Chebyshev's Inequality

[jatboy]

An industry consists of 5 companies and their P/E ratios are;-
10,12,14,14,50
The arithmetic mean of these P/E ratios is 20 and the standard deviation is 15.07.At least what %of the population wuill have a P/E ratio that is b/W 1.25 standard deviations on the either of the mean;in other words,B/W 1.16 and 38.84?
I am getting confused with this calculation.
How did we arrive on the range(1.16-38.84)?.
How do we calculate it when we have the standard deviation and the mean?
Please help.
Thanks

 

[AndrewP]

Chebyshev’s: 1-1/k^2
=1-1/15.07^2
= 1- .0044
= 99.56% of all observations lie within 15.07 standard deviations of the mean.
Interval around the sample mean: mean +/- 1.25s
=20 +/- 1.25(15.07)
= [1.17, 38.83]
99% of all observations fall within the range [1.17, 38.83]

 

[jatboy]

AndrewP….can’t thank u enough
Appreciate ur help

 

[jatboy]

But 80% of the observations fall within 1.16-38.83 not 99,right?

 

[AndrewP]

For k= 1.25, at least 36% of the observations must lie within 1.25 standard deviations of the mean. In other words, 36% of the population (5) will fall within the interval [1.17, 38.83].

 

[jatboy]

Got it…..but my only concern now is that –y did u mention that 99% of observations fall within the range 1.16-38.83?
Thanks again

 

[AndrewP]

Because if f’d up (flubbed the input for k).

 

[diggles14]

The arithmetic mean of these P/E ratios is 20 and the standard deviation is 15.07.At least what %of the population wuill have a P/E ratio that is b/W 1.25 standard deviations on the either of the mean;in other words,B/W 1.16 and 38.84?
The 1.16 and 38.84 come from mean +/- std deviation * # of standard deviations above/below
ie. 20+/-1.25*15.07 = 38.84, 1.16
so the result of the Chebyshev inequality tells you the minimum % of solutions that are between 1.16 and 38.84
Hope this helps.

 

[gauravthapa]

=1-1/K^2
=1-1/1.25^2
=36percent
EASY

 

[diggles14]

haha the answer to the question is easy, but the answer to his question “How did we arrive on the range(1.16-38.84)?.” is worth discussing.

 

[jatboy]

AndrewP Wrote:
——————————————————-
> Chebyshev’s: 1-1/k^2
>
> =1-1/15.07^2
>
> = 1- .0044
>
> = 99.56% of all observations lie within 15.07
> standard deviations of the mean.
>
> Interval around the sample mean: mean +/- 1.25s
>
> =20 +/- 1.25(15.07)
>
> = [1.17, 38.83]
>
> 99% of all observations fall within the range
> [1.17, 38.83]
Thank u guys……appreciate it……now that i have understoof this inequality……..i am still stuck on this…….Why 99% of all observations will fall within this range?……….would anyone of u be so kind to answer this?
Thanks again

 

[AndrewP]

It’s not 99%. It was a mistake. It is indeed at minimum 36%. Obviously from observing such a small population one of the variables falls outside of the interval. It speaks to the limitations posed by the inequality.

 

[jatboy]

Thank u AndrewP…..i hope u didn’t took offense of this……..i was just curious.

 

[AndrewP]

I welcome the chance to clarify my feck ups.