Defective parts

lindah · 2011-06-07 21:13:16

http://imageshack.us/photo/my-images/688/68986489.png/

Hi guys,

Please ignore part a)
Sorry for the stream of questions, I'm completing a past paper that does not have answers - so trying the bets I can

With part b) may I confirm if my work is correct:

I've decided to take the complement (1 - sample of 3 having no defective items)

I calculated this as

If this is correct, what would be the method using binomial probability?

Thanks
Lin

bobbym · 2011-06-07 21:39:28

Hi lindah;

I am getting 61 / 125 using the binomial distribution.

Something you can do to make your questions a little easier is to
encase your addresses like this.

[url]http://imageshack.us/photo/my-images/688/68986489.png/[/url]

Then they will post as live links.

lindah · 2011-06-07 22:35:04

Hi bobbym,

Thanks for the tip, I've updated all my posts.

I initially did it per your answer, but it seems with probability questions I over think it.

So is the rationale behind this:
p=1 out of 5 chance of obtaining a defective part from the sample

For the 3 parts chosen, the possible combinations with at least one defective part is:

bobbym · 2011-06-07 22:55:02

Yes, it seems they are saying there are 5 defective in the 25.

Whoa! Hold on here! You should be able to see why my answer is wrong!

lindah · 2011-06-07 23:02:26

Should the combination be from 5 defective parts rather than 3?

bobbym · 2011-06-07 23:08:10

Actually your answer was correct and mine is wrong due to the fact that this is not a binomial distribution problem! When you pick a part to test, you do not replace it. Therefore this is a hypergeomtric distribution and your answer in post #1, although different than the way I would calculate it, is correct.

The easiest way to calculate your answer is

lindah · 2011-06-07 23:21:52

bobbym,

Unless its too much work, could you possibly share with me how you would calculate it?

bobbym · 2011-06-07 23:23:32

Hi lindah;

It is all there in post #6. Can you follow that?

Is it clear, because I think that is the easiest.

By the way, very good for having the right answer!

lindah · 2011-06-08 00:00:38

Hi bobby,

Yes, that's very clear! I knew I'd learn a better way off you.
Thanks very much!!!

bobbym · 2011-06-08 00:07:52

Your welcome. Sorry for the confusion but at first I thought it was a binomial problem too.

Math Is Fun Forum

#1 2011-06-07 21:13:16

Defective parts

#2 2011-06-07 21:39:28

Re: Defective parts

#3 2011-06-07 22:35:04

Re: Defective parts

#4 2011-06-07 22:55:02

Re: Defective parts

#5 2011-06-07 23:02:26

Re: Defective parts

#6 2011-06-07 23:08:10

Re: Defective parts

#7 2011-06-07 23:21:52

Re: Defective parts

#8 2011-06-07 23:23:32

Re: Defective parts

#9 2011-06-08 00:00:38

Re: Defective parts

#10 2011-06-08 00:07:52

Re: Defective parts

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