Final answer:
Both equations, 3 - x = 4 and 12 = 9 - 3x, yield the same solution x = -1 when solved separately. This is because the equations are related by multiplication by -3, which allows any solution of one equation to also be a solution of the other, demonstrating the universal rules of algebra.
Step-by-step explanation:
To demonstrate why a solution to the equation 3 - x = 4 must also be a solution to the equation 12 = 9 - 3x, let's solve both equations and observe their relationship.
First, let's solve the equation 3 - x = 4:
- Subtract 3 from both sides to isolate the variable x on one side: 3 - x - 3 = 4 - 3, which simplifies to -x = 1.
- Multiply both sides by -1 to get x = -1.
Now, let's solve 12 = 9 - 3x:
- Subtract 9 from both sides: 12 - 9 = 9 - 9 - 3x, which simplifies to 3 = -3x.
- Divide both sides by -3 to solve for x: 3 / (-3) = (-3x) / (-3), which simplifies to x = -1.
As we can see, both equations yield the same solution, x = -1. This happens because the operations we perform to isolate x in both cases are based on the fundamental rules of algebra that apply universally. These rules include operations such as adding or subtracting the same value from both sides of an equation and multiplying or dividing both sides of an equation by a non-zero number. The equations 3 - x = 4 and 12 = 9 - 3x are related by multiplication by -3, which transforms one into the other, ensuring that any solution for one equation must also satisfy the other.