MathDB

Problem 1

Part of 2010 SEEMOUS

Problems(1)

function sequence, n-repeated integral

Source: SEEMOUS 2010 P1

6/17/2021
Let f0:[0,1]Rf_0:[0,1]\to\mathbb R be a continuous function. Define the sequence of functions fn:[0,1]Rf_n:[0,1]\to\mathbb R by fn(x)=0xfn1(t)dtf_n(x)=\int^x_0f_{n-1}(t)dt for all integers n1n\ge1.
a) Prove that the series n=1fn(x)\sum_{n=1}^\infty f_n(x) is convergent for every x[0,1]x\in[0,1]. b) Find an explicit formula for the sum of the series n=1fn(x),x[0,1]\sum_{n=1}^\infty f_n(x),x\in[0,1].
functionConvergenceSequencesintegrationcalculus