Final answer:
The solution set cannot be determined from the given information due to an inconsistency in the provided equations and the lack of an explicit inequality statement.
Step-by-step explanation:
To find which values are included in the solution set of the given inequality, we can check the provided options against the inequality statement. The inequality is not explicitly stated, but we have expressions that provide a way to solve for the current I₁. According to the given equations, when I₁ is added with seven times the value of -5 A (from the combination of the equations), we get I₁ = 3.00 A. Using this I₁ value, we can deduce the other currents (I₂ and I₃) by substituting back into the provided equations.
Given the equations:
- I₂ = 6 - 2I₁
- I₃ = 22.5 - 3I₁
- I₁ = I₂ + I₃
Substituting I₁ into the equations for I₂ and I₃:
- I₂ = 6 - 2(3.00 A) = 6 - 6 = 0 A
- I₃ = 22.5 - 3(3.00 A) = 22.5 - 9 = 13.5 A
Adding these values according to the third equation:
I₁ = 0 A + 13.5 A = 13.5 A, which contradicts the initial assumption (I₁ = 3 A). Therefore, the initial inequality or conditions seem to have an inconsistency or there may be an error in the provided information. Without the correct inequality or additional context, we cannot determine the correct solution.