(n+3*n^1/2)^1/2-(n-n^1/2)^1/3在n趋近于无穷大时的极限值

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(n+3*n^1/2)^1/2-(n-n^1/2)^1/3在n趋近于无穷大时的极限值

(n+3*n^1/2)^1/2-(n-n^1/2)^1/3在n趋近于无穷大时的极限值
(n+3*n^1/2)^1/2-(n-n^1/2)^1/3在n趋近于无穷大时的极限值

(n+3*n^1/2)^1/2-(n-n^1/2)^1/3在n趋近于无穷大时的极限值
直接和(n+3*n^1/2)^1/2比.lim(n->∞)((n+3*n^1/2)^1/2-(n-n^1/2)^1/3)/(n+3*n^1/2)^1/2 =lim(n->∞)1-(n-n^1/2)^1/3/(n+3*n^1/2)^1/2 =lim(n->∞)1-n^1/6*(n^1/2-1)/n^1/4*(n^1/2+3) =lim(n->∞)1-n^1/6*n^1/2/n^1/4*n^1/2 =lim(n->∞)1-1/(n^1/12) =1.所以lim(n->∞)(n+3*n^1/2)^1/2-(n-n^1/2)^1/3 =lim(n->∞)(n+3*n^1/2)^1/2 =∞.

证明不等式:(1/n)^n+(2/n)^n+(3/n)^n+.+(n/n)^n 2^n/n*(n+1) [3n(n+1)+n(n+1)(2n+1)]/6+n(n+2)化简 [3n(n+1)+n(n+1)(2n+1)]/6+n(n+2)化简 化简n分之n-1+n分之n-2+n分之n-3+.+n分之1 化简n分之n-1+n分之n-2+n分之n-3+.+n分之1 化简(n+1)(n+2)(n+3) 当n为正偶数,求证n/(n-1)+n(n-2)/(n-1)(n-3)+...+n(n-2).2/(n-1)(n-3)...1=n (n+2)!/(n+1)! lim2^n +3^n/2^n+1+3^n+1 3(n-1)(n+3)-2(n-5)(n-2) n(n+1)(n+2)(n+3)+1 因式分解 n(n+1)(n+2)(n+3)+1等于多少 lim(n+3)(4-n)/(n-1)(3-2n) lim(n^3+n)/(n^4-3n^2+1) lim[(n+3)/(n+1))]^(n-2) 【n无穷大】 lim(2^n+3^n)^1 (n趋向无穷) 级数n/(n+1)(n+2)(n+3)和是多少