作业帮求证求和级数(-1)^[n^0.5]/n收敛,其中[n^0.5]的意思是n开根号然后取证取整 (-1)^[n^0.5]再乘以1/n
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![求证求和级数(-1)^[n^0.5]/n收敛,其中[n^0.5]的意思是n开根号然后取证取整 (-1)^[n^0.5]再乘以1/n](/uploads/image/z/14699128-40-8.jpg?t=%E6%B1%82%E8%AF%81%E6%B1%82%E5%92%8C%E7%BA%A7%E6%95%B0%28-1%29%5E%5Bn%5E0.5%5D%2Fn%E6%94%B6%E6%95%9B%2C%E5%85%B6%E4%B8%AD%5Bn%5E0.5%5D%E7%9A%84%E6%84%8F%E6%80%9D%E6%98%AFn%E5%BC%80%E6%A0%B9%E5%8F%B7%E7%84%B6%E5%90%8E%E5%8F%96%E8%AF%81%E5%8F%96%E6%95%B4+%28-1%29%5E%5Bn%5E0.5%5D%E5%86%8D%E4%B9%98%E4%BB%A51%2Fn)
求证求和级数(-1)^[n^0.5]/n收敛,其中[n^0.5]的意思是n开根号然后取证取整 (-1)^[n^0.5]再乘以1/n
求证求和级数(-1)^[n^0.5]/n收敛,其中[n^0.5]的意思是n开根号然后取证取整 (-1)^[n^0.5]再乘以1/n
求证求和级数(-1)^[n^0.5]/n收敛,其中[n^0.5]的意思是n开根号然后取证取整 (-1)^[n^0.5]再乘以1/n
设int(√n)=i(int为取整运算),i=1、2、3、...为正整数,满足int(√n)=i的n值有2i+1个:i^2、i^2+1、i^2+2、...、i^2+2i;可以将这2i+1项合并为1项,显然这2i+1项具有相同的符号;令a(i)=(-1)^i[1/i^2+1/(i^2+1)+1/(i^2+2)+...+1/(i^2+2i)];原级数可以用a(i)表示;显然,a(i)为交错级数;|a(i)|=1/i^2+1/(i^2+1)+...+1/(i^2+2i)<(2i+1)/i^2,所以当i→+∞时,|a(i)|→0,即lim(i→+∞)|a(i)|=0①;另外|a(i)|=1/[i(i+1)]+∑(k=0→i-1)[1/(i^2+k)+1/(i^2+2i-k)]=1/[i(i+1)]+∑(k=0→i-1)2i(i+1)/(i^4+2i^3+2ki-k^2)②;由②得|a(i)|>1/[i(i+1)]+∑(k=0→i-1)2(i+1)/(i^3+2i^2+2i-2),即|a(i)|>1/[i(i+1)]+2i(i+1)/(i^3+2i^2+2i-2)③;由②得|a(i)|<1/[i(i+1)]+2i^2(i+1)/[i^4+2i^3-(i-1)^2]④;由④得|a(i+1)|<1/[(i+1)(i+2)]+2(i+1)^2(i+2)/[(i+1)^4+2(i+1)^3-i^2]⑤;由③、⑤得|a(i)|>1/[i(i+1)]+2i(i+1)/[i^3+2i^2+2i-2]>1/[(i+1)(i+2)]+2(i+1)^2(i+2)/[(i+1)^4+2(i+1)^3-i^2]>|a(i+1)|,即|a(i)|>|a(i+1)|⑥;由①、⑥及莱布尼兹准则可知,级数a(i)收敛,所以原级数收敛.