1.2 Basic classes of functions  (Page 2/28)

We have shown that the coefficient $a$ is the slope of the line. We can conclude that the formula $f(x)=ax+b$ describes a line with slope $a.$ Furthermore, because this line intersects the $y$ -axis at the point $(0,b),$ we see that the $y$ -intercept for this linear function is $(0,b).$ We conclude that the formula $f(x)=ax+b$ tells us the slope, $a,$ and the $y$ -intercept, $(0,b),$ for this line. Since we often use the symbol $m$ to denote the slope of a line, we can write

to denote the slope-intercept form    of a linear function.

Sometimes it is convenient to express a linear function in different ways. For example, suppose the graph of a linear function passes through the point $(x_1,y_1)$ and the slope of the line is $m.$ Since any other point $(x,f(x))$ on the graph of $f$ must satisfy the equation

this linear function can be expressed by writing

We call this equation the point-slope equation    for that linear function.

Since every nonvertical line is the graph of a linear function, the points on a nonvertical line can be described using the slope-intercept or point-slope equations. However, a vertical line does not represent the graph of a function and cannot be expressed in either of these forms. Instead, a vertical line is described by the equation $x=k$ for some constant $k.$ Since neither the slope-intercept form nor the point-slope form allows for vertical lines, we use the notation

where $a,b$ are both not zero, to denote the standard form of a line .

Finding the slope and equations of lines

Consider the line passing through the points $(11,\mathrm{-4})$ and $(\mathrm{-4},5),$ as shown in [link] .

1. Find the slope of the line.
2. Find an equation for this linear function in point-slope form.
3. Find an equation for this linear function in slope-intercept form.

1. The slope of the line is
   
   $m=\frac{y_2-y_1}{x_2-x_1}=\frac{5-(\mathrm{-4})}{\mathrm{-4}-11}=-\frac{9}{15}=-\frac{3}{5}.$
2. To find an equation for the linear function in point-slope form, use the slope $m=\mathrm{-3}\text{/}5$ and choose any point on the line. If we choose the point $(11,\mathrm{-4}),$ we get the equation
   
   $f(x)+4=-\frac{3}{5}(x-11).$
3. To find an equation for the linear function in slope-intercept form, solve the equation in part b. for $f(x).$ When we do this, we get the equation
   
   $f(x)=-\frac{3}{5}x+\frac{13}{5}.$

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