Help with Binomial Maths? xD

[Cookeh]

Anyone one able to work out the following binomial distribution question? Its had me stumped for ages

"Some eggs sold in a store are packed in boxes of 10. For any egg, the probability that it is is cracked is 0.05, independently of all other eggs. Calculate the expected number of cracked eggs in a box."

I got as far as C~B(10, 0.05) where C = cracked eggs. But stumped from there

Please dont spam saying Im dense or anything similar

Thanks in advance,
Cookeh

 

[AJK]

Taken literally the answer is 10, since the question doesn't ask for the expected number of uncracked eggs in a box.

 

[Cookeh]

Taken literally the answer is 10, since the question doesn't ask for the expected number of uncracked eggs in a box.

Sorreh! I really am dense xD
Fixed for correctness

 

[G-Dubs]

Never heard of binomunal maths, so guess this is "probably" wrong, the probability of a cracked egg is 5% which would be easy if there were 20 eggs in a basket (1 egg cracked)

So number of eggs cracked = 1/2 of an egg

That's about as far as I can get yer buddy.

 

[Biohazard]

that would be an ecumenical matter

 

[Cookeh]

Never heard of binomunal maths, so guess this is "probably" wrong, the probability of a cracked egg is 5% which would be easy if there were 20 eggs in a basket (1 egg cracked)

So number of eggs cracked = 1/2 of an egg

That's about as far as I can get yer buddy.

I arrived there.
But not 100% sure of it.
And its A2 level stuff, think its fairly new to the syllabus?

 

[Pudney]

I did binomial maths in my A-Level maths. That was ages ago though, I do remember it was pretty easy to me (but Stats was my best area of maths by far). However, this has been entirely unhelpful to you, apologies!

 

[Mansize_tissue]

Finding the expectation when dealing with the binomial distribution simply involves multiplying the number of things by the probability

E(X) = np = 10*0.05 = 0.5

 

[Cookeh]

I did binomial maths in my A-Level maths. That was ages ago though, I do remember it was pretty easy to me (but Stats was my best area of maths by far). However, this has been entirely unhelpful to you, apologies!

lol, no problem at all xD
This is oddly the only thing I have yet to struggle with at maths /:

Finding the expectation when dealing with the binomial distribution simply involves multiplying the number of things by the probability

E(X) = np = 10*0.05 = 0.5

Awesome, thanks. Didnt think it would be that easy

 

[Pudney]

See, told you Stats is easy.

 

[Hxc]

Do remember that with binomial you will have to have a posh calculator or use the tables if you are working out culumative binomial (ie, what is the chance of 5 or less being cracked) probability, unless you want to spend ages on a normal calc

Stats is however, easy!

 

[Cookeh]

See, told you Stats is easy.

Can I ask you guys another question on it then? xD

 

[sigma]

Combinations and permuations are where it's at - although not in this case heh.

 

[G-Dubs]

Never heard of binomunal maths, so guess this is "probably" wrong, the probability of a cracked egg is 5% which would be easy if there were 20 eggs in a basket (1 egg cracked)

So number of eggs cracked = 1/2 of an egg

That's about as far as I can get yer buddy.

So I was right?

Wow! Now why couldn't I do that 30 years ago?

 

[ordinaryjoe]

I can't think of why simply multiplying 0.05 by 10 would be incorrect but I would think the probability of no cracked eggs would be worked out by doing (1-0.05)^10, as the chance of the first egg being uncracked is 1 - 0.05 which is 0.95, then the probability of the first and second being uncracked would be 0.95^2 etc etc. This would give an answer of 0.599 to 3sf chance of no eggs being cracked. However, I can't think of a logical reason why simply multiplying 0.05 by 10 is wrong...

 

[iraiguana]

The independent portion of the question should rule out the above surely? ie each egg has its own probability and not dependant on a series of 10 eggs being found not cracked?

Or am I miles out here ?

 

[ordinaryjoe]

yes but if any of the previous eggs are cracked, it doesn't matter whether the next eggs are cracked or not (to find the probability of no eggs being cracked). Therefore, we only need to consider the probability of the next egg being cracked when none of the previous eggs are cracked. Think of it like this:

egg 1 cracked?? Yes --->At least 1 egg cracked (5% chance)
No (95% chance)
|
v
egg 2 cracked?? Yes --->At least 1 egg cracked (95% x 5% chance)
No (95% x 95% chance)
|
v
egg 3 cracked?? Yes --->At least 1 egg cracked (95% x 95% x 5% chance)
No (95% x 95% x 95% chance)
|
v
etc etc until egg 10 is not cracked

So the chances are 0.95^10

 

[Vampyre]

Never heard of binomunal maths, so guess this is "probably" wrong, the probability of a cracked egg is 5% which would be easy if there were 20 eggs in a basket (1 egg cracked)

So number of eggs cracked = 1/2 of an egg

That's about as far as I can get yer buddy.

Surely if half an egg is cracked then the whole egg is cracked, so the answer is clearly 0.1

 

[G-Dubs]

Surely if half an egg is cracked then the whole egg is cracked, so the answer is clearly 0.1

Just been to tesco and spent £20 on eggs. I've now had a go at over 300 eggs and I a can confirm that you cannot crack half an egg!!!

May have had a few beers also!