Back to Exercise: Analyze decisions and strategies using probability

Exercises: Analyze Decisions and Strategies Using Probability

Work through each section in order. For testing problems, build the two-way table over the stated population and compute the decision-relevant quantity by counting. Remember the difference between a test's accuracy P(positive | disease) and the decision-relevant P(disease | positive). For strategy problems, account for how a choice changes ALL of the probabilities, not just the one you want. Write explanation answers in complete sentences and name your assumptions.

Grade 12·20 problems·~35 min·Common Core Math - HS Statistics and Probability·group·hss-md-b-7
Work through problems with immediate feedback
A

Warm-Up: Tools You Already Have

These problems review expected value and conditional probability, the tools this lesson combines.

1.

A game has expected value $2\text{\char"0024}2 per play. Which statement best describes what the expected value tells you?

2.

A coach is deciding whether to attempt a risky play or a safe play at the end of a game. Which list correctly names the four ingredients of a decision analysis?

3.

In a population of 10001000 people, a two-way table shows 4040 people have a condition and test positive, while 6060 people do NOT have the condition but also test positive. Among all who test positive, how many actually have the condition?   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   And how many test positive in total?   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲  

number who have the condition and test positive:
total number who test positive:
B

Fluency Practice

Compute the decision-relevant quantity in each problem.

1.

Two insurance choices have the SAME expected annual cost of $500\text{\char"0024}500. Plan X costs exactly $500\text{\char"0024}500 every year. Plan Y costs $0\text{\char"0024}0 with probability 0.980.98 but $25,000\text{\char"0024}25{,}000 with probability 0.020.02. What is the largest possible single-year cost (the worst case) under Plan Y, in dollars?

2.

A disease has prevalence 1%1\% in a population of 10,00010{,}000 people, so 100100 have it and 9,9009{,}900 do not. A test is 99%99\% sensitive (catches 9999 of the 100100 sick) and 99%99\% specific (correctly clears 99%99\% of the healthy). How many of the 9,9009{,}900 healthy people test positive (false positives)?

3.

Using the table from the previous problem: 9999 true positives and 9999 false positives test positive, for 198198 positives in all. What is P(diseasepositive)P(\text{disease} \mid \text{positive}), written as a decimal?

4.

A team trailing by one goal late can KEEP its goalie or PULL the goalie. Which statement correctly describes the effect of pulling the goalie?

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