The discussion revolves around minimizing the expected value of the absolute difference between a continuous random variable X, with median m, and a variable b. Participants explore the expression for E[|X - b|] and its relationship to the median.
There is ongoing exploration of the integral's behavior and its impact on the minimization process. Some participants express confusion about the role of the constant factor in the integral, while others provide hints and guidance to clarify the reasoning involved.
Participants note the absence of a specific function f(x), which complicates the evaluation of the integral. The discussion emphasizes the general nature of the problem rather than focusing on a particular case.
cielo said:Homework Statement
Let X be a continuous random variable with median m.
Minimize E[|X - b|] as a function of b. Hint: Show that E[|X - b|] = E[|X - m|] + 2 \int (x - b) f(x) dx , where the integral is from b to m.
Homework Equations
The Attempt at a Solution
I wanted to try a solution but I even don't know how to determine whether it is minimum or not. Please help.
statdad said:Can you show the expression given above? If so, what do you know about the sign of
<br /> \int_b^m (x-b) f(x) \, dx<br />
Finally, note that the right-side is a function of the number b. What happens when you evaluate at that function at a (cleverly) chosen value?
statdad said:Aaaaah, that's the point: if you were given a specific f(x), any result you obtained would apply only to that particular function , not in general. This exercise is meant to give a general result.
Hint: In the integral
<br /> \int_a^m (x-b) f(x) \, dx<br />
the interval of integration consists of values x \ge b, so
i) What is the sign of (x-b)f(x) over the interval?
ii) What does this say about the sign of the integral of (x-b)f(x)?
iii) Using your answers to `i' and `ii'', if you want to choose b to minimize
<br /> E(|X-m|) + 2 \int_b^m (x-b) f(x) \, dx<br />
as a function of b, what choice does it?