Answer:
AI-generated answer
To find the value of m/1, we need to solve the system of equations:
m/2 = 3x + 12
m/1 = 5x - 6
To eliminate the fractions, we can multiply both sides of each equation by their respective denominators.
For the first equation, multiply both sides by 2 to eliminate the fraction:
2 * (m/2) = 2 * (3x + 12)
m = 6x + 24
For the second equation, multiply both sides by 1 (which is the same as not multiplying at all):
1 * (m/1) = 1 * (5x - 6)
m = 5x - 6
Since both expressions equal m, we can set them equal to each other:
6x + 24 = 5x - 6
Now, solve for x:
6x - 5x = -6 - 24
x = -30
Finally, substitute the value of x into either equation to find m:
m = 5x - 6
m = 5(-30) - 6
m = -150 - 6
m = -156
Therefore, the value of m/1 is -156.
The correct answer is option D: -156.
Explanation: