compassbion.blogg.se - Area of rectangle formula

1 square inch = 6.4516 square centimetres.

The relationship between square feet and square inches is In non-metric units, the conversion between two square units is the square of the conversion between the corresponding length units.

1 square centimetre = 100 square millimetres.1 square metre = 10,000 square centimetres = 1,000,000 square millimetres.1 square kilometre = 1,000,000 square metres.This is equivalent to 6 million square millimetres. Units Īlthough there are 10 mm in 1 cm, there are 100 mm 2 in 1 cm 2.Ĭalculation of the area of a square whose length and width are 1 metre would be:Īnd so, a rectangle with different sides (say length of 3 metres and width of 2 metres) would have an area in square units that can be calculated as:ģ metres × 2 metres = 6 m 2. It can be proved that such an area function actually exists. If there is a unique number c such that a( S) ≤ c ≤ a( T) for all such step regions S and T, then a( Q) = c. A step region is formed from a finite union of adjacent rectangles resting on a common base, i.e.

Let Q be a set enclosed between two step regions S and T.

If the rectangle has length h and breadth k then a( R) = hk.

If a set S is in M and S is congruent to T then T is also in M and a( S) = a( T).

If S and T are in M with S ⊆ T then T − S is in M and a( T− S) = a( T) − a( S).

If S and T are in M then so are S ∪ T and S ∩ T, and also a( S∪ T) = a( S) + a( T) − a( S∩ T).

"Area" can be defined as a function from a collection M of a special kinds of plane figures (termed measurable sets) to the set of real numbers, which satisfies the following properties: It can be proved that such a function exists.Īn approach to defining what is meant by "area" is through axioms. Īrea can be defined through the use of axioms, defining it as a function of a collection of certain plane figures to the set of real numbers. In general, area in higher mathematics is seen as a special case of volume for two-dimensional regions. In analysis, the area of a subset of the plane is defined using Lebesgue measure, though not every subset is measurable. In addition to its obvious importance in geometry and calculus, area is related to the definition of determinants in linear algebra, and is a basic property of surfaces in differential geometry. Formulas for the surface areas of simple shapes were computed by the ancient Greeks, but computing the surface area of a more complicated shape usually requires multivariable calculus.Īrea plays an important role in modern mathematics.

įor a solid shape such as a sphere, cone, or cylinder, the area of its boundary surface is called the surface area. Indeed, the problem of determining the area of plane figures was a major motivation for the historical development of calculus. For shapes with curved boundary, calculus is usually required to compute the area. Using these formulas, the area of any polygon can be found by dividing the polygon into triangles. There are several well-known formulas for the areas of simple shapes such as triangles, rectangles, and circles. This square and this disk both have the same area (see: squaring the circle). In mathematics, the unit square is defined to have area one, and the area of any other shape or surface is a dimensionless real number. A shape with an area of three square metres would have the same area as three such squares. In the International System of Units (SI), the standard unit of area is the square metre (written as m 2), which is the area of a square whose sides are one metre long.

The area of a shape can be measured by comparing the shape to squares of a fixed size. It is the two-dimensional analogue of the length of a curve (a one-dimensional concept) or the volume of a solid (a three-dimensional concept). Area can be understood as the amount of material with a given thickness that would be necessary to fashion a model of the shape, or the amount of paint necessary to cover the surface with a single coat. The area of a plane region or plane area refers to the area of a shape or planar lamina, while surface area refers to the area of an open surface or the boundary of a three-dimensional object. The combined area of these three shapes is approximately 15.57 squares.Īrea is the quantity that expresses the extent of a region on the plane or on a curved surface.