VCE Maths Methods Binomial Probability Mini Test 1

If \( X \) is a binomial random variable where \( n = 20, p = 0.88 \), and \( \Pr(X \geq 16 \mid X \geq a) = 0.9175 \), correct to four decimal places, then \( a \) is equal to

• A. 11
• B. 12
• C. 13
• D. 14
• E. 15

Items are packed in boxes of 25 and the mean number of defective items per box is 1.4
Assuming that the probability of an item being defective is binomially distributed, the probability that a box contains more than three defective items, correct to three decimal places, is

• A. 0.037
• B. 0.048
• C. 0.056
• D. 0.114
• E. 0.162

Shown below is the graph of \(p\), which is the probability function for the number of times, \(x\), that a '6' is rolled on a fair six-sided die in 20 trials.

Let \(q\) be the probability function for the number of times, \(w\), that a '6' is not rolled on a fair six-sided die in 20 trials.
\(q(w)\) is given by

• A. \(p(20-w)\)
• B. \(p\left(1-\frac{w}{20}\right)\)
• C. \(p\left(\frac{w}{20}\right)\)
• D. \(p(w-20)\)
• E. \(1-p(w)\)

An archer can successfully hit a target with a probability of 0.9. The archer attempts to hit the target 80 times. The outcome of each attempt is independent of any other attempt.
Given that the archer successfully hits the target at least 70 times, the probability that the archer successfully hits the target exactly 74 times, correct to four decimal places, is

• A. 0.3635
• B. 0.8266
• C. 0.1494
• D. 0.3005
• E. 0.1701

Let \( X \) be a binomial random variable where \( X \sim \text{Bi}\left(4, \frac{9}{10}\right) \).

a. Find the standard deviation of \( X \). 1 mark

b. Find \( \Pr(X < 2) \). 2 marks