| 关于恒等式e^x=∑n≥0LnJn(2x)的证明 |
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| 引用本文: | 李春龙.关于恒等式e^x=∑n≥0LnJn(2x)的证明[J].内蒙古民族大学学报(自然科学版),2009,24(6):608-610. |
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| 作者姓名: | 李春龙 |
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| 作者单位: | 内蒙古民族大学,数学学院,内蒙古,通辽,028043 |
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| 摘 要: | 关于恒等式e^x=∑n≥0LnJn(2x)已有组合证明,本文将用微积分的方法证明该恒等式,其中L0=1,L1=1,L2=3,Ln+1=Ln+Ln-1(n≥2),Jn(2x)=∑k≥0(-1)^kx^n+2k/k!(n+k)!.
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| 关 键 词: | 恒等式 微积分方法 |
The Proof of the Identity Equation eχ=∑n≥0LnJn(2χ) |
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| LI Chun-long.The Proof of the Identity Equation eχ=∑n≥0LnJn(2χ)[J].Journal of Inner Mongolia University for the Nationalities(Natural Sciences),2009,24(6):608-610. |
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| Authors: | LI Chun-long |
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| Institution: | LI Chun-long(College of Mathematics,Inner Mongolia University for Nationalites,Tongliao 028043,China) |
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| Abstract: | On the identical equation e^x=∑n≥0LnJn(2x).been the combinatorial proof, the article will use the differential integral methods to prove this identical equation, here L0=1,L1=1,L2=3,Ln+1=Ln+Ln-1(n≥2),Jn(2x)=∑k≥0(-1)^kx^n+2k/k!(n+k)!. |
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| Keywords: | Identical equation Differential integral methods |
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