[数] 积分
这两种不同面积分(integral)别为格宾网的铺设面积和展开面积。 格宾网的铺设面积(area)是指的需要铺设格宾网的平面面积,换句话说就是格宾网的底的面积再...
完整的
... intact a.完整无缺的,未经触动的,未受损伤的 integral a.构成整体所必需的;完整的 integrate v.(into,with)(使)一体,(使)在一起 ...
构成整体所必需的
... intact a.完整无缺的,未经触动的,未受损伤的 integral a.构成整体所必需的;完整的 integrate v.(into,with)(使)一体,(使)在一起 ...
组成的
... integralvector积分矢量 integral总体;积分;整数;整体;组成的;完整的;整的;积分的 integrality完整性 ...
瑕积分 ; 数 非正常积分 ; 数 反常积分
曲线积分 ; 数 线积分 ; 组成部分线
数 整环 ; 积分区域 ; 积分域
The integral is an important concept in mathematics. Integration is one of the two main operations in calculus, with its inverse, differentiation, being the other. Given a function f of a real variable x and an interval [a, b] of the real line, the definite integralis defined informally as the signed area of the region in the xy-plane that is bounded by the graph of f, the x-axis and the vertical lines x = a and x = b. The area above the x-axis adds to the total and that below the x-axis subtracts from the total.The term integral may also refer to the related notion of the antiderivative, a function F whose derivative is the given function f. In this case, it is called an indefinite integral and is written:However, the integrals discussed in this article are those termed definite integrals.The principles of integration were formulated independently by Isaac Newton and Gottfried Leibniz in the late 17th century. Through the fundamental theorem of calculus, which they independently developed, integration is connected with differentiation: if f is a continuous real-valued function defined on a closed interval [a, b], then, once an antiderivative F of f is known, the definite integral of over that interval is given byIntegrals and derivatives became the basic tools of calculus, with numerous applications in science and engineering. The founders of calculus thought of the integral as an infinite sum of rectangles of infinitesimal width. A rigorous mathematical definition of the integral was given by Bernhard Riemann. It is based on a limiting procedure which approximates the area of a curvilinear region by breaking the region into thin vertical slabs. Beginning in the nineteenth century, more sophisticated notions of integrals began to appear, where the type of the function as well as the domain over which the integration is performed has been generalised. A line integral is defined for functions of two or three variables, and the interval of integration [a, b] is replaced by a certain curve connecting two points on the plane or in the space. In a surface integral, the curve is replaced by a piece of a surface in the three-dimensional space.Integrals of differential forms play a fundamental role in modern differential geometry. These generalizations of integrals first arose from the needs of physics, and they play an important role in the formulation of many physical laws, notably those of electrodynamics. There are many modern concepts of integration, among these, the most common is based on the abstract mathematical theory known as Lebesgue integration, developed by Henri Lebesgue.