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Mensuration

Mensuration is a branch of geometry focused on measuring geometric quantities such as lengths, areas, and volumes. It encompasses two-dimensional measurements, including perimeters and areas, as well as three-dimensional measurements like surface area and volume.

Historically, mensuration developed from practical needs in land measurement, architecture, and astronomy. Ancient civilizations used basic

Core concepts include calculating area, perimeter, and volume for common shapes. In two dimensions, area formulas

Techniques in mensuration range from decomposing irregular shapes into standard ones to applying calculus and numerical

Applications of mensuration appear in architecture, surveying, construction, design, and computer graphics. The field links practical

shapes
and
rules
of
thumb,
while
Greek
mathematics,
notably
Euclid,
systematized
geometric
measurement.
Contributions
from
Indian
and
Chinese
mathematicians
expanded
area
and
volume
techniques,
laying
the
groundwork
for
formal
formulae
and
rules
used
in
education
and
engineering.
include
rectangle
A
=
l
×
w,
square
A
=
s^2,
triangle
A
=
1/2
b
h,
and
circle
A
=
π
r^2.
Perimeters
and
other
boundary
measures
follow
corresponding
expressions.
In
three
dimensions,
volumes
include
rectangular
prism
V
=
B
h,
cylinder
V
=
π
r^2
h,
pyramid
and
cone
V
=
(1/3)
B
h,
and
sphere
V
=
(4/3)
π
r^3.
Surface
area
measures
include
rectangular
prism
SA
=
2(lw+lh+wh),
cylinder
SA
=
2π
r
h
+
2π
r^2,
and
for
spheres,
SA
=
4π
r^2.
methods
for
approximation.
Consistent
units
are
essential;
linear,
area,
and
volume
measurements
scale
with
the
first,
second,
and
third
powers
of
length.
measurement
with
theoretical
geometry
and
underpins
broader
systems
of
units
and
metrology.