-10+100$$
- step4: Add the numbers:
  $$9y=90$$
- step5: Divide both sides:
  $$\frac{9y}{9}=\frac{90}{9}$$
- step6: Divide the numbers:
  $$y=10$$
- step7: Calculate:
  $$\left\{ \begin{array}{l}x=10\y=10\end{array}ight.$$
- step8: Check the solution:
  $$\left\{ \begin{array}{l}x=10\y=10\end{array}ight.$$
- step9: Rewrite:
  $$\left(x,yight) = \left(10,10ight)$$
The solution to the system of equations using substitution is $$ (x, y) = (10, 10) $$.
$$ (x, y) = (10, 10) $$

Solve using substitution \[ \begin{array}{l}-10 x+9 y=-10 \\ x=10\end{array} \]

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