Answer :
First we have to find midpoint of R and S.
We can use formula such for it.[tex]Qx= \frac{Rx+Sx}{2}[/tex] and [tex]Qy= \frac{Ry+Sy}{2}[/tex].
We obtained coordinates of point Q
[tex]Qx= \frac{-3+5}{2}=1[/tex] and [tex]Qy= \frac{5+11}{2}=8 [/tex]
Now, we can find the line equation using formula y=ax+b.
We can substitute coordinates of P and Q to this formula and solving system of equation get the answer.
After substituting we obtaind such system
[tex]\left \{ {{20=7a+b } \atop {8=a+b}} \right. [/tex]
From the system of equation we obtain result
[tex] \left \{ {{a=2} \atop {b=6}} \right. [/tex]
Now we can put our resuts to general line equation.
[tex]y=2x+6[/tex]
We can use formula such for it.[tex]Qx= \frac{Rx+Sx}{2}[/tex] and [tex]Qy= \frac{Ry+Sy}{2}[/tex].
We obtained coordinates of point Q
[tex]Qx= \frac{-3+5}{2}=1[/tex] and [tex]Qy= \frac{5+11}{2}=8 [/tex]
Now, we can find the line equation using formula y=ax+b.
We can substitute coordinates of P and Q to this formula and solving system of equation get the answer.
After substituting we obtaind such system
[tex]\left \{ {{20=7a+b } \atop {8=a+b}} \right. [/tex]
From the system of equation we obtain result
[tex] \left \{ {{a=2} \atop {b=6}} \right. [/tex]
Now we can put our resuts to general line equation.
[tex]y=2x+6[/tex]
[tex] R (-3,5), \ \ \ S (5,11) \ midpoint \ of \ R \ and \ S \\ \\ Midpoint \ Formula \\\\(x,y)= \left ( \frac{x_{1}+x_{2}}{2},\frac {{}y_{1}+y_{2}}{2} \right ) \\ \\Q= \left ( \frac {-3+5}{2},\frac { 5+11}{2} \right ) \\ \\Q= \left ( \frac {2}{2},\frac { 16}{2} \right ) \\ \\Q= \left ( 1 ,8) \right )[/tex]
[tex] the \ equation \ of \ the \ line \ that \ passes \ through \ P(7,20) \ and \ Q (1,8)\\\\First \ find \ the \ slope \ of \ the \ line \ thru \ the \ points \: \\ \\ m= \frac{y_{2}-y_{1}}{x_{2}-x_{1} } \\ \\m=\frac{ 8-20}{1-7 } =\frac{-12}{-6}=2\\\\the \ slope \ intercept \ form \ is : \\ \\ y= mx +b \\\\20=2\cdot 7+b \\\\20=14+b\\\\b=20-14\\b=6\\\\y=2x+6[/tex]
[tex] the \ equation \ of \ the \ line \ that \ passes \ through \ P(7,20) \ and \ Q (1,8)\\\\First \ find \ the \ slope \ of \ the \ line \ thru \ the \ points \: \\ \\ m= \frac{y_{2}-y_{1}}{x_{2}-x_{1} } \\ \\m=\frac{ 8-20}{1-7 } =\frac{-12}{-6}=2\\\\the \ slope \ intercept \ form \ is : \\ \\ y= mx +b \\\\20=2\cdot 7+b \\\\20=14+b\\\\b=20-14\\b=6\\\\y=2x+6[/tex]