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coslatitude

Coslatitude refers to the cosine of geographic latitude, often written as cos(latitude). If latitude is denoted by φ, then coslatitude equals cos(φ) after φ is converted to radians for the trigonometric calculation. It is a dimensionless factor that ranges from 0 at the poles to 1 at the equator and appears frequently in spherical geometry and cartography.

In spherical Earth geometry, cos(latitude) appears in several fundamental formulas. The differential surface area of a

The factor also plays a key role in map projections and geographic information systems. For example, in

Cautions include numerical sensitivity near the poles, where cosφ approaches zero and division by cosφ can become

small
patch
with
latitude
φ
and
longitude
λ
on
a
sphere
of
radius
R
is
dA
=
R^2
cosφ
dφ
dλ.
The
east-west
length
corresponding
to
a
small
longitude
change
Δλ
at
latitude
φ
is
R
cosφ
Δλ.
Thus,
cos(latitude)
captures
the
compression
of
east-west
distances
toward
the
poles
and
is
central
to
understanding
distortions
in
map
projections
and
spatial
calculations.
the
equirectangular
projection,
horizontal
scale
is
proportional
to
cosφ,
leading
to
shrinking
of
longitude
distances
as
latitude
increases.
Conversely,
in
the
Mercator
projection
the
scale
factor
varies
as
secφ
=
1/cosφ,
which
causes
magnification
toward
the
poles.
Consequently,
coslatitude
is
often
used
to
adjust
or
normalize
data,
convert
grid
spacing
from
degrees
to
meters,
or
weight
computations
by
latitude
bands
in
geographic
datasets.
unstable.
Real-world
calculations
frequently
employ
ellipsoidal
Earth
models
for
higher
accuracy,
in
which
the
simple
cos(latitude)
factor
is
supplemented
by
more
sophisticated
formulas.