450 Trigonometric functions
to an interval containing none of these points, we can use the funda-
mental formulaf [u(x)]-'u'(x) dx = log lu(x)I + cto obtain(8.23) tan x dx = -
J
1 (- sin x) dx log 1cos xj -r- c
cos x=logjsecx1+c.
In most applications of this formula, jxj < it/2, so cos x > 0 and the
absolute-value signs can be omitted. For cot x, a miniature graph of
which appears in Figure 8.232, we suppose that x is confined to an inter-
val containing none of the points x = nar and obtain(8.231)
Jcot x dx =J
1 cos x dx = log sin xj + c.
sin xIn most applications of this formula, 0 < x < 7r, so sin x > 0 and the
absolute-value signs can be omitted.Figure 8.232yFigure 8.233xy0Figure 8.234A sketch of the graph of y = sec x is most easily obtained by sketching
a graph of y = cos x and estimating reciprocals. As the graph in Figure
8.233 indicates, sec x is undefined when x is an odd integer multiple of
it/2. When we integrate sec x over an interval, we must suppose that
the interval contains none of these points. We can then obtain the
formula(8.235) fS!_5dx
=fsecx--Itan x(sect x + sec x tan x) dx= log (sec x + tan xj + c
provided we happen to know that the result is obtained by multiplying