Answer:
Answer is A
Step-by-step explanation:
» Consider two points plotted on the line;
» General equation of a line has an expression in format of;
[tex]{ \rm{y = mx + c}}[/tex]
- m is the slope
- c is the y-intercept
» Finding the slope [m] :
[tex]{ \rm{slope = \frac{y_{2} - y _{1}}{x _{2} - x _{1} } }} \\ [/tex]
• But remember from the points or coordinates we fetched out of the graph;
- [tex] { \tt{y_{2} = - 2}} \: \mid \: { \tt{y_{1} = 0}} \\ { \tt{x_{2} =0 }} \: \mid \: { \tt{x_{1} = 3}}[/tex]
Therefore, lets feed in the formular:
[tex]{ \tt{m = \frac{ {}^{ - } 2 - 0}{0 - 3} = \frac{ - 2}{ - 3} }} \\ \\ { \boxed{ \tt{m = \frac{2}{3} }}}[/tex]
» Finding y-intercept [c] :
☑ REMEMBER: y = mx + c
• Consider point (0, -2)
[tex]{ \tt{y = mx + c}} \\ { \tt{ - 2 = ( \frac{2}{3} \times 0) + c}} \\ \\ { \boxed{ \tt{ \: c = - 2 \: }}}[/tex]
» Arrange the equation:
Equation is y = ⅔x - 2
