Linear Equations in Linear Algebra. Linear Models in Economics and Engineering



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1 941-20 Abdullayev Artur 1-7

SYSTEMS OF LINEAR EQUATIONS

A linear equation in the variables is an equation that can be written in the form

(1)

where b and the coefficients are real or complex numbers, usually known in advance. The subscript n may be any positive integer. In textbook examples and exercises, n is normally between 2 and 5. In real-life problems, n might be 50 or 5000, or even larger.

The equations

and

are both linear because they can be rearranged algebraically as in equation (1):



and

are not linear because of the presence of in the first equation and in the second.

A system of linear equations (or a linear system) is a collection of one or more linear equations involving the same variables—say, . An exa is

(2)


    1. Systems of Linear Equations 3

A solution of the system is a list of numbers that makes each equation a true statement when the values are substituted for , respectively. For instance, is a solution of system (2) because, when these values are substituted in (2) for , respectively, the equations simplify to 8=8 and 7=7.

The set of all possible solutions is called the solution set of the linear system. Two linear systems are called equivalent if they have the same solution set. That is, each solution of the first system is a solution of the second system, and each solution of the second system is a solution of the first.

Finding the solution set of a system of two linear equations in two variables is easy because it amounts to finding the intersection of two lines. A typical problem is

The graphs of these equations are lines, which we denote by and . A pair of numbers satisfies both equations in the system if and only if the point lies on both and . In the system above, the solution is the single point , as you can easily verify. See Figure 1.









2



3






FIGURE 1 Exactly one solution.

on. Of course, two lines need not intersect in a single point—they could be parallel, or they could coincide and hence “intersect” at every point on the line. Figure 2 shows the graphs that correspond to the following systems:



  1. (b)







2



3






FIGURE 2. (a) No solution. (b) Infinitely many solutions.

Figures 1 and 2 illustrate the following general fact about linear systems, to be

verified in Section 1.2.


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