QuestionFrom historical data, of people work out daily . In a sample of 15 people, use the binomial formula or your TI-8314 to determine the probability that exactly 4 (of the fifteen) work out daily.
For a standard normal distribution:
a) What is the probability that is less than 0.47 ?
b) What is the probability that is greater than -1.83 ?
c) What is the probability that is between -1.29 and 0.64 ?
d) What is the probability that is between -1.96 and 1.96 ?
Studdy Solution
STEP 1
What is this asking?
Out of 15 people, what's the chance that exactly 4 of them work out daily, if we know 18% of people generally do?
Also, we need to find some probabilities using a z-table or calculator.
Watch out!
Don't mix up the binomial formula parts, and make sure to use the correct z-scores for the normal distribution questions!
STEP 2
1. Binomial Probability
2. Z-score Less Than
3. Z-score Greater Than
4. Z-score Between Two Values (1)
5. Z-score Between Two Values (2)
STEP 3
The binomial probability formula tells us the chance of getting *exactly* successes in trials: Where is the probability of success on a single trial.
STEP 4
We have people (trials), we want people to work out (successes), and the probability of someone working out daily is .
Let's plug these into our formula!
STEP 5
The binomial coefficient represents the number of ways to choose 4 people out of 15.
It's calculated as:
STEP 6
Now, let's plug everything back into our binomial formula: So, there's about a 16.7% chance of exactly 4 out of 15 people working out daily.
STEP 7
We want to find .
Using a z-table or calculator, we find this probability to be approximately .
STEP 8
We want .
This is the same as .
Using a z-table or calculator, , so .
STEP 9
We're looking for .
This is equal to .
Using a z-table or calculator, and .
So, .
STEP 10
We want .
This is .
From a z-table or calculator, and .
Therefore, .
STEP 11
The probability of exactly 4 out of 15 people working out daily is approximately .
For the standard normal distribution: a) , b) , c) , and d) .
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