Perpendicular lines

Geometry: Lines

Perpendicular lines

We have already seen that two perpendicular lines make an angle of #90^\circ# or #\frac{\pi}{2}# radians. This gives a relation between the slopes of two perpendicular lines.

Perpendicular Lines

For two lines #\blue k# and #\green l# with slope #a_{\blue k}# and #a_{\green l}# we have:

\[\begin{array}{c} a_{\blue k} \cdot a_{\green l}=-1 \\ \text{ if and only if }\\ \text{line }\blue k \text{ and line } \green l \text{ are perpendicular}\end{array}\]

This means that whenever #a_{\blue k} \cdot a_{\green l}=-1# the lines are perpendicular.

And also that if the lines #\blue k# and #\green l# are perpendicular then #a_{\blue k} \cdot a_{\green l}=-1#.

Given a line #k# and a point #P# we can use this to determine a line #l# perpendicular to #k# that passes through #P#.

Determining Perpendicular Line

	Step-by-step	Example
	We determine the line #\green l# perpendicular to a line #\blue k# that passes through a point #P#.	#\blue k: y=3x+5# #P=\rv{3,2}#
Step 1	Determine the slope of line #\blue k#.	#a_{\blue k}=3#
Step 2	Determine the slope of line #\green l# using the rule #a_{\blue k} \cdot a_{\green l}=-1#.	#a_{\green l}=-\frac{1}{3}#
Step 3	The equation of line #\green l# is of the form \[y=a_{\green l} \cdot x+b\]	#\green l: y=-\frac{1}{3}x+b#
step 4	Determine #b# by substituting the coordinates of point #P# and solving the resulting equation.	#b=3#
step 5	Substitute #b# in the equation from step 3.	#\green l: y=-\frac{1}{3}x+3#

Example graph
In the graph the lines #l# and #k# from the example are displayed. We see that they indeed are perpendicular and that line #l# passes through #P=\rv{3,2}#.

Determine the equation of a line #l# perpendicular to line #k: y={{x}\over{4}}-{{7}\over{8}}# through the point #P=\rv{-2, 4}#.

#l: # #y=-4\cdot x-4#

Step 1	We determine the slope of line #k: y={{x}\over{4}}-{{7}\over{8}}#. This is equal to #{{1}\over{4}}#.
Step 2	We now determine the slope of line #l# with the rule: #a_k \cdot a_l=-1#. This goes as follows: \[\begin{array}{rcl}{{1}\over{4}} \cdot a_l=-1 \\&&\phantom{xxx}\blue{\text{rule perpendicular lines with }a_k={{1}\over{4}}} \\ a_l=\frac{-1}{{{1}\over{4}}} \\&&\phantom{xxx}\blue{\text{both sides divided by }{{1}\over{4}}} \\ a_l=-4 \\&&\phantom{xxx}\blue{\text{simplified}} \end{array}\]
Step 3	Line #l# is of the form: #y=-4 \cdot x+b#.
Step 4	We fill in point #P# to determine #b#. This gives the equation \[4=-4 \cdot -2+b\] We solve this linear equation for #b# and find \[b=-4\].
Stap 5	We fill in the #b# we found in the equation from step #3#. This gives: \[l: y=-4\cdot x-4\]

Remark that if you have written line #l# in a different form that this is also correct, provided that the slope of the line is equal to #-4# and the line goes through the point #P=\rv{-2, 4}#.

New example