Answer:
0.009982
Step-by-step explanation:
Given that a multiple-choice test consists of 20 questions with possible answers of a, b, c, d, e.
If a person does not know any answer but simply guesses the probability for his correct guess is 0.20 since there are 5 choices.
Also each question guess is independent of the other and there are only two outcomes.
X the no of correct answered questions is binomial with p =0.20 and n = 20
[tex]P(X=x) = 20Cx (0.2)^x (0.8)^{20-x}[/tex]
the probability that with random guessing, the number of correct answers is at least 9
[tex]=P(X\geq 9)\\= 0.009982[/tex]
