对于级数∑(2^n)/n!
令Un=(2^n)/n!
u(n+1)=(2^(n+1))/(n+1)!
lim(n→∞)u(n+1)/un
=lim(n→∞)[(2^(n+1))/(n+1)!]/[(2^n)/n!]
=lim(n→∞)2/(n+1)
=0
即级数收敛,所以
它的一般项极限=0
求极限lim n→∞ (2^n)/n!
1个回答
相关问题
-
lim(n→∞)√(3^n)/(n*2^n)和lim(n→∞)√(n^2)/(3^n)求极限,
-
求极限lim1/n2(√n+√2n+…√n2﹚
-
求极限lim(n-1)^n/(n-2)^n(n到无穷大)
-
求极限lim [1/(n+1)+1/(n+2)+...+1/(n+n)] (n→∞)
-
lim n →∞ (1^n+3^n+2^n)^1/n,求数列极限
-
求极限lim [ 2^(n+1)+3^(n+1)]/2^n+3^n (n→∞)
-
求极限lim(1+2^n+3^n)^1/n.n-->无穷.
-
求极限lim(n→∞)(e^(1/n)-2sin(1/n))^n
-
求极限 lim(n→∞)[根号(n^2+4n+5)-(n-1)] =
-
求极限Lim x^2n的极限 (n趋向无穷)?