Kasa and Harrison both have a six-sided dice. The sides of their dice are displayed below:



Assuming that their dice are both fair (equally likely to land on each side). Find the theoretical probability of rolling each value. Write your answers as percents correct to two decimal places.

$\displaystyle {p}{\left({1}\right)}=$ Preview Question 6 Part 1 of 11   %    $\displaystyle {p}{\left({2}\right)}=$ Preview Question 6 Part 2 of 11   %

$\displaystyle {p}{\left({3}\right)}=$ Preview Question 6 Part 3 of 11   %   

When Kasa rolls her dice 1410 times, she rolls a one 233 times, a two 473 times, and a three 704 times. Find the experimental probability of rolling each value.

$\displaystyle {p}{\left({1}\right)}=$ Preview Question 6 Part 4 of 11   %     $\displaystyle {p}{\left({2}\right)}=$ Preview Question 6 Part 5 of 11   %

$\displaystyle {p}{\left({3}\right)}=$ Preview Question 6 Part 6 of 11   %    

Based on the Law of Large Numbers, could you reasonably assume that the dice Kasa has is a fair dice (equally likely to land on each side)? When Harrison rolls his dice 1410 times, he rolls a one 1031 times, a two 319 times, and a three 60 times. Find the experimental probability of rolling each value.

$\displaystyle {p}{\left({1}\right)}=$ Preview Question 6 Part 8 of 11   %     $\displaystyle {p}{\left({2}\right)}=$ Preview Question 6 Part 9 of 11   %

$\displaystyle {p}{\left({3}\right)}=$ Preview Question 6 Part 10 of 11   %    

Based on the Law of Large Numbers, could you reasonably assume that the dice Harrison has is a fair dice (equally likely to land on each side)?