Whenever a system of inequalities is given, normally we will get a collection of points that satisfy all the inequalities in the system.
Option A is wrong because a single point cannot be a solution for all inequalities of a system. Normally an interval would be there.
Option B is right.
Option C is wrong since a single point has to satisfy at least one. There cannot be a solution for the full system unless it satisfies all inequalities.
Option D is wrong because satisfying at least one inequality is not sufficient, and satisfying all inequalities is a must.
I believe the correct answer from the choices listed above is option B. The solution to a system of inequalities is <span>a collection of points that satisfy all inequalities in the system. It will always be a number of points that will agree with the inequality.</span>
The triangles would be congruent, because the lines GH and FI are congruent and the angle H and I are the same, and since the line HI is shared by the two, it would then be SAS.
