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vincos

Vincos is a mathematical function defined as the product of the sine and cosine of a real angle: vincos(x) = sin(x) · cos(x). Using the double-angle identity, this can also be written as vincos(x) = (1/2) sin(2x). The function is defined for all real numbers and has a range from -1/2 to 1/2.

Zeros occur when sin(x) = 0 or cos(x) = 0, i.e., at x = nπ/2 for integer n. Its

The graph of vincos oscillates between -1/2 and 1/2, with maxima at x = π/4 + kπ and minima

derivative
is
vincos'(x)
=
cos^2(x)
−
sin^2(x)
=
cos(2x),
so
the
critical
points
are
at
x
=
π/4
+
kπ/2.
At
these
points,
vincos(x)
equals
(1/2)(-1)^k,
yielding
a
maximum
value
of
1/2
and
a
minimum
value
of
-1/2,
alternating
with
period
π.
at
x
=
3π/4
+
kπ.
In
a
calculus
or
trigonometry
setting,
vincos
serves
as
a
convenient
example
to
illustrate
product-to-sum
identities
(sin
x
cos
x
=
(1/2)
sin
2x)
and
to
practice
simple
integral
calculations,
such
as
∫
vincos(x)
dx
=
-1/4
cos(2x)
+
C.
The
function
thus
provides
a
compact,
analytic
instance
of
how
sine
and
cosine
interact
in
a
multiplicative
combination.