求大神来解答高数题目
2020-05-09
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f(x) = ln(a+x) , a > 0
f'(x) = 1/(a+x) = (1/a)/(1+x/a) = (1/a)∑<n=0,∞>(-1)^内n(x/a)^n
= ∑<n=0,∞>[(-1)^n/a^(n+1)]x^n
f(x) = ∫<0, x>f'(t)dt + f(0)
= lna + ∑<n=0,∞>[(-1)^n/a^(n+1)]x^(n+1)/(n+1)
收敛域 -1 < x/a < 1, -a < x < a。
2. g(x) = (1/2)[e^x-e^(-x)]
= (1/2)[∑<n=0,∞>x^n/n!容 - ∑<n=0,∞>(-x)^n/n!]
= x/1! + x^3/3! + x^5/5! + ...... + x^(2k+1)/(2k+1)! + ......
= ∑<n=0,∞>x^(2n+1)/(2n+1)!,
收敛域: -∞ < x < +∞明白了吗?不明白找楼下给你解答
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1. f(x) = ln(a+x) , a > 0
f'(x) = 1/(a+x) = (1/a)/(1+x/a) = (1/a)∑<n=0,∞>(-1)^n(x/a)^n
= ∑<n=0,∞>[(-1)^n/a^(n+1)]x^n
f(x) = ∫<0, x>f'(t)dt + f(0)
= lna + ∑<n=0,∞>[(-1)^n/a^(n+1)]x^(n+1)/(n+1)
收敛域 -1 < x/a < 1, -a < x < a。
2. g(x) = (1/2)[e^x-e^(-x)]
= (1/2)[∑<n=0,∞>x^n/n! - ∑<n=0,∞>(-x)^n/n!]
= x/1! + x^3/3! + x^5/5! + ...... + x^(2k+1)/(2k+1)! + ......
= ∑<n=0,∞>x^(2n+1)/(2n+1)!,
收敛域: -∞ < x < +∞
f'(x) = 1/(a+x) = (1/a)/(1+x/a) = (1/a)∑<n=0,∞>(-1)^n(x/a)^n
= ∑<n=0,∞>[(-1)^n/a^(n+1)]x^n
f(x) = ∫<0, x>f'(t)dt + f(0)
= lna + ∑<n=0,∞>[(-1)^n/a^(n+1)]x^(n+1)/(n+1)
收敛域 -1 < x/a < 1, -a < x < a。
2. g(x) = (1/2)[e^x-e^(-x)]
= (1/2)[∑<n=0,∞>x^n/n! - ∑<n=0,∞>(-x)^n/n!]
= x/1! + x^3/3! + x^5/5! + ...... + x^(2k+1)/(2k+1)! + ......
= ∑<n=0,∞>x^(2n+1)/(2n+1)!,
收敛域: -∞ < x < +∞
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