Maths- Need help Q related to Prob (1 Viewer)

Saturn WY15

Member
Joined
May 21, 2010
Messages
129
Gender
Male
HSC
2012
Hi

I need help in solving this question

"A class of twenty people are all born in the same year. Find the probability that atleast two people are born on the same day"

Please provide explanation and steps

Thanks You
W.Y
 

random-1006

Banned
Joined
Jun 25, 2010
Messages
988
Gender
Male
HSC
2009
Hi

I need help in solving this question

"A class of twenty people are all born in the same year. Find the probability that atleast two people are born on the same day"

Please provide explanation and steps

Thanks You
W.Y

this is a classic question!!

probability ( atleast two born on same day) = 1 - probability(none born on same day)

{common technique with "atleast" questions}

prob ( none born same day ) = 365/365 x 364/ 365 x 363/ 365 x ..... 345/365 ( 20 terms )

assuming 365 days to a year.

the first person can be any day, the next person can be any day BUT the day of the first person, the third person can be any day BUT those of the first and second people etc.

since we want the second person AND the third person AND the fourth etc. to all be different to the first we multiply probabilities

REMEMBER WITH PROBABILITY:

"AND" means multiply
"OR" means add

im not going to evaluate it but interestingly it turns out to be more than 50% ( pretty close to it), seems kinda strange aye
 
Last edited:

random-1006

Banned
Joined
Jun 25, 2010
Messages
988
Gender
Male
HSC
2009
I think the above answer is wrong
im fairly sure its right, 20 people, first person is any day, the second person should be a different day (ie 364 ways out of 365 ways that are acceptable) , third person a different day again etc.
then 1- (all of that mulitplied) should be the answer
 

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
im fairly sure its right, 20 people, first person is any day, the second person should be a different day, third person a different day again etc.
then 1- (all of that mulitplied) should be the answer
Not that. P(X>=2)=1-(P(X=0)+P(X=1))
 

random-1006

Banned
Joined
Jun 25, 2010
Messages
988
Gender
Male
HSC
2009
Not that. P(X>=2)=1-(P(X=0)+P(X=1))

this isnt a binomial probability question, but any way you do it , it will come out with the same final answer

there is no such thing as "one success" ( well probably for one), or "zero success" ( but not for zero, we dont know what date we should be matching until we know what dates there are), remember we want a PAIR, thats it
 
Last edited:

ibbi00

Member
Joined
Sep 6, 2009
Messages
771
Gender
Male
HSC
2010
it is a 2 unit question, maybe a slightly harder one, but the concepts are fairly basic

no, unforunately you have to plug in 20 values on calculator, nothing you can do about it
Just the prospect of inputting all said calculations in a calculator is enough for a rational person to skip the question.
 

random-1006

Banned
Joined
Jun 25, 2010
Messages
988
Gender
Male
HSC
2009
Just the prospect of inputting all said calculations in a calculator is enough for a rational person to skip the question.
its a shame, its not like its an AP or GP , or anything that can be written as a sum of AP and a GP , then you could use those sum formulas

EDIT: you could enter it as 1 - { [ 365! / 344!] / (365)^20 }, i think that should be it

but you have to know what factorials are ( 3 unit) , and must put the brackets EXACTLY where i have
 
Last edited:

ibbi00

Member
Joined
Sep 6, 2009
Messages
771
Gender
Male
HSC
2010
Oh I see. I knew these '!' weren't so useless after all xD.
 
Last edited:

Reanna

Member
Joined
Jan 31, 2009
Messages
76
Gender
Female
HSC
2010
this is a classic question!!

probability ( atleast two born on same day) = 1 - probability(none born on same day)

{common technique with "atleast" questions}

prob ( none born same day ) = 365/365 x 364/ 365 x 363/ 365 x ..... 345/365 ( 20 terms )

assuming 365 days to a year.

the first person can be any day, the next person can be any day BUT the day of the first person, the third person can be any day BUT those of the first and second people etc.

since we want the second person AND the third person AND the fourth etc. to all be different to the first we multiply probabilities

REMEMBER WITH PROBABILITY:

"AND" means multiply
"OR" means add

im not going to evaluate it but interestingly it turns out to be more than 50% ( pretty close to it), seems kinda strange aye

^^^^^^^^^^^this answer is right!!! ^^^^^^^^^^

this isnt a 3-unit question just advanced

it is not P(>2) = P(0) + P(1) or whatever was suggested
 

random-1006

Banned
Joined
Jun 25, 2010
Messages
988
Gender
Male
HSC
2009
^^^^^^^^^^^this answer is right!!! ^^^^^^^^^^

this isnt a 3-unit question just advanced

it is not P(>2) = P(0) + P(1) or whatever was suggested
it is a semi understandable mistake ( even though a quick glance at the question would have revealed that this is question is NO WHERE near the format of binomial probability questions, binomial probability questions have a DISTINCTIVE format) , but thats the thing when you do 4 unit maths, if they put a lot of HARD 2 unit questions in the four unit hsc i reckon a fair few would lose marks ( thus why they are not the most suitable people to ask about 2 unit questions), because they dont have to sit a 2 unit paper many of them dont know their 2 unit stuff too well.

Moral of the story : just because you do four unit doesnt mean your shit hot at maths, lots will not be able to do 2 unit questions
 
Last edited:

Saturn WY15

Member
Joined
May 21, 2010
Messages
129
Gender
Male
HSC
2012
this is a classic question!!

probability ( atleast two born on same day) = 1 - probability(none born on same day)

{common technique with "atleast" questions}

prob ( none born same day ) = 365/365 x 364/ 365 x 363/ 365 x ..... 345/365 ( 20 terms )

assuming 365 days to a year.

the first person can be any day, the next person can be any day BUT the day of the first person, the third person can be any day BUT those of the first and second people etc.

since we want the second person AND the third person AND the fourth etc. to all be different to the first we multiply probabilities

REMEMBER WITH PROBABILITY:

"AND" means multiply
"OR" means add

im not going to evaluate it but interestingly it turns out to be more than 50% ( pretty close to it), seems kinda strange aye
Darn, (thump my head) i cant believe it, the classic complementary event so obvious

Yep ur correct, answer is 57.1982416 %( i think i plug in right and yes its seems quite strange)

Well Thanks everyone for the contribution, i post some more question :angel:
 

Affinity

Active Member
Joined
Jun 9, 2003
Messages
2,062
Location
Oslo
Gender
Undisclosed
HSC
2003
this is a classic question!!

probability ( atleast two born on same day) = 1 - probability(none born on same day)

{common technique with "atleast" questions}

prob ( none born same day ) = 365/365 x 364/ 365 x 363/ 365 x ..... 345/365 ( 20 terms )

assuming 365 days to a year.

the first person can be any day, the next person can be any day BUT the day of the first person, the third person can be any day BUT those of the first and second people etc.

since we want the second person AND the third person AND the fourth etc. to all be different to the first we multiply probabilities

REMEMBER WITH PROBABILITY:

"AND" means multiply
"OR" means add

im not going to evaluate it but interestingly it turns out to be more than 50% ( pretty close to it), seems kinda strange aye
Problem:
365/365 x 364/ 365 x 363/ 365 x ..... 346/365
I think why you get flamed by jm01 is that you sound cocky
 

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

Top