• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

MX2 Marathon (1 Viewer)

TheOnePheeph

Active Member
Joined
Dec 13, 2018
Messages
241
Gender
Male
HSC
2019
It shouldn't be exactly 0.5, since they flip a different number of coins.
There are two cases to consider: Ben obtains more tails than Amy, or Ben obtains more heads than Amy. Since it is a fair coin, these two cases have the same probability, by symmetry. That means that the probability that Ben obtains more heads is exactly a half. This can also be proven using binomial theorem, which is attached below (This way is unnecessarily long and complex, I just wanted an extra proof to back my case up. Note I also may have made a mistake in it, I just quickly wrote it up tonight).
 

Attachments

TheOnePheeph

Active Member
Joined
Dec 13, 2018
Messages
241
Gender
Male
HSC
2019
Hm, but if we take a more extreme example: If Amy flips 1 coin and Ben flips 100 coins, then the probability of Ben flipping more heads than Amy would be almost 100% wouldn't it? Or is this 50% result only true for n, n+1 flips?
Yeah I believe it only works for n, (n+1). Because if you take, for example n, (n+2), then it is possible for Ben to have more tails and more heads that Amy, adding a complete new case. Since there are more cases to consider here than just having more heads or more tails, the probability will not be exactly a half. Same thing applies to n+3, n+4 etc.
 
Last edited:

TheOnePheeph

Active Member
Joined
Dec 13, 2018
Messages
241
Gender
Male
HSC
2019
Yeh that's what I was originally thinking, I just extrapolated (albeit incorrectly) based on the extreme scenario. Good problem nonetheless, shows that it's counterintuitive (or intuitive?) for n, n+1.
Yeah I didn't think it was gonna be 1/2 initially either. I ended up coming up with that evil binomial theorem solution,which resulted in 1/2, and then figured out why it worked from there. Now I have wasted my Tuesday night lol.
 

sharky564

Member
Joined
Jul 15, 2016
Messages
59
Location
Null
Gender
Male
HSC
2019
Yeh that's what I was originally thinking, I just extrapolated (albeit incorrectly) based on the extreme scenario. Good problem nonetheless, shows that it's counterintuitive (or intuitive?) for n, n+1.
Yeah I didn't think it was gonna be 1/2 initially either. I ended up coming up with that evil binomial theorem solution,which resulted in 1/2, and then figured out why it worked from there. Now I have wasted my Tuesday night lol.
I thought this was a very nice problem outlining the utility of symmetry:

 

sharky564

Member
Joined
Jul 15, 2016
Messages
59
Location
Null
Gender
Male
HSC
2019
There are two cases to consider: Ben obtains more tails than Amy, or Ben obtains more heads than Amy. Since it is a fair coin, these two cases have the same probability, by symmetry. That means that the probability that Ben obtains more heads is exactly a half. This can also be proven using binomial theorem, which is attached below (This way is unnecessarily long and complex, I just wanted an extra proof to back my case up. Note I also may have made a mistake in it, I just quickly wrote it up tonight).
Your symmetry argument unfortunately fails, as pointed out by blyatman.

I gave this prob to my year's 4u class and most agreed this answer made sense at an intuitive level, but proving it rigorously was much more of a struggle.
 

TheOnePheeph

Active Member
Joined
Dec 13, 2018
Messages
241
Gender
Male
HSC
2019
Your symmetry argument unfortunately fails, as pointed out by blyatman.

I gave this prob to my year's 4u class and most agreed this answer made sense at an intuitive level, but proving it rigorously was much more of a struggle.
Wait sorry why does this argument fail? There are only two possible cases: Ben flips more heads than Amy or Ben flips more tails than Amy, and the 2nd case obviously includes the circumstances where Ben gets the same amount of heads as Amy, as he would have to have more tails then. Then since heads and tails have the same probability, the two cases would have to be equal probability, making the probability 1/2. True straight up saying it is symmetrical is flawed, but I think this way makes sense, unless I'm missing something crucial lol.
 

sharky564

Member
Joined
Jul 15, 2016
Messages
59
Location
Null
Gender
Male
HSC
2019
Wait sorry why does this argument fail? There are only two possible cases: Ben flips more heads than Amy or Ben flips more tails than Amy, and the 2nd case obviously includes the circumstances where Ben gets the same amount of heads as Amy, as he would have to have more tails then. Then since heads and tails have the same probability, the two cases would have to be equal probability, making the probability 1/2. True straight up saying it is symmetrical is flawed, but I think this way makes sense, unless I'm missing something crucial lol.
No, you can have the case where they flip the same number of Heads.
 

TheOnePheeph

Active Member
Joined
Dec 13, 2018
Messages
241
Gender
Male
HSC
2019
No, you can have the case where they flip the same number of Heads.
But if they flip the same number of heads, then Ben will flip more tails, since he flips n+1 coins and Amy only flips n, therefore putting it in the 2nd case of Ben flipping more tails than Amy.
 

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
Wow! Great to see that this part of the community is still up and running. Keep it up everybody, you're all doing a great job <3
 

Skuxxgolfer

Member
Joined
Aug 13, 2018
Messages
35
Gender
Male
HSC
N/A
If 10 coins are tossed 50 times, in how many cases would we expect the number of heads to exceed the number of tails?
 

DrEuler

Member
Joined
Jul 7, 2018
Messages
73
Gender
Male
HSC
N/A
Love seeing debates about Mathematics lol, reminds me of when my schools math department and me had a huge debate in which I ended up proving a question wrong in our trial.
 

TheOnePheeph

Active Member
Joined
Dec 13, 2018
Messages
241
Gender
Male
HSC
2019
Love seeing debates about Mathematics lol, reminds me of when my schools math department and me had a huge debate in which I ended up proving a question wrong in our trial.
Lol I feel like such a dick arguing about maths, especially on a public forum haha. Fun nonetheless, and definitely worth it if you end up proving a question wrong.
 

DrEuler

Member
Joined
Jul 7, 2018
Messages
73
Gender
Male
HSC
N/A
Lol I feel like such a dick arguing about maths, especially on a public forum haha. Fun nonetheless, and definitely worth it if you end up proving a question wrong.
No it's such a good thing. Debating about it really opens up your mind to others viewpoints and it can be quite beneficial for your understanding..
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top