Final answer:
To express x in terms of o and y from the equation 23x - 32y = o, isolate x to obtain x = (32y + o) / 23, which is a linear combination of y and o.
Step-by-step explanation:
To express x in terms of o and y from the given equation 23x - 32y = o, we need to isolate x on one side. Here are the steps to do so:
- Start with the given equation: 23x - 32y = o.
- Add 32y to both sides of the equation to get 23x = 32y + o.
- Divide both sides by 23 to solve for x, which gives x = (32y + o) / 23.
This equation expresses x in terms of o and y, showing that x is a linear combination of y and o.