First, multiply each side of the equation by color(red)(15)15 to eliminate the fractions and keep the equation balanced:
color(red)(15)(x - 2/5) = color(red)(15) xx -8/1515(x−25)=15×−815
(color(red)(15) xx x) - (color(red)(15) xx 2/5) = cancel(color(red)(15)) xx -8/color(red)(cancel(color(black)(15)))
15x - (cancel(color(red)(15)) 3 xx 2/color(red)(cancel(color(black)(5)))) = -8
15x - 6 = -8
Next, add color(red)(6) to each side of the equation to isolate the x term while keeping the equation balanced:
15x - 6 + color(red)(6) = -8 + color(red)(6)
15x - 0 = -2
15x = -2
Now, divide each side of the equation by color(red)(15) to solve for x while keeping the equation balanced:
(15x)/color(red)(15) = -2/color(red)(15)
(color(red)(cancel(color(black)(15)))x)/cancel(color(red)(15)) = -2/15
x = -2/15
To validate the solution we need to substitute color(red)(-2/15) back into the original equation for color(red)(x) and calculate the left side of the equation to ensure it equals -8/15:
color(red)(x) - 2/5 = -8/15 becomes:
color(red)(-2/15) - 2/5 = -8/15
color(red)(-2/15) - (3/3 xx 2/5) = -8/15
color(red)(-2/15) - 6/15 = -8/15
-8/15 = -8/15 therefore we have checked our solution.
