CHAPTER 12. HYPERBOLIC FUNCTIONS ANDGRAPHS 12.2
The y-intercept is calculated as follows:
y =a
x + p
+ q (12.1)yint =
a
0 + p+ q (12.2)=
a
p
+ q (12.3)For example, the y-intercept of g(x) =x^2 +1+ 2 is given by setting x = 0 to get:
y =2
x + 1+ 2
yint =2
0 + 1
+ 2
=
2
1
+ 2
= 2 + 2
= 4
The x-intercepts are calculated by setting y = 0 as follows:
y =a
x + p
+ q (12.4)0 =
a
xint+ p+ q (12.5)
a
xint+ p
=−q (12.6)a =−q(xint+ p) (12.7)
xint+ p =
a
−q(12.8)
xint =
a
−q− p (12.9)For example, the x-intercept of g(x) =x+1^2 + 2 is given by setting x = 0 to get:
y =2
x + 1+ 2
0 =
2
xint+ 1+ 2
−2 =
2
xint+ 1
−2(xint+ 1) = 2xint+ 1 =2
− 2
xint =− 1 − 1
xint =− 2Exercise 12 - 2
- Given: h(x) =x+4^1 − 2. Determine the coordinates of the intercepts of h with the x- and y-axes.
- Determine the x-intercept of the graph of y =^5 x+2. Give the reason why there is no y-intercept
for this function.