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For one toss of a certain coin, the probability that the outcome is he Updated on: 14 Oct 2019, 04:34
Originally posted by ralucaroman on 25 Oct 2009, 18:38.
Last edited by Bunuel on 14 Oct 2019, 04:34, edited 3 times in total.
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For one toss of a certain coin, the probability that the outcome is heads is 0.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. \((0.6)^5\)

B. \(2(0.6)^4\)

C. \(3(0.6)^4\)

D. \(4(0.6)^4(0.4) + (0.6)^5\)

E. \(5(0.6)^4(0.4) + (0.6)^5\)
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For one toss of a certain coin, the probability that the outcome is he 25 Oct 2009, 18:54
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For one toss of a certain coin, the probability that the outcome is heads is 0.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. (0.6)^5
B. 2(0.6)^4
C. 3(0.6)^4
D. 4(0.6)^4(0.4) + (0.6)^5
E. 5(0.6)^4(0.4) + (0.6)^5

\(P(h)=0.6\), so \(P(t)=0.4\). We want to determine the probability of at least 4 heads in 5 tries.

At least 4 heads means 4 or 5. Let's calculate each one:

5 heads: \(P(h=5)=0.6^5\);

4h and 1t: \(P(h=4)=\frac{5!}{4!}*0.6^4*0.4=5*0.6^4*0.4\), multiplying by 5 as 4h and 1t may occur in 5 different ways:
hhhht
hhhth
hhthh
hthhh
thhhh

So, \(P(h\geq{4})=0.6^5+5*0.6^4*0.4\).

Answer: E.
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For one toss of a certain coin, the probability that the outcome is he 25 Jun 2017, 12:29
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For one toss of a certain coin, the probability that the outcome is heads is 0.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. (0.6)^5
B. 2(0.6)^4
C. 3(0.6)^4
D. 4(0.6)^4(0.4) + (0.6)^5
E. 5(0.6)^4(0.4) + (0.6)^5
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For one toss of a certain coin, the probability that the outcome is he 25 Oct 2009, 19:12
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Bunuel - the quant maestro --- nails one more problem... :))

I missed the multiplying by 5 too
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For one toss of a certain coin, the probability that the outcome is he 19 Sep 2014, 20:00
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Bunuel
Stiv
For one toss of a certain coin, the probability that the outcome is heads is o.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. (0.6)^5
B. 2(0.6)^4
C. 3(0.6)^4
D. 4(0.6)^4(0.4) + (0.6)^5
E. 5(0.6)^4(0.4) + (0.6)^5

\(P(h)=0.6\), so \(P(t)=0.4\). We want to determine the probability of at least 4 heads in 5 tries.

At least 4 heads means 4 or 5. Let's calculate each one:

5 heads: \(P(h=5)=0.6^5\);

4h and 1t: \(P(h=4)=\frac{5!}{4!}*0.6^4*0.4=5*0.6^4*0.4\), multiplying by 5 as 4h and 1t may occur in 5 different ways:
hhhht
hhhth
hhthh
hthhh
thhhh

So, \(P(h\geq{4})=0.6^5+5*0.6^4*0.4\).

Answer: E.
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Hi Bunuel,

Thanks for the explanation. I am having difficulty understanding though when should we consider order to be important and when not? When it is not explicitly stated that is..
Please let me know.
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For one toss of a certain coin, the probability that the outcome is he 20 Sep 2014, 13:22
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kpali
Bunuel
Stiv
For one toss of a certain coin, the probability that the outcome is heads is o.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. (0.6)^5
B. 2(0.6)^4
C. 3(0.6)^4
D. 4(0.6)^4(0.4) + (0.6)^5
E. 5(0.6)^4(0.4) + (0.6)^5

\(P(h)=0.6\), so \(P(t)=0.4\). We want to determine the probability of at least 4 heads in 5 tries.

At least 4 heads means 4 or 5. Let's calculate each one:

5 heads: \(P(h=5)=0.6^5\);

4h and 1t: \(P(h=4)=\frac{5!}{4!}*0.6^4*0.4=5*0.6^4*0.4\), multiplying by 5 as 4h and 1t may occur in 5 different ways:
hhhht
hhhth
hhthh
hthhh
thhhh

So, \(P(h\geq{4})=0.6^5+5*0.6^4*0.4\).

Answer: E.

