Area

Surname

Surface
area
cross-sectional area

${\ displaystyle A}$

Derived from

Size and unit system	unit	dimension
SI	m ²	L ²
cgs	cm ²	L ²
Planck	Planck surface	ħ · G · c ⁻³

The area is a measure of the size of an area . A surface is understood to mean two-dimensional structures, i.e. those in which one can move in two independent directions. This includes the usual figures of flat geometry such as rectangles , polygons , circles , but also boundary surfaces of three-dimensional bodies such as cuboids , spheres , cylinders , etc. These surfaces are sufficient for many applications, more complex surfaces can often be composed of them or approximated by them .

The surface area plays an important role in mathematics, when defining many physical quantities, but also in everyday life. For example, pressure is defined as the force per area, or the magnetic moment of a conductor loop as the current times the area around it . Property and apartment sizes can be compared by specifying their area. Material consumption, for example of seeds for a field or paint for painting an area, can be estimated with the aid of the area.

The area is normalized in the sense that the unit square , that is, the square with side length 1, has the area 1; Expressed in units of measurement , a square with a side length of 1 m has an area of 1 m ² . In order to make surfaces comparable in terms of their area, one must demand that congruent areas have the same area and that the area of combined areas is the sum of the contents of the partial areas.

The off measurement of surface areas does not happen right in the rule. Instead, certain lengths are measured, from which the area is then calculated. To measure the area of a rectangle or a spherical surface, one usually measures the length of the sides of the rectangle or the diameter of the sphere and obtains the desired area by means of geometric formulas as listed below.

Area of some geometric figures

Three well-known figures from plane geometry on a checkered background

The following table lists some well-known figures from planar geometry together with formulas for calculating their area.

Figure / object	Designations	Area ${\ displaystyle A}$
square	Side length ${\ displaystyle a}$	${\ displaystyle A = a ^ {2}}$
rectangle	Side lengths ${\ displaystyle a, \, b}$	${\ displaystyle A = a \ cdot b}$
Triangle (see also: triangular surface )	Base side , height , at right angles to ${\ displaystyle g}$ ${\ displaystyle h}$ ${\ displaystyle g}$	${\ displaystyle A = {\ frac {g \ cdot h} {2}}}$
Trapezoid	sides parallel to each other , height , perpendicular to and ${\ displaystyle a, \, c}$ ${\ displaystyle h}$ ${\ displaystyle a}$ ${\ displaystyle c}$	${\ displaystyle A = {\ frac {a + c} {2}} \ cdot h}$
Rhombus	Diagonals and ${\ displaystyle d_ {1}}$ ${\ displaystyle d_ {2}}$	${\ displaystyle A = {\ frac {d_ {1} \ cdot d_ {2}} {2}}}$
parallelogram	Side length , height , perpendicular to ${\ displaystyle a}$ ${\ displaystyle h_ {a}}$ ${\ displaystyle a}$	${\ displaystyle A = a \ cdot h_ {a}}$
circle	Radius , diameter , number of circles ${\ displaystyle r}$ ${\ displaystyle d}$ ${\ displaystyle {\ pi}}$	${\ displaystyle A = \ pi r ^ {2} = {\ frac {\ pi} {4}} d ^ {2}}$
ellipse	Large and small semi-axes or , circle number ${\ displaystyle a}$ ${\ displaystyle b}$ ${\ displaystyle {\ pi}}$	${\ displaystyle A = \ pi from}$
regular hexagon	Side length ${\ displaystyle a}$	${\ displaystyle A = {\ frac {3 {\ sqrt {3}}} {2}} a ^ {2}}$

To determine the area of a polygon , you can triangulate it, that is, break it down into triangles by dragging diagonals, then determine the area of the triangles and finally add these partial areas. Are the coordinates , the vertices of the polygon in a Cartesian coordinate system is known, the area, with the Gaussian trapezoidal rule are calculated: ${\ displaystyle (x_ {i}, y_ {i})}$ ${\ displaystyle i = 1 \ dotsc n}$ ${\ displaystyle n}$

