MathDB

expected value of sum equals integral

Source: Putnam 1989 B6

August 27, 2021

probabilityexpected valuecalculusintegration

Problem Statement

Let

(x_1,x_2,\ldots,x_n)

be a point chosen at random in the

n

-dimensional region defined by

0<x_1<x_2<\ldots<x_n<1

, denoting

x_0=0

and

x_{n+1}=1

. Let

f

be a continuous function on

[0,1]

with

f(1)=0

. Show that the expected value of the sum

\sum_{i=0}^n(x_{i+1}-x_i)f(x_{i+1})

is

\int^1_0f(t)P(t)dt

., where

P

is a polynomial of degree

n

, independent of

f

, with

0\le P(t)\le1

for

0\le t\le1

.

Back to Problems View on AoPS