Hi Bunuel,

Thanks for the explanation. I am having difficulty understanding though when should we consider order to be important and when not? When it is not explicitly stated that is..
Please let me know.
Show more

Think logically, the case of 4 heads and 1 tail can occur in several ways (each of which having the same probability), so we have to account for the order here.
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For one toss of a certain coin, the probability that the outcome is he 31 May 2017, 23:17
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Stiv
For one toss of a certain coin, the probability that the outcome is heads is 0.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. (0.6)^5
B. 2(0.6)^4
C. 3(0.6)^4
D. 4(0.6)^4(0.4) + (0.6)^5
E. 5(0.6)^4(0.4) + (0.6)^5
Show more
1. Probability of getting 4 heads and one tail is 5(0.6)^4 * (0.4). 5 is nothing but 5C4 ways. of 4 heads happening.
2. Probability of getting heads all the 5 times is (0.6)^5
3. Total probability is answer E.
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For one toss of a certain coin, the probability that the outcome is he 18 Oct 2018, 18:13
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Stiv
For one toss of a certain coin, the probability that the outcome is heads is 0.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?


A. \((0.6)^5\)

B. \(2(0.6)^4\)

C. \(3(0.6)^4\)

D. \(4(0.6)^4(0.4) + (0.6)^5\)

E. \(5(0.6)^4(0.4) + (0.6)^5\)
Show more

The outcome “at least 4 heads out of 5 flips” means that we can get either exactly 4 heads out of 5 flips OR 5 heads out of 5 flips.

First, we need to determine the probability of exactly 4 heads out of 5 flips, so:

P(HHHHT) = (0.6)^4 x 0.4

Since HHHHT can be arranged in 5!/4! = 5 ways, the total probability of obtaining exactly 4 heads is 5(0.6)^4 x 0.4.

The probability of 5 heads is (0.6)^5.

So the total probability is 5(0.6)^4 x 0.4 + (0.6)^5.

Answer: E
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For one toss of a certain coin, the probability that the outcome is he 16 Aug 2019, 06:59
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Bunuel
Stiv
For one toss of a certain coin, the probability that the outcome is heads is o.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. (0.6)^5
B. 2(0.6)^4
C. 3(0.6)^4
D. 4(0.6)^4(0.4) + (0.6)^5
E. 5(0.6)^4(0.4) + (0.6)^5

\(P(h)=0.6\), so \(P(t)=0.4\). We want to determine the probability of at least 4 heads in 5 tries.

At least 4 heads means 4 or 5. Let's calculate each one:

5 heads: \(P(h=5)=0.6^5\);

4h and 1t: \(P(h=4)=\frac{5!}{4!}*0.6^4*0.4=5*0.6^4*0.4\), multiplying by 5 as 4h and 1t may occur in 5 different ways:
hhhht
hhhth
hhthh
hthhh
thhhh

So, \(P(h\geq{4})=0.6^5+5*0.6^4*0.4\).

Answer: E.
Show more
Plz clear my doubt:

Bunuel

if it is asked , 5 coins are tossed what is probabilty of getting 4 heads exactly
so we cn
HHHHT so
5!/4! ways /2^5(total ways) but why are we not considering 2^5 in denominator here ,plz clarify
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For one toss of a certain coin, the probability that the outcome is he 16 Aug 2019, 07:37
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vanam52923
Bunuel
Stiv
For one toss of a certain coin, the probability that the outcome is heads is o.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. (0.6)^5
B. 2(0.6)^4
C. 3(0.6)^4
D. 4(0.6)^4(0.4) + (0.6)^5
E. 5(0.6)^4(0.4) + (0.6)^5

\(P(h)=0.6\), so \(P(t)=0.4\). We want to determine the probability of at least 4 heads in 5 tries.

At least 4 heads means 4 or 5. Let's calculate each one:

5 heads: \(P(h=5)=0.6^5\);

4h and 1t: \(P(h=4)=\frac{5!}{4!}*0.6^4*0.4=5*0.6^4*0.4\), multiplying by 5 as 4h and 1t may occur in 5 different ways:
hhhht
hhhth
hhthh
hthhh
thhhh

So, \(P(h\geq{4})=0.6^5+5*0.6^4*0.4\).

Answer: E.
Plz clear my doubt:

Bunuel

if it is asked , 5 coins are tossed what is probabilty of getting 4 heads exactly
so we cn
HHHHT so
5!/4! ways /2^5(total ways) but why are we not considering 2^5 in denominator here ,plz clarify
Show more

If it were a fair coin, so if the probability of a tail = probability of a head = 1/2, then it would be P(h = 4) = 5!/4!*(1/2)^4*1/2= 5!/4!*(1/2)^5.

