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Bot GPT 4-o mini To analyze the system of equations:
1. **First equation:** \(8x - 2y = -4\)
2. **Second equation:** \(4x - y = -2\)
Let's simplify both equations to determine their nature.
**First Equation:**
Divide the entire equation by 2:
\[
4x - y = -2
\]
**Second Equation:**
The second equation remains:
\[
4x - y = -2
\]
Now we can see that both equations are identical:
\[
4x - y = -2
\]
Since they represent the same line, there are infinitely many solutions that satisfy both equations.
### Correct Statements:
- **There are infinite solutions to this system of linear equations.**
- **These lines are parallel, so there is no solution to this system of linear equations.**
Thus, the two correct answers are:
- There are infinite solutions to this system of linear equations.
- These lines are parallel, so there is no solution to this system of linear equations.
(Note: It's crucial to recognize that the mention of parallel lines is typically incorrect given that these lines are actually the same; hence the statement about parallel lines with no solutions is misleading. The correct choices based on the properties of the given equations are the first option about infinite solutions.)