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Re: A fair coin is tossed 5 times. What is the probability of g [#permalink]
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(H)(H)(H)(ANY)(ANY), (ANY)(H)(H)(H)(ANY), (ANY)(ANY)(H)(H)(H) maps to combined probability (1/2)*(1/2)*(1/2)*(1)*(1) * 3 = 1/2.

I think you are correct!
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Re: A fair coin is tossed 5 times. What is the probability of g [#permalink]
GreenlightTestPrep wrote:
pranab01 wrote:
A fair coin is tossed 5 times. What is the probability of getting exactly 3 Heads in five consecutive flips.

enter your value

Show: ::
ans - 5/16


Let's examine ONE case in which we get exactly 3 heads: HHHTT

P(HHHTT) = (1/2)(1/2)(1/2)(1/2)(1/2) = 1/32

This, of course, is just ONE possible way to get exactly 3 heads.

Another possible outcome is HHTTH

Here, P(HHTTH) = (1/2)(1/2)(1/2)(1/2)(1/2) = 1/32

As you might guess, each possible outcome will have the same probability (1/32). So, the question becomes "In how many different ways can we get exactly 3 heads and 2 tails?"

In other words, in how many different ways can we arrange the letters HHHTT?

Well, we can apply the MISSISSIPPI rule (see video below) to see that the number of arrangements = 5!/(3!)(2!) = 10

So P(exactly 3 heads) = (1/32)(10) = 10/32 = 5/16

RELATED VIDEO


Would u like to explain the below problem as like as u solve the above?
A fair coin is tossed 5 times. What is the probability of getting at least three heads on consecutive tosses?
Specifically, I ask u coz I like ur every explanation so much.
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Re: A fair coin is tossed 5 times. What is the probability of g [#permalink]
1
huda wrote:
GreenlightTestPrep wrote:
pranab01 wrote:
A fair coin is tossed 5 times. What is the probability of getting exactly 3 Heads in five consecutive flips.

enter your value

Show: ::
ans - 5/16


Let's examine ONE case in which we get exactly 3 heads: HHHTT

P(HHHTT) = (1/2)(1/2)(1/2)(1/2)(1/2) = 1/32

This, of course, is just ONE possible way to get exactly 3 heads.

Another possible outcome is HHTTH

Here, P(HHTTH) = (1/2)(1/2)(1/2)(1/2)(1/2) = 1/32

As you might guess, each possible outcome will have the same probability (1/32). So, the question becomes "In how many different ways can we get exactly 3 heads and 2 tails?"

In other words, in how many different ways can we arrange the letters HHHTT?

Well, we can apply the MISSISSIPPI rule (see video below) to see that the number of arrangements = 5!/(3!)(2!) = 10

So P(exactly 3 heads) = (1/32)(10) = 10/32 = 5/16

RELATED VIDEO


Would u like to explain the below problem as like as u solve the above?
A fair coin is tossed 5 times. What is the probability of getting at least three heads on consecutive tosses?
Specifically, I ask u coz I like ur every explanation so much.


To answer this question, we must examine 3 cases:
P(exactly 3 heads) = A
P(exactly 4 heads) = B
P(exactly 5 heads) = C

So, P(at least three heads) = A + B + C
We already know (from above) that A = 5/16

All that's left is (exactly 4 heads) and (exactly 5 heads)
The steps for these are almost identical to the steps I took for (exactly 3 heads)

Give it a try, and I'll help out of needed.

Cheers,
Brent
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Re: A fair coin is tossed 5 times. What is the probability of g [#permalink]
Denominator: 2 elevated to 5.
Numerator: 5C3.

Divided and get the answer.
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Re: A fair coin is tossed 5 times. What is the probability of g [#permalink]
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Hi Brent,

I am stuck with the approach


Ques: A fair coin is tossed 5 times. What is the probability of getting at least three heads on consecutive tosses.

My take::

Probability of Head or Tails for each coin flip -> (1/2) Multiply by number of coin flips -> (1/2)(1/2)(1/2)(1/2)(1/2) = 1/32

Now we need to find the chance of getting three heads consecutively

So we have 8 scenarios where at LEAST three heads will occur consecutively -> HHHTT, HHHTH, HHHHT, HHHHH, THHHT, THHHH, TTHHH, HTHHH

probability= 8/32 = 1/4


I tried ur approach and got,

P(exactly 3 heads) = 10/32
P(exactly 4 heads) = 5/32
P(exactly 5 heads) = 1/32

Probability = 16/32 = 1/2

am I getting wrong somewhere :(
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Re: A fair coin is tossed 5 times. What is the probability of g [#permalink]
pranab01 wrote:
Hi Brent,

I am stuck with the approach


Ques: A fair coin is tossed 5 times. What is the probability of getting at least three heads on consecutive tosses.

My take::

Probability of Head or Tails for each coin flip -> (1/2) Multiply by number of coin flips -> (1/2)(1/2)(1/2)(1/2)(1/2) = 1/32

Now we need to find the chance of getting three heads consecutively

So we have 8 scenarios where at LEAST three heads will occur consecutively -> HHHTT, HHHTH, HHHHT, HHHHH, THHHT, THHHH, TTHHH, HTHHH

probability= 8/32 = 1/4


I tried ur approach and got,

P(exactly 3 heads) = 10/32
P(exactly 4 heads) = 5/32
P(exactly 5 heads) = 1/32

Probability = 16/32 = 1/2

am I getting wrong somewhere :(


Basically you are close, but 1/2 is for both heads and tails. Therefore, the answer should be
P(exactly 3 heads) = (10/32)/2, or C35/2/32
P(exactly 4 heads) = (5/32)/2 or C45/2/32
P(exactly 5 heads) = (1/32)/2 or C55/2/32

Probability = 8/32 = 1/4
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Re: A fair coin is tossed 5 times. What is the probability of g [#permalink]
pranab01 wrote:


So we have 8 scenarios where at LEAST three heads will occur consecutively -> HHHTT, HHHTH, HHHHT, HHHHH, THHHT, THHHH, TTHHH, HTHHH
probability= 8/32 = 1/4


Your solution is missing several possible outcomes.

For example there are five ways to get exactly 4 heads:
HHHHT
HHHTH
HHTHH
HTHHH
THHHH

Likewise, there are 10 ways to get exactly 3 heads.

Cheers,
Brent
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Re: A fair coin is tossed 5 times. What is the probability of g [#permalink]
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Given that A fair coin is tossed 5 times and we need to find What is the probability of getting exactly 3 Heads in five consecutive flips.

Coin is tossed 5 times => Total number of cases = \(2^5\) = 32

We need to get 3 heads out of 5 tosses.

We have 5 places to fill _ _ _ _ _ and we need to put 3 heads in those five places, which we can do in 5C3 ways

=> \(\frac{5!}{3!*(5-3)!}\) = \(\frac{5!}{3!*2!}\) = \(\frac{5*4*3*2}{3*2*2}\) = 10 ways

=> P(3H) = \(\frac{10}{32}\) = \(\frac{5}{16}\)

So, Answer will be \(\frac{5}{16}\)
Hope it helps!

Watch the following video to learn How to Solve Probability with Coin Toss Problems

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Re: A fair coin is tossed 5 times. What is the probability of g [#permalink]
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