f(k) = 1/ [√k(k+1) *(√k+√k+1) = (√k+1 - √k) / √k*√(k+1) = 1/√k - 1/√k+1
所以
f(1)+f(2)+.+f(n)
=1-1/√2+1/√2-1/√3+.+1/√n - 1/√(n+1)
=1-1/√(n+1)
设f(k)=1/(k+1)√k+k√k+1,k∈N*,求f(1)+f(2)+f(3)+.+f(n)
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