How do you solve x/4+9=x/2-4?

1 Answer
smendyka
Mar 4, 2018

See a solution process below:

Explanation:

First, multiply each side of the equation by color(red)(4) to eliminate the fractions. color(red)(4) is used because it is the Lowest Common Denominator for both fractions:

color(red)(4)(x/4 + 9) = color(red)(4)(x/2 - 4)

(color(red)(4) xx x/4) + (color(red)(4) xx 9) = (color(red)(4) xx x/2) - (color(red)(4) xx 4)

(color(red)(4)x)/4 + 36 = (color(red)(4)x)/2) - 16

color(red)(4)/4x + 36 = color(red)(4)/2x - 16

1x + 36 = 2x - 16

Now, Subtract color(red)(1x) and add color(blue)(16) to each side of the equation to solve for x while keeping the equation balanced:

1x - color(red)(1x) + 36 + color(blue)(16) = 2x - color(red)(1x) - 16 + color(blue)(16)

0 + 52 = (2 - color(red)(1))x - 0

52 = 1x

52 = x

x = 52

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