Respuesta :
Answer
The probability that among four randomly selected Internet users, at least one is more careful about personal information when using a public Wi-Fi hotspot is 0.979.
Step-by-step explanation:
Since 62% of Internet users are more careful about personal information when using a public Wi-Fi hotspot.
Therefore, the Probability of 62% of Internet users are more careful about personal information when using a public Wi-Fi hotspot is, p=0.62.
We have to find the probability that at least one user is more careful about personal information when using wi-fi hotspot.
Probability of internet users are not more careful about personal information when using a public wi-fi hotspot, i.e [tex]q=1-p[/tex]
[tex]q=1-0.62=0.38[/tex]
Use Binomial Distribution, i.e, [tex]P\left ( X \right )=^nC_xp^xq^\left ( n-x \right )[/tex]
p=0.62, q=0.38, n=4.
Required Probability [tex]P\left ( X\geq 1 \right )=P\left ( X=1 \right )+P\left ( X=2 \right )+P\left ( X=3 \right )+P\left ( X=4 \right )[/tex]
or
[tex]P\left ( X\geq 1 \right )=1-P\left ( X=0 \right )[/tex]
=1-[tex]^4C_0p^0q^\left ( 4-0 \right )[/tex]
=1-[tex]4\cdot1\cdot q^\left ( 4-0 \right )[/tex]
=1-[tex]4\cdot \left ( 0.38 \right )^4[/tex]
=1-0.02085136=0.97914864
Therefore, the probability that at least one users more careful about personal information when using wi-fi hotspot, i.e 0.979(approx).
RESULT:
The result should not be impacted by this because volunteers are likely to have the most relevant responds.
