624 Appendix B 11 Sets and Functions
GRAPHS OF FUNCTIONS f : JR--+ JR
Definition B.2.14 The graph of a function f : A __, B , where A, B <:;::: JR, is
the set of all points (x, y) in the Cartesian (rectangular) coordinate system for
which y = f(x ). That is,
graph(!)= {(x, f(x): x E V(f)}.
Thus, a function f : A __, B , where A , B <:;::: JR,
- must pass the vertical line test:
(a) no vertical line may intersect its graph in more than one point;
(b) every vertical line that intersects the set A on the x-axis also intersects
its graph. - is 1-1 iff it p asses the horizontal line test: no horizontal line may
intersect its graph at more than one point. - is onto B iff every horizontal line t hat intersects B on the y-axis also
intersects its graph.
Vertical
line3y = x^2 , not 1-1,
not onto IR
xFigure B.6yEXERCISE SET B.2y =f(x) =x^3
is 1-1
is onto IR
xl. For each of the following functions f , find (the largest possible subsets of
JR that could be) V(f) and 'R(f), and tell whether or not f is 1-1 and/or
onto R
(a) f ( x) = 2x - 3
(c) f(x ) = J3x - 4
(e) f(x ) = El
x(b) f(x) = lxl - 2
( d) f ( x ) = x^2 + 2x + 4
1
( f ) f ( x) = x 2 + 1