To determine which equations have infinite solutions, we typically look for equations that are equivalent or can be expressed in a form that defines an identity (e.g., \(0 = 0\)).
For instance, if you have two equations that simplify to the same line when graphed, they will have infinitely many points (solutions) in common.
Here are some general examples of what we might consider:
- \(2x + 4 = 6\) and \(x + 2 = 3\) — These have a unique solution.
- \(2(x + 3) = 4x + 6\) — This simplifies to \(0 = 0\) after simplifying both sides, indicating it has infinite solutions.
- \(4x - 2 = 2(2x - 1)\) — Simplifying leads to \(0 = 0\), also indicating infinite solutions.
If you could provide a list of specific equations, I can help identify which one has infinite solutions!
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