To solve the equation 8/9(x + 32/3), we can distribute the 8/9 to the terms inside the parentheses:
8/9(x + 32/3) = (8/9)(x) + (8/9)(32/3)
= (8/9)x + (256/27)
Thus, the solution of the equation is (8/9)x + (256/27).
8/9(x + 32/3) = (8/9)(x) + (8/9)(32/3)
= (8/9)x + (256/27)
Thus, the solution of the equation is (8/9)x + (256/27).
1. Start by distributing the 8/9 to both terms in the parentheses:
(8/9) * x + (8/9) * (32/3)
2. Simplify the multiplication:
(8/9) * x + (256/27)
3. If you need a numerical solution, you can further simplify or approximate the fraction. Otherwise, you can leave it in fraction form.
So, the solution of the equation 8/9(x + 32/3) is (8/9)x + (256/27).
First, distribute the 8/9 to both terms inside the parentheses:
8/9(x + 32/3) = (8/9)(x) + (8/9)(32/3)
Now simplify each term:
(8/9)(x) equals (8/9)x, and (8/9)(32/3) equals (256/27)
Substituting these back into the equation, we have:
(8/9)x + (256/27)
This is the simplified equation. However, to solve for x, we need to set the equation equal to zero. Since no constant term is given in the original equation, we can ignore setting it equal to zero in this case.
So, the solution to the equation 8/9(x + 32/3) is simply:
(8/9)x + (256/27)