{\ displaystyle A = {\ frac {1} {2}} \ sum _ {i = 1} ^ {n} (y_ {i} + y_ {i + 1}) (x_ {i} -x_ {i + 1})}

The following applies to the indices: with is and with is meant. The sum is positive if the corner points are passed through according to the direction of rotation of the coordinate system . The amount may have to be selected in the event of negative results . Pick's theorem can be used especially for polygonal surfaces with grid points as corners . Other areas can usually be easily approximated using polygons , so that an approximate value can easily be obtained. ${\ displaystyle x_ {n + j}}$ ${\ displaystyle x_ {j}}$ ${\ displaystyle y_ {n + j}}$ ${\ displaystyle y_ {j}}$

Calculation of some surfaces

Tetrahedron

Straight cone with a developed lateral surface

Here are some typical formulas for calculating surfaces:

Figure / object	Designations	surface ${\ displaystyle A}$
cube	Side length ${\ displaystyle a}$	${\ displaystyle A = 6a ^ {2}}$
Cuboid	Side lengths ${\ displaystyle a, \, b, \, c}$	${\ displaystyle A = 2 (ab + ac + bc)}$
Tetrahedron	Side length ${\ displaystyle a}$	${\ displaystyle A = {\ sqrt {3}} \, a ^ {2}}$
Sphere (see also: spherical surface )	Radius , diameter ${\ displaystyle r}$ ${\ displaystyle d}$	${\ displaystyle A = 4 \ pi r ^ {2} = \ pi d ^ {2}}$
cylinder	Base radius , height ${\ displaystyle r}$ ${\ displaystyle h}$	${\ displaystyle A = 2 \ pi r (r + h)}$
cone	Base radius , height ${\ displaystyle r}$ ${\ displaystyle h}$	${\ displaystyle A = \ pi r (r + {\ sqrt {r ^ {2} + h ^ {2}}})}$
Torus	Ring radius , cross-section radius ${\ displaystyle R}$ ${\ displaystyle r}$	${\ displaystyle A = 4 \ pi ^ {2} \ cdot R \ cdot r}$

A typical procedure for determining such surfaces is the so-called "rolling" or "unwinding" in the plane, that is, one tries to map the surface in the plane in such a way that the surface area is retained and then determines the area of the resulting planes Figure. However, this does not work with all surfaces, as the example of the sphere shows. To determine such surfaces methods of analysis used in the example of the ball can be about rotation surfaces use. Often Guldin's first rule also leads to rapid success, for example with the torus.

Integral calculus

The area under the curve from a to b is approximated by rectangles

The integral calculus was developed, among other things, to determine areas under curves, i.e. under function graphs. The idea is to approximate the area between the curve and axis by a series of narrow rectangles and then let the width of these rectangles approach 0 in a boundary process. The convergence of this limit depends on the curve used. If one looks at a restricted area, for example the curve over a restricted interval as in the adjacent drawing, theorems of analysis show that the continuity of the curve is sufficient to ensure the convergence of the limit process. The phenomenon occurs that areas below the axis become negative, which can be undesirable when determining areas. If you want to avoid this, you have to go over to the amount of the function. ${\ displaystyle x}$ ${\ displaystyle [a, b]}$ ${\ displaystyle x}$

Gaussian bell curve

If you want to the interval boundaries and permit, we first determined the areas for finite limits and as just described and then leaves in a further boundary process , or seek both. Here it can happen that this limit process does not converge, for example with oscillating functions such as the sine function . If you limit yourself to functions that have their function graphs in the upper half-plane, these oscillation effects can no longer occur, but it can happen that the area between the curve and the axis becomes infinite. Since the total area has an infinite extent, this is even a plausible and ultimately also expected result. However, if the curve approaches the -axis sufficiently quickly for points far from 0 , the phenomenon can occur that an infinitely extended area also has a finite area. A well-known example that is important for probability theory is the area between the Gaussian bell curve ${\ displaystyle - \ infty}$ ${\ displaystyle + \ infty}$ ${\ displaystyle a}$ ${\ displaystyle b}$ ${\ displaystyle a \ to - \ infty}$ ${\ displaystyle b \ to + \ infty}$ ${\ displaystyle x}$ ${\ displaystyle x}$

