神马作文网计算lim(n→∞) ∑上n 下k=1 (k+2)/[k!+(K+1)!+(K+2)!]
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计算lim(n→∞) ∑上n 下k=1 (k+2)/[k!+(K+1)!+(K+2)!]
![计算lim(n→∞) ∑上n 下k=1 (k+2)/[k!+(K+1)!+(K+2)!]](/uploads/image/z/16864618-58-8.jpg?t=%E8%AE%A1%E7%AE%97lim%28n%E2%86%92%E2%88%9E%29+%E2%88%91%E4%B8%8An+%E4%B8%8Bk%3D1+%28k%2B2%29%2F%5Bk%21%2B%28K%2B1%29%21%2B%28K%2B2%29%21%5D)
原式=∑(k+2)/[k!(1+k+1+(k+1)(k+2)]=∑1/(k!(k+2))
令S(x)=∑1/k!(k+2)*x^(k+2) ,显然S(0)=0
S'(x)=∑1/k!x^(k+1)=x∑1/k!*x^k
=x(e^x-1)
S(X)=∫x(e^x-1)dx=∫xe^xdx-∫xdx
=xe^x-e^x-x^2/2+c
S(0)=-1+C=0
∴C=1
S(X)=xe^x-e^x-x^2/2+1
令x=1得
原级数=e-e-1/2+1=1/2
令S(x)=∑1/k!(k+2)*x^(k+2) ,显然S(0)=0
S'(x)=∑1/k!x^(k+1)=x∑1/k!*x^k
=x(e^x-1)
S(X)=∫x(e^x-1)dx=∫xe^xdx-∫xdx
=xe^x-e^x-x^2/2+c
S(0)=-1+C=0
∴C=1
S(X)=xe^x-e^x-x^2/2+1
令x=1得
原级数=e-e-1/2+1=1/2
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