In an inconsistent system, the equations represent two parallel lines that have the same slope and different y-intercepts. In other words, the lines coincide, so the equations represent the same line and every point on the line represents a coordinate pair that satisfies the system.Īnother type of system of linear equations is an inconsistent system, which is when there are no points common to both lines and, hence, there is no solution to the system, like in the second example we explored. A system of equations is dependent if the equations have the same slope and the same y-intercepts. A consistent system is considered to be a dependent system if there are an infinite number of solutions, like in the third example we explored. The two lines have different slopes and intersect at one point in the plane. A consistent system is considered to be an independent system if it has a single solution like the first example we explored. A consistent system of equations has at least one solution. The system \begin has an infinite number of solutions.īecause the number of solutions that a system of equations has is so important, we actually have special categories of systems of linear equations based upon the number of solutions a system has. So every point on that line is a solution for the system of equations. The two equations graph as the same line. No Solution: When the lines that make up a system are parallel, there are no solutions because the two lines share no points in common.
Infinite Solutions: Sometimes the two equations will graph as the same line, in which case we have an infinite number of solutions.One Solution: When a system of equations intersects at an ordered pair, the system has one solution.If the graphs of the equations are the same, then there are an infinite number of solutions that are true for both equations. If the graphs of the equations do not intersect (for example, if they are parallel), then there are no solutions that are true for both equations. If the graphs of the equations intersect, then there is one solution that is true for both equations. Each shows two lines that make up a system of equations. The graphs of equations within a system can tell you how many solutions exist for that system. Recall that the solution for a system of equations is the value or values that are true for all equations in the system. There are three possible outcomes for solutions to systems of linear equations. Three possible outcomes for solutions to systems of equations What happens if the lines never cross, as in the case of parallel lines? How would you describe the solutions to that kind of system? In this section, we will explore the three possible outcomes for solutions to a system of linear equations. As we saw in the last section, if you have a system of linear equations that intersect at one point, this point is a solution to the system. There are an infinite number of solutions. Recall that a linear equation graphs as a line, which indicates that all of the points on the line are solutions to that linear equation. Use a graph to classify solutions to systems Two lines that do not intersect each other or are parallel in the graph are considered having no solution. Even so, this does not guarantee a unique solution. inconsistent system of linear equations Definition.
In order for a linear system to have a unique solution, there must be at least as many equations as there are variables. The graph of linear equations will be coincident lines.Some linear systems may not have a solution and others may have an infinite number of solutions.
This means there are infinitely many solutions for the given pair of linear equations. In this case, the pair of linear equations is dependent and consistent. The graph of linear equations will be two parallel lines.
This means there is no solution for the given pair of linear equations. In this case, the pair of linear equations is inconsistent. The graph of the linear equations would be two intersecting lines. This means there is unique solution for the given pair of linear equations. In this case, the pair of linear equations is consistent. If a pair of linear equations is given by a 1x + b 1y + c 1 = 0 and a 2x + b 2y + c 2 = 0 then following situations can arise.
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