Answer:
In this equation, the value of x is equal to 6.
Step-by-step explanation:
We are given an algebraic equation in which we need to solve for x.
We can use several properties and algebraic methods to solve this equation.
[tex]\displaystyle -6(x - 3) + x + 3 = -9[/tex]
Firstly, we want to use the distributive property to evaluate the first term in the equation: -6(x - 3).
[tex]-6(x - 3) + x + 3 = -9\\\\-6x + 18 + x + 3 = -9[/tex]
By distributing the -6 through, we get -6x and positive 18. Then, we need to begin combining like terms. Let's start with our constants (or the terms without a variable).
[tex]-6x + 18 + x + 3 = -9\\\\18 + 3 = 21\\\\-6x + x + 21 = -9[/tex]
Then, we can combine our terms with variables.
[tex]-6x + x + 21 = -9\\\\-6x + x = -5x\\\\-5x + 21 = -9[/tex]
Now, we can use the subtraction property of equality which states that if we subtract a term from one side of an equation, we must also subtract it from the opposite side. Therefore, we want to get x by itself, so we can subtract 21 from both sides using the subtraction property of equality to do this.
[tex]-5x + 21 = -9\\\\-5x + 21 - 21 = -9 -21\\\\-5x = -30[/tex]
Finally, we can use the division property of equality and divide both sides of the equation by -5 to isolate x.
[tex]\displaystyle -5x = -30\\\\\frac{-5x}{-5} = \frac{-30}{-5}\\\\x = 6[/tex]
Therefore, by solving the multi-step equation, we solved that x = 6.
