for which eqation is the order of steps to first divide both sides by 6 and then add 8 to both sides
The equation for which the order of steps is first dividing both sides by 6 and then adding 8 to both sides is:
6x - 8 = 16
The equation that requires dividing both sides by 6 first and then adding 8 to both sides is:
ax/6 + b = c
To determine the equation where the order of steps requires dividing both sides by 6 first, and then adding 8 to both sides, we need to consider a generic equation and follow the given steps.
Let's consider an example equation: 6x - 3 = 12.
1. Start with the equation: 6x - 3 = 12.
2. Divide both sides of the equation by 6: (6x - 3) / 6 = 12 / 6.
This simplifies to: x - (3/6) = 2.
3. Next, simplify the equation by dividing 3 by 6: x - (1/2) = 2.
4. Finally, add 8 to both sides of the equation: x - (1/2) + 8 = 2 + 8.
This yields: x + (8 - 1/2) = 10.
Thus, the equation where the order of steps requires dividing both sides by 6 first and then adding 8 to both sides is:
x + (8 - 1/2) = 10.