A couple decides to have 4 children. If they succeed in having 4 children and each child is equally likely to be a boy or a girl, what is the probability that they will have exactly 2 girls and 2 boys?
a) 3/8
b) 1/4
c) 3/16
d) 1/8
e) 1/16
answer A
Thanks!
Probability: Boy or Girl?
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Each child has 2 options being a boy or a girl.
So total number of outcomes = 2* 2 * 2 * 2 =16.
Number of ways in which 4 children will have 2 boys and 2 girls = 4!/2!* 2! = 6.
So,
Probability = 6/16 =3/8
QA is A.
So total number of outcomes = 2* 2 * 2 * 2 =16.
Number of ways in which 4 children will have 2 boys and 2 girls = 4!/2!* 2! = 6.
So,
Probability = 6/16 =3/8
QA is A.
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Total no. of outcomes = 2^4joconnor wrote:A couple decides to have 4 children. If they succeed in having 4 children and each child is equally likely to be a boy or a girl, what is the probability that they will have exactly 2 girls and 2 boys?
a) 3/8
b) 1/4
c) 3/16
d) 1/8
e) 1/16
answer A
Thanks!
Possibility of 2 girls and 2 boys = 4!/2!*2! = 6
Therefore, required probability = 6/2^4 = [spoiler]3/8[/spoiler]
The correct answer is A.
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Hello Sir,
Could you please elaborate this statement?
Can you please post some more logic and how to solve such type of questions?
Could you please elaborate this statement?
I think the statement goes like this total permutations/[Number of ways in which two girls can be arranged * Number of ways in which 2 boys can be arranged].Possibility of 2 girls and 2 boys = 4!/2!*2! = 6
Can you please post some more logic and how to solve such type of questions?
Regards,
Pranay
Pranay
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probability of having a boy = 1/2
probability of having a girl= 1/2
so probability of having 2 boys and 2 girls is (1/2)^4
but it be arranged in 4!/2!2!, since we have 2 identical cases i.e 2 boys and 2 girls.
so final answer is (1/16)X(4!/2!2!) which comes out be 3/8.
hence A
probability of having a girl= 1/2
so probability of having 2 boys and 2 girls is (1/2)^4
but it be arranged in 4!/2!2!, since we have 2 identical cases i.e 2 boys and 2 girls.
so final answer is (1/16)X(4!/2!2!) which comes out be 3/8.
hence A
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Hi Anurag,Anurag@Gurome wrote:Total no. of outcomes = 2^4joconnor wrote:A couple decides to have 4 children. If they succeed in having 4 children and each child is equally likely to be a boy or a girl, what is the probability that they will have exactly 2 girls and 2 boys?
a) 3/8
b) 1/4
c) 3/16
d) 1/8
e) 1/16
answer A
Thanks!
Possibility of 2 girls and 2 boys = 4!/2!*2! = 6
Therefore, required probability = 6/2^4 = [spoiler]3/8[/spoiler]
The correct answer is A.
Please explain the error in my approach
The couple can have
1. 4B,0G
2. 3B,1G
3. 2B,2G
4. 1B,3G
5. 0B,4G
So we have one favorable case out of these 5. So probability is 1/5
Please help
Regards,
Vishal
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hey Vishal, i think once you've asked this question on the forum or may be someone else has asked the same question. I remember this kind of query coming on from a member
anyways, you pre-arranged the sets here by saying 1 boy and three girls or two boys and two girls
these are not total possible outcomes but rather the sets pre-arranged by you
Plz compare children A,B,C,D may be borne with two independent gender type - male or female
when you say two boys and two girls it's not one outcome, but this is one event
the no of outcomes for this event is 6, two boys and two girls can be formed AB, CD, AD, AC, BD, BC
the same way all your events one boy and three girls -> no of outcomes would be 4C3
all four boys or girls 4C4
anyways, you need to understand the difference between event and outcome here
quit boys and girls, consider each child as a coin and it may land tail/head when tossed - probability 1/2 (independence of events)
in any combination the set with probabilities (yes will be boy and no will not be boy) is 1/2 by 1/2 and so on. Hence 1/2*1/2*1/2*1/2 or (1/2)^4
How many outcomes are possible for two boys or two girls, select among four children 4C2 or 6 ways
6*(1/4)^4=3/8
anyways, you pre-arranged the sets here by saying 1 boy and three girls or two boys and two girls
these are not total possible outcomes but rather the sets pre-arranged by you
Plz compare children A,B,C,D may be borne with two independent gender type - male or female
when you say two boys and two girls it's not one outcome, but this is one event
the no of outcomes for this event is 6, two boys and two girls can be formed AB, CD, AD, AC, BD, BC
the same way all your events one boy and three girls -> no of outcomes would be 4C3
all four boys or girls 4C4
anyways, you need to understand the difference between event and outcome here
quit boys and girls, consider each child as a coin and it may land tail/head when tossed - probability 1/2 (independence of events)
in any combination the set with probabilities (yes will be boy and no will not be boy) is 1/2 by 1/2 and so on. Hence 1/2*1/2*1/2*1/2 or (1/2)^4
How many outcomes are possible for two boys or two girls, select among four children 4C2 or 6 ways
6*(1/4)^4=3/8
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Sample Space = 2^4( as each one can be either a boy or a girl)=16
Exactly 2 boys and exactly 2 girls in 4C2*2C2 ways = Event = 6
Required Probability = 6/16 = 3/8
Exactly 2 boys and exactly 2 girls in 4C2*2C2 ways = Event = 6
Required Probability = 6/16 = 3/8
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We can solve this question using counting methods.
P(exactly 2 girls and 2 boys) = (number of 4-baby outcomes with exactly 2 girls and 2 boys)/(TOTAL number of 4-baby outcomes)
As always, we'll begin with the denominator.
TOTAL number of 4-baby arrangements
There are 2 ways to have the first baby (boy or girl)
There are 2 ways to have the second baby (boy or girl)
There are 2 ways to have the third baby (boy or girl)
There are 2 ways to have the fourth baby (boy or girl)
By the Fundamental Counting Principle (FCP), the total number of 4-baby arrangements = (2)(2)(2)(2) = 16
Number of 4-baby outcomes with exactly 2 girls and 2 boys
This portion of the question boils down to "In how many different ways can we arrange 2 G's and 2 B's (where each G represents a girl, and each B represents a boy)?"
----------ASIDE-------------------------
When we want to arrange a group of items in which some of the items are identical, we can use something called the MISSISSIPPI rule. It goes like this:
If there are n objects where A of them are alike, another B of them are alike, another C of them are alike, and so on, then the total number of possible arrangements = n!/[(A!)(B!)(C!)....]
So, for example, we can calculate the number of arrangements of the letters in MISSISSIPPI as follows:
There are 11 letters in total
There are 4 identical I's
There are 4 identical S's
There are 2 identical P's
So, the total number of possible arrangements = 11!/[(4!)(4!)(2!)]
------------BACK TO THE QUESTION---------------------------
Our goal is to arrange the letters G, G, B, and B
There are 4 letters in total
There are 2 identical G's
There are 2 identical B's
So, the total number of possible arrangements = 4!/[(2!)(2!)] = 6
So.....
P(exactly 2 girls and 2 boys) = 6/16 = 3/8
Answer: A