Respuesta :
ANSWER
0.756
EXPLANATION
Let x represent number of correct answers.
We can find
[tex] P(x = 0 \text{ or } x = 1) [/tex]
which leads us to
[tex] P(x\ge 2) = 1 - P(x = 0\text{ or }x = 1) [/tex]
which uses the compliment of [tex] P(x = 0\text{ or }x = 1) [/tex] to find the probability of getting at least 2 questions correct.
Note that since [tex] P(x=0) [/tex] and [tex] P(x=1) [/tex] are mutually exclusive, we have
[tex] P(x = 0\text{ or }x = 1) = P(x=0) + P(x=1) [/tex]
Then [tex] P(x=0) = 3^{10}/4^{10} = (3/4)^{10} [/tex] as we have [tex] 3^{10} [/tex] to answer the questions incorrectly divided by the total [tex] 4^{10} [/tex] to answer the questions.
Exactly 1 answer correct: [tex] P(x=1) = {}_{10}C_1 \cdot(3/4)^9(1/4)^1 [/tex]
Therefore
[tex]\begin{aligned} P(x \ge 2) &= 1 - P(x = 0\text{ or }x =1) \\ &=1 - \big[P(x=0) + P(x=1)\big] \\ &=1 - \left[ (3/4)^{10} + {}_{10}C_1 \cdot (3/4)^9(1/4)^1 \right] \\ &\approx 0.756 \end{aligned} [/tex]
