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Cosxsinx

Cosxsinx denotes the product of the cosine and sine of the same real variable x, written as f(x) = cos x · sin x. Using the double-angle identity sin 2x = 2 sin x cos x, this function can be expressed as f(x) = (1/2) sin 2x, highlighting its periodicity and range.

The function has period π, since sin 2x has period π. Its range is [-1/2, 1/2]. Zeros occur

Derivatives and integrals follow standard rules. f'(x) = cos^2 x − sin^2 x = cos 2x. An antiderivative is

Beyond these relations, cos x sin x often appears in product-to-sum transformations and trigonometric simplifications, serving

when
sin
2x
=
0,
i.e.,
at
x
=
nπ/2
for
integers
n.
Maximum
values
of
1/2
occur
at
x
=
π/4
+
nπ,
while
minimum
values
of
-1/2
occur
at
x
=
3π/4
+
nπ.
The
graph
is
an
odd
function,
with
f(-x)
=
-f(x).
∫
cos
x
sin
x
dx
=
(1/2)
sin^2
x
+
C
(or
equivalently
−(1/2)
cos^2
x
+
C).
as
a
compact
way
to
represent
sine
and
cosine
products.
It
also
provides
a
simple
example
of
how
double-angle
functions
govern
the
behavior
of
product
expressions,
with
straightforward
geometric
and
algebraic
interpretations.