2.2 Lineare Gleichungen

Example 1

1. Solve the equation x+3=7.
   
   Subtract 3 from both sides

   x+3−3=7−3.

   The left-hand side then simplifies to x , and we get

   x=7−3=4.

2. Solve the equation 3x=6.
   
   Divide both sides by 3

   33x=36.

   After having cancelled 3 on the left-hand side, we have

   x=36=2.

3. Solve the equation 2x+1=5.
   
   First we subtract 1 from both sides to get 2x on its own on the left-hand side

   2x=5−1.
   

   Then we divide both sides by 2 and get the answer

   x=24=2.

Example 2

Solve the equation2x−3=5x+7.

Since x occurs on both the left- and right-hand sides we subtract 2x from both sides Vorlage:Displayed math and now x only appears on the right-hand side Vorlage:Displayed math Now we subtract 7 from both sides Vorlage:Displayed math and get 3x on its own on the right-hand side Vorlage:Displayed math The last step is to divide both sides by 3 Vorlage:Displayed math and this gives that Vorlage:Displayed math

Example 3

Solve for x in the equation ax+7=3x−b.

By subtracting 3x from both sides Vorlage:Displayed math Vorlage:Displayed math and then subtract 7 Vorlage:Displayed math Vorlage:Displayed math We have gathered together all the terms that contain x on the left-hand side and all other terms on the right-hand side. Since the terms on the left-hand side have x as a common factor x can be factored out Vorlage:Displayed math Divide both sides with a−3 giving Vorlage:Displayed math

Example 4

Solve the equation (x−3)2+3x2=(2x+7)2.

Expand the quadratic expressions on both sides Vorlage:Displayed math Vorlage:Displayed math Subtract 4x2 from both sides Vorlage:Displayed math Add 6x to both sides Vorlage:Displayed math Subtract 49 from both sides Vorlage:Displayed math Divide both sides by 34 Vorlage:Displayed math

Example 5

Solve the equation  x+2x2+x=32+3x.

Collect both terms to one side Vorlage:Displayed math Convert the terms so that they have the same denominator Vorlage:Displayed math and simplify the numerator Vorlage:Displayed math Vorlage:Displayed math Vorlage:Displayed math This equation only is satisfied when the numerator is equal to zero (whilst the denominator is not equal to zero); Vorlage:Displayed math which gives that x=−54.

Example 6

1. Sketch the line y=2x−1.
   
   Comparing with the standard equation y=kx+m we see that k=2 and m=−1. This means that the line's slope is 2 and that it cuts the y-axis at (0−1). See the figure below to the left.
2. Sketch the line y=2−21x.
   
   The equation of the line can be written as y=−21x+2 , and then we see that its slope is k=−21and that m=2. See the figure below to the right.

Example 7

What is the slope of the straight line that passes through the points (21) and (53)?

If we plot the points and draw the line in a coordinate system, we see that 5−2=3 steps in the x-direction corresponds to 3−1=2 steps in the y-direction along the line. This means that 1 step in the x-direction corresponds to k=5−23−1=32 steps in the y-direction. So the line's slope is k=32.

Example 8

1. The lines y=3x−1 and y=3x+5 are parallel.
2. The lines y=x+1 and y=2−x are perpendicular.

Example 9

1. Put the line y=5x+7 into the form ax+by=c.
   
   Move the x-term to the left-hand side: −5x+y=7.
2. Put the line 2x+3y=−1 into the form y=kx+m.
   
   Move the x-term to the right-hand side 3y=−2x−1and divide both sides by 3 Vorlage:Displayed math

Example 10

1. Sketch the region in the xy-plane that satisfies y2.
   
   The region is given by all the points (xy) for which the y-coordinate is equal or greater than 2 that is all points on or above the line y=2.
   

   

2. Sketch the region in the xy-plane that satisfies yx.
   
   A point (xy) that satisfies the inequality yx must have an x-coordinate that is larger than its y-coordinate. Thus the area consists of all the points to the right of the line y=x.
   

   

   The fact that the line y=x is dashed means that the points on the line do not belong to the coloured area.

Example 11

Sketch the region in the xy-plane that satisfies 23x+2y4.

The double inequality can be divided into two inequalities

Vorlage:Displayed math

We move the x-terms into the right-hand side and divide both sides by 2 giving

Vorlage:Displayed math

The points that satisfy the first inequality are on and above the line y1−23x while the points that satisfy the other inequality are on or below the line y2−23x.

The figure on the left shows the region 3x+2y2  and figure to the right shows the region 3x+2y4 .

Points that satisfy both inequalities form a band-like region where both coloured areas overlap.

The figure shows the region 23x+2y4 .

Example 12

If we draw the lines y=x, y=−x and y=2 then these lines bound a triangle in a coordinate system.

We find that for a point to lie in this triangle, it has to satisfy certain conditions.

We see that its y-coordinate must be less than 2. At the same time, we see that the triangle is bounded by y=0 below. Thus the y coordinates must be in the range 0y2.

For the x-coordinate, the situation is a little more complicated. We see that the x-coordinate must satisfy the fact that all points lie above the lines y=−x and y=x. We see that this is satisfied if −yxy. Since we already have restricted the y-coordinates, we see that x cannot be larger than 2 or less than −2.

Thus the base of the triangle is 4 units of length and the height 2 units of length.

The area of this triangle is therefore 422=4 units of area.