Since the coin is not fair, (\(P(h)=0.6\) and \(P(t)=0.4\)), then \(P(h=4)=\frac{5!}{4!}*0.6^4*0.4=5*0.6^4*0.4\), multiplying by 5 as 4h and 1t may occur in 5 different ways:
hhhht
hhhth
hhthh
hthhh
thhhh
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For one toss of a certain coin, the probability that the outcome is he Updated on: 20 Aug 2020, 00:06
Originally posted by Basim2016 on 19 Aug 2020, 23:56.
Last edited by Basim2016 on 20 Aug 2020, 00:06, edited 2 times in total.
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kpali
Bunuel
Stiv
For one toss of a certain coin, the probability that the outcome is heads is o.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. (0.6)^5
B. 2(0.6)^4
C. 3(0.6)^4
D. 4(0.6)^4(0.4) + (0.6)^5
E. 5(0.6)^4(0.4) + (0.6)^5

\(P(h)=0.6\), so \(P(t)=0.4\). We want to determine the probability of at least 4 heads in 5 tries.

At least 4 heads means 4 or 5. Let's calculate each one:

5 heads: \(P(h=5)=0.6^5\);

4h and 1t: \(P(h=4)=\frac{5!}{4!}*0.6^4*0.4=5*0.6^4*0.4\), multiplying by 5 as 4h and 1t may occur in 5 different ways:
hhhht
hhhth
hhthh
hthhh
thhhh

So, \(P(h\geq{4})=0.6^5+5*0.6^4*0.4\).

Answer: E.

Hi Bunuel,

Thanks for the explanation. I am having difficulty understanding though when should we consider order to be important and when not? When it is not explicitly stated that is..
Please let me know.
Show more
DEAR FELLOW,

ORDER depends on the purpose.
1. Same purpose: order does NOT matter (0.6)^5......same selected, same purpose.

2. Different Purpose...... Order matters ...... 5!/4!1! X (0.6)^4 x (0.4) .... 2 different selections, so purpose is different.

It is very late to reply may be Mr. Kpali has taken gmat with distinction but it is never late for learners like me.

Best Regards
Basim

Posted from my mobile device
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For one toss of a certain coin, the probability that the outcome is he 12 Oct 2020, 12:18
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P(heads at least 4 times) = P(4 heads & 1 tails) + P(5 heads)

P(4 heads & 1 tails) = (0.6)^4 * 0.4 * 5C4 = 5 (0.6)^4 * 0.4
P(5 heads) = 0.6^5
P(heads at least 4 times) = 5 (0.6)^4 * 0.4 * 0.6^5

Choice E.
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For one toss of a certain coin, the probability that the outcome is he 14 Feb 2021, 20:48
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This took me unnecessarily

For one toss of a certain coin, the probability that the outcome is heads is 0.6. If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

A. (0.6)^5

B. 2(0.6)^4

C. 3(0.6)^4

D. 4(0.6)^4(0.4)+(0.6)^5

E. 5(0.6)^4(0.4)+(0.6)^5

"at least 4 times" means one of the following two scenarios:

1. heads 4x + tails 1x: (3/5)^4 x 2/5 x 5!/4! = (0.6)^4 x 2
2. heads 5x : (3/5)^5

(0.6)^4 x 2 + (3/5)^5 = 5(0.6)^4(0.4)+(0.6)^5

Answer is E.
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For one toss of a certain coin, the probability that the outcome is he 18 Feb 2022, 21:56
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Given: For one toss of a certain coin, the probability that the outcome is heads is 0.6.
Asked: If this coin is tossed 5 times, which of the following is the probability that the outcome will be heads at least 4 times?

The probability that the outcome will be heads at least 4 times = The probability that the outcome will be heads 4 times + The probability that the outcome will be heads 5 times = 5C4*(.6)^4*(.4) + 5C5*(.6)^5 = 5(.6)^4(.4) + (.6)^5

IMO E
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For one toss of a certain coin, the probability that the outcome is he 18 Sep 2024, 06:03
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2 cases of AT LEAST 4 Heads

HHHHH

and

HHHHT

First case can only be arranged in 1 way so the probability is simply 0.6^5

For the second case there are 5!/4! = 5 permutations (order matters or you would simply be multiplying the probabilities)

Multiply the Permutations by probabilities 0.6^4*0.4*5 (4 heads 1 tails multiplied by possible permutations. Now add this to the probability calculated in the first step.
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