Math Problem Statement
The table shows the results of rolling a fair six-sided die. Complete parts (a) through (d) below.
Outcome on Die
First 100 Trials
Second 100 Trials
500 Trials 1
1414
2020
7272
2
1414
1515
9494
3
1515
1313
8989
4
2020
1616
6969
5
1919
1414
8888
6
1818
2222
8888
Question content area bottom
Part 1
(a) Using the table, find the empirical probability of rolling a
33
for the first 100 trials.
The empirical probability of rolling a
33
for the first 100 trials is
0.150.15.
(Round to two decimal places as needed.)
Part 2
(b) Using the table, find the empirical probability of rolling a
33
for the second 100 trials.
The empirical probability of rolling a
33
for second 100 trials is
0.130.13.
(Round to two decimal places as needed.)
Part 3
(c) Using the table, find the empirical probability of rolling a
33
for 500 trials.
The empirical probability of rolling a
33
for 500 trials is
enter your response here.
Solution
Ask a new question for Free
By Image
Drop file here or Click Here to upload
Math Problem Analysis
Mathematical Concepts
Probability
Formulas
Empirical Probability
Theorems
-
Suitable Grade Level
Grades 9-12
Related Recommendation
Calculate Experimental Probability of Rolling a 17 on a 20-Sided Dice
Calculating Empirical and Theoretical Probability for Rolling a Die
Probability of Rolling a 1 or 6 After 3 to 5 Throws of a Fair Die
Probability of Rolling a 5 on a Six-Sided Die
Calculating Expected Rolls for a Sum of 5 with Two Dice Using Geometric Distribution