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Question

A contest consists of predicting the results (win, draw or defeat) of 10 football matches. The probability that one entry contains at least 5 correct answers is


A

12585310

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B

12385310

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C

9385310

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D

None of these

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Solution

The correct option is A

12585310


Explanation for the correct answer:

Step 1: Find the probability of success and failure for a given experiment

We have been given that, a contest consists of predicting the results (win, draw or defeat) of 10 football matches.

We need to find the probability that one entry contains at least 5 correct answers.

Here, the probability of predicting the correct result p=13

the probability of predicting the wrong result q=23

n=10

Step 2: By using the Binomial distribution formula, find the probability of predicting exactly 5 correct answers.

⇒P(x=5)=C510×(13)5×(23)10-5=10!5!(10-5)!×135×(23)5=252×135×3235=806435×35=8064310

Step 3: By using the Binomial distribution formula, find the probability of predicting exactly 6 correct answers.

⇒P(x=6)=C610×(13)6×(23)10-6=10!6!(10-6)!×136×(23)4=210×136×1634=336036×34=3360310

Step 4: By using the Binomial distribution formula, find the probability of predicting exactly 7 correct answers.

⇒P(x=7)=C710×(13)7×(23)10-7=10!7!(10-7)!×137×(23)3=120×137×833=96037×33=960310

Step 5: By using the Binomial distribution formula, find the probability of predicting exactly 8 correct answers.

⇒P(x=8)=C810×(13)8×(23)10-8=10!8!(10-8)!×138×(23)2=45×138×432=18038×32=180310

Step 6: By using the Binomial distribution formula, find the probability of predicting exactly 9 correct answers.

⇒P(x=9)=C910×(13)9×(23)10-9=10!9!(10-9)!×139×(23)1=10×139×23=2039×3=20310

Step 7: By using the Binomial distribution formula, find the probability of predicting exactly 10 correct answers.

⇒P(x=10)=C1010×(13)10×(23)10-10=10!10!(10-10)!×1310×(23)0=1×1310×1=1310

Step 8: Find the required probability that one entry contains at least 5 correct answers.

The probability that one entry contains at least 5 correct answers would be,

⇒P=P(x=5)+P(x=6)+P(x=7)+P(x=8)+P(x=9)+P(x=10)⇒P=8064310+3360310+960310+180310+20310+1310⇒P=12585310

Therefore, option (A) is the correct answer.


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