| 1. | Convergence and divergence of infinite series depend upon this concept .
无穷级数的收敛性与发散性与此概念有关。 |
| 2. | Around 1810 fouriers, gauss, and bolzano began the exact handling of infinite series .
在1810年前后,Fonrier,Grauss和Bolzano开始确切地处理无穷函数。 |
| 3. | Many more criteria for the convergence of infinite series were developed by leading mathematicians .
许多第一流的数学家推导了无穷极数收敛的很多判别法则。 |
| 4. | The time may be computed to any desired degree of precision by taking enough terms in the infinite series .
在无穷级数中,取足够多的项,周期的数值可计算到任意的精确度。 |
| 5. | An application of abstract integral in infinite series
积分在无穷级数中的一个应用 |
| 6. | A few ways to the summation of infinite series
关于无穷级数求和的几种方法 |
| 7. | Logarithmetic criteria for abnormal integral and infinite series
反常积分与无穷级数的对数审敛法 |
| 8. | The application of functions in the calculation of infinite series
函数在无穷级数有关计算中的应用 |
| 9. | The methods of solving infinite series
无穷级数的解题方法 |
| 10. | Summation to calculate a class infinite series by using residue theorem
应用留数定理计算一类级数求和问题 |
