Let X be a random variable with V(X)=25

Vincent Norman

Vincent Norman

Answered question

2022-10-16

Let X be a random variable with V ( X ) = 25
It also satisfies P ( X > 20 ) > 1 4
Which of the following is true?
- E ( X ) > 10
- 5 < E ( X ) 10
- 0 < E ( X ) 5
- E ( X ) 0
I tried using Chebyshev's inequality and found out that E ( X ) > 5 but wasn't sure how to go on about it.

Answer & Explanation

occuffick24

occuffick24

Beginner2022-10-17Added 13 answers

Step 1
As a fairly major hint, you should use Chebyshev's inequality to show
E X c V X P ( X c )
Step 2
(provided P ( X c ) 0)
ajanlr

ajanlr

Beginner2022-10-18Added 2 answers

Step 1
There cannot be an upper limit on E(X) - for example there is nothing to stop the distribution being centred around 100 or 1000. So option A is the only possibility.
Step 2
We can check option A by trying to make E(X) as small as possible. Put p ( X = 20 ) = 0.25 and p ( X = a ) = 0.75. Then
E ( X ) = 0.25 20 + 0.75 a = 5 + 0.75 a
E ( X 2 ) = 0.25 20 2 + 0.75 a 2 = 100 + 0.75 a 2
V a r ( X ) = 100 + 0.75 a 2 ( 5 + 0.75 a ) 2 = 25
which gives a 8.45 and E ( X ) 11.3. So option A is satisfied.

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