The solution the given system of inequalities y<-x+1
y≤ 2x-3 is option no. C.
What is system of inequalities?
- Similar to solving a system of linear equations, addressing a system of linear inequalities does not need the discovery of an intersection point (or intersections).
- Instead, the area that matches every one of the linear inequalities will be the solution set.
- The graphical method covered in earlier parts is the most effective way to resolve a system of linear inequalities.
These steps will be used to graphically solve a set of linear inequalities:
- Find y's inequality solution.
- Represent the inequality as little more than a linear equation and, according on the inequality sign, graph the line with either a solid line or a dashed line.
- Draw the line as a dashed line if the inequality symbol is missing an equals sign ( or >).
- Make a distinction as a solid line if the inequalities sign contains an equals sign (or ).
- Darken the area when the inequality is satisfied.
- For every disparity, repeat steps 1 through 3.
- The region where all of the inequalities intersect will be the solution set.
The solution the given system of inequalities y<-x+1
y≤ 2x-3 is option no. C.
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