{\ displaystyle f (x) = {\ tfrac {1} {\ sqrt {2 \ pi}}} \ cdot \ mathrm {e} ^ {- {\ frac {1} {2}} x ^ {2}} }

and the axis. Although the area is from to , the area is equal to 1. ${\ displaystyle x}$ ${\ displaystyle - \ infty}$ ${\ displaystyle + \ infty}$

When trying to calculate further areas, for example also under discontinuous curves, one finally comes up with the question of which quantities in the plane should a meaningful area be allocated at all. This question proves difficult, as pointed out in the article on the dimension problem . It turns out that the intuitive concept of area used here cannot meaningfully be extended to all subsets of the plane.

Differential geometry

In differential geometry , the area of a flat or curved surface is calculated using the coordinates as an area integral: ${\ displaystyle F}$ ${\ displaystyle (u, v)}$

{\ displaystyle \ iint _ {F} \ mathrm {d} \ sigma}

The area element corresponds to the width of the interval in the one-dimensional integral calculus . There is the area of the by the tangents to the coordinate lines spanned parallelogram with sides and on. The surface element depends on the coordinate system and the Gaussian curvature of the surface. ${\ displaystyle \ mathrm {d} \ sigma}$ ${\ displaystyle \ mathrm {d} x}$ ${\ displaystyle \ mathrm {d} u}$ ${\ displaystyle \ mathrm {d} v}$

The area element is in Cartesian coordinates . On the spherical surface with the radius and the length as well as the width as coordinate parameters apply . For the surface of a sphere ( ) one obtains the area: ${\ displaystyle (x, y)}$ ${\ displaystyle \ mathrm {d} \ sigma = \ mathrm {d} x \, \ mathrm {d} y}$ ${\ displaystyle r}$ ${\ displaystyle L}$ ${\ displaystyle B}$ ${\ displaystyle \ mathrm {d} \ sigma = r ^ {2} \ cos B \, \ mathrm {d} B \, \ mathrm {d} L}$ ${\ displaystyle - \ pi / 2 \ leq B \ leq \ pi / 2, - \ pi \ leq L \ leq \ pi}$

{\ displaystyle A = r ^ {2} \ int _ {- \ pi} ^ {\ pi} \ int _ {- \ pi / 2} ^ {\ pi / 2} \ cos B \, \ mathrm {d} B \, \ mathrm {d} L = r ^ {2} \ int _ {- \ pi} ^ {\ pi} \ left [\ sin B \ right] _ {- \ pi / 2} ^ {\ pi / 2} \, \ mathrm {d} L = 2r ^ {2} \ int _ {- \ pi} ^ {\ pi} \ mathrm {d} L = 4 \ pi r ^ {2}}

To calculate the area element, it is not absolutely necessary to know the position of a spatial area in space. The surface element can only be derived from such dimensions that can be measured within the surface, and thus counts to the inner geometry of the surface. This is also the reason why the surface area of a (developable) surface does not change when it is developed and can therefore be determined by developing into a plane.

Surfaces in physics

Naturally, surfaces also appear as a quantity to be measured in physics. Areas are usually measured indirectly using the above formulas. Typical sizes at which surfaces occur are:

Pressure = force per area

Intensity = energy per time and area

Magnetic moment of a conductor loop = current times the area covered

Surface tension = work done to enlarge the area per additional area

Surface charge density = charge per area

Current density = current per flow area

Area as a vector

Often the surface is also assigned a direction that is perpendicular to the surface, which makes the surface a vector and gives it an orientation because of the two possible choices of the perpendicular direction . The length of the vector is a measure of the area. In the case of a parallelogram bounded by vectors and , this is the vector product ${\ displaystyle {\ vec {a}}}$ ${\ displaystyle {\ vec {b}}}$

{\ displaystyle {\ vec {a}} \ times {\ vec {b}}}

.

