To solve for x in the equation 2/9 - x/72 = 1/12, we can first find a common denominator for the fractions on the left side of the equation. The common denominator between 9, 72, and 12 is 72.
Multiplying each term in the equation by 72 to clear the fractions, we get:
(2/9)72 - x + 72(1/12) = (1/12)*72 16 - x + 6 = 6
Now, simplify the equation by combining like terms:
16 + 6 - x = 6 22 - x = 6
Next, isolate x by subtracting 22 from both sides of the equation:
22 - x - 22 = 6 - 22 -x = -16
Finally, dividing by -1 to solve for x gives:
x = 16
Therefore, the value of x in the equation 2/9 - x/72 = 1/12 is x = 16.
To solve for x in the equation 2/9 - x/72 = 1/12, we can first find a common denominator for the fractions on the left side of the equation. The common denominator between 9, 72, and 12 is 72.
Multiplying each term in the equation by 72 to clear the fractions, we get:
(2/9)72 - x + 72(1/12) = (1/12)*72
16 - x + 6 = 6
Now, simplify the equation by combining like terms:
16 + 6 - x = 6
22 - x = 6
Next, isolate x by subtracting 22 from both sides of the equation:
22 - x - 22 = 6 - 22
-x = -16
Finally, dividing by -1 to solve for x gives:
x = 16
Therefore, the value of x in the equation 2/9 - x/72 = 1/12 is x = 16.