Answer:
[tex]d=3\sqrt{2}\ units[/tex]
Step-by-step explanation:
The complete question is
Line L contains points (3, 5) and (7, 9). Points P has coordinates (2, 10). Find the distance from P to L
step 1
Find the equation of the line L contains points (3,5) and (7,9)
Find the slope
The formula to calculate the slope between two points is equal to
[tex]m=\frac{y2-y1}{x2-x1}[/tex]
substitute the given values
[tex]m=\frac{9-5}{7-3}[/tex]
[tex]m=\frac{4}{4}=1[/tex]
Find the equation of the line in point slope form
[tex]y-y1=m(x-x1)[/tex]
we have
[tex]m=1\\point\ (3,5)[/tex]
substitute
[tex]y-5=(1)(x-3)[/tex]
isolate the variable y
[tex]y=x-3+5[/tex]
[tex]y=x+2[/tex] -----> equation A
step 2
Find the equation of the perpendicular line to the given line L that passes through the point P
Remember that
If two lines are perpendicular, then their slopes are opposite reciprocal
so
The slope of the given line L is [tex]m=1[/tex]
The slope of the line perpendicular to the given line L is
[tex]m=-1[/tex]
Find the equation of the line in point slope form
[tex]y-y1=m(x-x1)[/tex]
we have
[tex]m=-1\\point\ (2,10)[/tex]
substitute
[tex]y-10=-(x-2)[/tex]
isolate the variable y
[tex]y=-x+2+10[/tex]
[tex]y=-x+12[/tex] ----> equation B
step 3
Find the intersection point equation A and equation B
[tex]y=x+2[/tex] -----> equation A
[tex]y=-x+12[/tex] ----> equation B
solve the system by graphing
The intersection point is (5.7)
see the attached figure
step 4
we know that
The distance from point P to the the line L is equal to the distance between the point P and point (5,7)
the formula to calculate the distance between two points is equal to
[tex]d=\sqrt{(y2-y1)^{2}+(x2-x1)^{2}}[/tex]
we have
(2,10) and (5,7)
substitute
[tex]d=\sqrt{(7-10)^{2}+(5-2)^{2}}[/tex]
[tex]d=\sqrt{(-3)^{2}+(3)^{2}}[/tex]
[tex]d=\sqrt{18}\ units[/tex]
simplify
[tex]d=3\sqrt{2}\ units[/tex]
see the attached figure to better understand the problem
