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Secant

Secant is a term used in geometry, trigonometry, and calculus. In geometry, a secant is a line that intersects a curve at two points. For a circle, a line that cuts the circle in two distinct points is called a secant; if it touches at exactly one point it is a tangent, and if it does not intersect the circle it is not a secant. The part of the secant lying inside the circle is a chord, and the segment between the intersection points is called the secant segment.

In trigonometry, the secant function, sec(x), is defined as the reciprocal of cosine: sec(x) = 1/cos(x). It

In calculus and numerical methods, a secant line to a function y = f(x) through points (x1, f(x1))

Etymology: Secant comes from Latin secans, present participle of secare "to cut," reflecting its role in intersecting

is
undefined
where
cos
x
=
0,
at
x
=
pi/2
+
k
pi.
The
secant
function
is
related
to
other
trig
functions
by
the
identity
sec^2
x
=
1
+
tan^2
x,
and
by
graphs
with
vertical
asymptotes
at
the
same
points
as
csc
and
tan.
Examples:
sec(0)
=
1;
sec(pi/3)
=
2.
and
(x2,
f(x2))
has
slope
m
=
[f(x2)
-
f(x1)]
/
(x2
-
x1).
As
x2
approaches
x1,
the
secant
line
tends
to
the
tangent
line
with
slope
f'(x).
The
secant
method
is
an
iterative
root-finding
algorithm
that
uses
secant
lines
to
approximate
a
root
of
f.
curves
as
if
cutting
through
them.