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ashikaverma13
GMAT 1: 640 Q47 V31
Posts: 123
02 May 2017, 23:52
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B
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
35%
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Question Stats:
72% (02:05) correct
28%
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wrong
based on 156
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George is aiming his arrows at the target shown by his mentor. If the probability of hitting the target is 0.7, what is the approximate probability that he will hit the target only three times in his first five attempts?
A. 0.1
B. 0.3
C. 0.85
D. 0.5
E. 0.65
Could someone explain in a simplified manner how is combination being used here.
A. 0.1
B. 0.3
C. 0.85
D. 0.5
E. 0.65
Could someone explain in a simplified manner how is combination being used here.
03 May 2017, 00:08
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Given:
Probability of hitting the target is 0.7
Probability of Not hitting the target is 0.3
Now,probability that he will hit the target only three times in his first five attempts, this means, out of 5 attempts he will hit the target 3 times and miss the target 2 times ==> which can be represented as = 0.7 * 0.7 * 0.7 * 0.3 * 0.3
Now the three successful and unsuccessful attempts can happen in any sequence and which needs to be accounted for above.
So one of the sequence may be - Success,Failure,Success,Success,Failure
Another sequence may be - Failure, Success,Failure,Success,Success
So to account the different sequences we can considers that there are five places where three Success needs to be placed and this can be represented by 5C3 = 5!/3!*2! = 10
Therefore,
the approximate probability that he will hit the target only three times in his first five attempts
= 0.7 * 0.7 * 0.7 * 0.3 * 0.3 * 10
= 0.3087
Answer is B. 0.3
Probability of hitting the target is 0.7
Probability of Not hitting the target is 0.3
Now,probability that he will hit the target only three times in his first five attempts, this means, out of 5 attempts he will hit the target 3 times and miss the target 2 times ==> which can be represented as = 0.7 * 0.7 * 0.7 * 0.3 * 0.3
Now the three successful and unsuccessful attempts can happen in any sequence and which needs to be accounted for above.
So one of the sequence may be - Success,Failure,Success,Success,Failure
Another sequence may be - Failure, Success,Failure,Success,Success
So to account the different sequences we can considers that there are five places where three Success needs to be placed and this can be represented by 5C3 = 5!/3!*2! = 10
Therefore,
the approximate probability that he will hit the target only three times in his first five attempts
= 0.7 * 0.7 * 0.7 * 0.3 * 0.3 * 10
= 0.3087
Answer is B. 0.3
03 May 2017, 01:50
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ashikaverma13
How many ways can there be exactly 3 successful tries out of 5?
Consider \(\frac{5!}{(2!*3!)}=\frac{(5*4*3*2*1)}{(3*2)*2}=10\)
So there are 10 cases with 3 successful tries out of 5. Now we need to consider the probability of 1 combination
\(0.7*0.7*0.7*0.3*0.3=\frac{7^3*3^2}{100000}\)=0.03
\(0.03*10=0.3\)
Hope this helps!