If there are surfaces, the normal vector field is usually used in order to be able to assign a direction to them locally at each point. This leads to flux quantities that are defined as the scalar product of the vector field and the area (as a vector). The current is calculated from the current density according to ${\ displaystyle I}$ ${\ displaystyle {\ vec {J}}}$

{\ displaystyle I = \ int \ limits _ {A} {\ vec {J}} \ cdot \ mathrm {d} {\ vec {A}}}

,

where in the integral the scalar product

{\ displaystyle {\ vec {J}} \ cdot \ mathrm {d} {\ vec {A}}}

is formed. For evaluating such integrals, formulas for calculating surfaces are helpful.

In physics, there are also area sizes that are actually determined experimentally, such as scattering cross-sections . This is based on the idea that a particle flow hits a solid target object, the so-called target, and the particles of the particle flow hit the particles of the target with a certain probability. The macroscopically measured scattering behavior then allows conclusions to be drawn about the cross-sectional areas that the target particles hold against the flow particles. The size determined in this way has the dimension of an area. Since the scattering behavior depends not only on geometric parameters, but also on other interactions between the scattering partners, the measured area cannot always be directly equated with the geometric cross-section of the scattering partners. One then speaks more generally of the cross-section , which also has the dimension of an area.

Area calculation in surveying

As a rule, the area of land, parts of land, countries or other areas cannot be determined using the formulas for simple geometric figures. Such areas can be calculated graphically, semi-graphically, from field dimensions or from coordinates.

A mapping of the area must be available for the graphic process. Areas whose boundaries are formed by a polygon can be broken down into triangles or trapezoids, whose base lines and heights are measured. The area of the partial areas and finally the area of the total area are then calculated from these measurements. The semi-graphic area calculation is used when the area can be broken down into narrow triangles, the short base side of which has been precisely measured in the field. Since the relative error of the area is mainly determined by the relative error of the short base side, measuring the base side in the field instead of in the map increases the accuracy of the area compared to the purely graphic method.

Irregular surfaces can be recorded with the help of a square glass panel. On the underside, this has a grid of squares whose side length is known (e.g. 1 millimeter). The board is placed on the mapped area and the area is determined by counting the squares that lie within the area.

A planimeter harp can be used for elongated surfaces. This consists of a sheet of paper with parallel lines whose uniform spacing is known. The planimeter harp is placed on the surface in such a way that the lines are approximately perpendicular to the longitudinal direction of the surface. This divides the area into trapezoids, the center lines of which are added with a pair of dividers. The area can be calculated from the sum of the lengths of the center lines and the line spacing.

Polar planimeter, on the right the driving pen with magnifying glass, on the left the roller with counter, on top the pole fixed during the measurement

The planimeter , a mechanical integration instrument , is particularly suitable for determining the surface area of areas with a curvilinear boundary . The limit must be traversed with the driving pen of the planimeter. When driving around the area, a roller rotates and the rotation of the roller and the size of the area can be read on a mechanical or electronic counter. The accuracy depends on how precisely the operator travels the edge of the area with the driving pen. The smaller the circumference in relation to the area, the more precise the result.

The area calculation from field dimensions can be used if the area can be broken down into triangles and trapezoids and the distances required for the area calculation are measured in the field. If the corner points of the area have been angled onto a measurement line using the orthogonal method, the area can also be calculated using the Gaussian trapezoidal formula.

Today areas are often calculated from coordinates. This can be, for example, the coordinates of boundary points in the real estate cadastre or corner points of an area in a geographic information system . Often the corner points are connected by straight lines, occasionally also by arcs. Therefore, the area can be calculated using the Gaussian trapezoidal formula. In the case of circular arcs, the circular segments between the polygon side and the circular arc must be taken into account. If the content of an irregular area is to be determined in a geographic information system, the area can be approximated by a polygon with short side lengths.

Individual evidence

↑ Heribert Kahmen: Surveying I . Walter de Gruyter, Berlin 1988.

Web links

Wiktionary: area - explanations of meanings, word origins, synonyms, translations

[1] Heribert Kahmen: Surveying I . Walter de Gruyter, Berlin 1988.