1An infinite series of the form Σanxn (where n is a positive integer).
〔数〕幂级数(用∑anxn表示,其中n为正整数)
Example sentencesExamples
Already at this stage he began to undertake research, investigating the problem of finding an estimate for the determinant generated by coefficients of a power series.
Not surprisingly, he also discovered the infinite power series for the cosine and the tangent.
The transformation of his conception of an analytic function from a differentiable function to a function expandable into a convergent power series was made during this early period of Weierstrass's mathematical activity.
This is called a power series for sin because it is a series in terms of powers of x.
The aim of these notes was to construct the analytical continuation of a power series outside its circle of convergence.
1.1A generalization of a power series for more than one variable.
总称幂级数
Example sentencesExamples
These generating functions are infinite power series, and Euler was a master in manipulating them.
He worked on power series and on potential theory.
Or we may prescribe a seemingly much more powerful condition, namely, that the function possesses a development into power series about each point of the domain of definition.
It also contains continued fractions, quadratic equations, sums of power series and a table of sines.
Some of his most well-known contributions are a theorem connected to the Phragmén-Lindelöf principle, a theorem about the zeros of the V-function and several theorems about power series with integer coefficients.
Definition of power series in US English:
power series
noun
Mathematics
1An infinite series of the form Σanxn (where n is a positive integer).
〔数〕幂级数(用∑anxn表示,其中n为正整数)
Example sentencesExamples
The aim of these notes was to construct the analytical continuation of a power series outside its circle of convergence.
Not surprisingly, he also discovered the infinite power series for the cosine and the tangent.
The transformation of his conception of an analytic function from a differentiable function to a function expandable into a convergent power series was made during this early period of Weierstrass's mathematical activity.
Already at this stage he began to undertake research, investigating the problem of finding an estimate for the determinant generated by coefficients of a power series.
This is called a power series for sin because it is a series in terms of powers of x.
1.1A generalization of a power series for more than one variable.
总称幂级数
Example sentencesExamples
Or we may prescribe a seemingly much more powerful condition, namely, that the function possesses a development into power series about each point of the domain of definition.
Some of his most well-known contributions are a theorem connected to the Phragmén-Lindelöf principle, a theorem about the zeros of the V-function and several theorems about power series with integer coefficients.
It also contains continued fractions, quadratic equations, sums of power series and a table of sines.
He worked on power series and on potential theory.
These generating functions are infinite power series, and Euler was a master in manipulating them.