Math Functions Important types of functions and their properties Linear functions - Lines Exercises: Linear functions and line equations

Exercises: Linear functions and line equations

Consider the four points $A (40 | 220)$ , $B (100 | 250)$ , $C (200 | 300)$ , $D (80 | 240)$ .

Draw the points $A$ - $D$ in a suitable coordinate system.
Determine the equation of the line passing through points $A$ - $D$ .
Give three more points that lie on the straight line.

For this task you need the following basic knowledge: Line equation

Coordinate system

Geogebra File: https://assets.serlo.org/legacy/5373_YY7IuAMwyu.xml

Consider $A (40 | 220)$ and $B (100 | 250)$ .

Choose ... from A

$x_{1}$	$=$	$40$
$y_{2}$	$=$	$220$

and ... from B

$x_{2}$	$=$	$100$
$y_{2}$	$=$	$250$

$m = \frac{Δ y}{Δ x} = \frac{y_{2} - y_{1}}{x_{2} - x_{1}} = \frac{250 - 220}{100 - 40} = \frac{30}{60} = 0.5$

Since the points $A$ - $D$ all lie on a common line, it is sufficient to select only two points (for example $A$ and $B$ ). With their help you determine the slope of the line. To do this, subtract the $y$ -coordinate of point $A$ from the $y$ -coordinate of point $B$ , and the $x$ -coordinate of point $A$ from the $x$ -coordinate of point $B$ .

Then determine the $y$ -axis intercept by inserting a point on the straight line (for example C) into the straight line equation $y = m x + t$ and solving for $t$ .

Insert point $C$ into the line equation $y = m x + t$ together with the previously calculated $m = 0.5$ :

$y$	$=$	$0.5 \cdot x + t$
$300$	$=$	$0.5 \cdot 200 + t$
$\Leftrightarrow t$	$=$	$200$

With this we have determined both $m$ and $t$ , so that our line equation is:

$y = 0.5 \cdot x + 200$

Insert any three $x$ -values into the line equation to get the respective $y$ -value, e.g. $x_{1} = 0$ , $x_{2} = - 100$ and $x_{3} = 300$ .

$y$	$=$	$0.5 \cdot x + 200$
$y_{1}$	$=$	$0.5 \cdot x_{1} + 200$
	$=$	$0.5 \cdot 0 + 200 = 200$
$y_{2}$	$=$	$0.5 \cdot x_{2} + 200$
	$=$	$0.5 \cdot (- 100) + 200 = 150$
$y_{3}$	$=$	$0.5 \cdot x_{3} + 200$
	$=$	$0.5 \cdot 300 + 200 = 350$

This gives us the following three points $D$ , $E$ and $F$ :

$D (0 | 200), E (- 100 | 150)$ and $F (300 | 350)$

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