Let {A, B, C, D, E, F, G} be a set of points and the following triples be “lines”: ABC, AGF, AED, BGD, CGE, CED, and EBE Determine if the statements in problem are true or false in this seven-point geometry. If a statement is true, prove that it is true.
If any three lines are not concurrent (that is, do not all share the same point), there is exactly one point that is not on any of the three lines.
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