y
0 AD x
B
C
ab
l 2 l 1
Figure 7.9Gradients of perpendicular lines multiply to−1.
On the other hand the gradient ofl 2 is
−
BD
CD
=−
1
tanβ
=−
1
tanθ
=−
1
m
Solution to review question 7.1.5
A.Any line parallel toy= 1 − 3 xhas the same gradient,m=−3and
so can be written as
y=− 3 x+c
We now have to choose the interceptcso that the line passes through
(−1, 2), which we do by substituting these values in the equation:
2 =− 3 (− 1 )+c
So
c=−1 and the equation required is
y=− 3 x− 1
B. If the linel through (−1, 2), (0, 4) has gradientmthen any line
perpendicular to it has gradient− 1 /m. The gradient oflis
m=
4 − 2
0 −(− 1 )
= 2
so any line perpendicular to it has gradient−^12 and has an equation of
the form
y=−^12 x+c
If this line passes through (−1, 2) then substituting this point in the
equation gives
2 =−^12 (− 1 )+c