21) Steven asks you to play a dice game, where if the number rolled is an even number, he pays you $1, and if
the number rolled is an odd number, you pay him $1. After playing a few times, you start to suspect that the die
is not fair, and that the odd numbers are coming up more often. You decide to steal Steven's die and run a
simulation. You roll the die 204 times and record the following values:
Value: 1, 2, 3, 4, 5, 6
Frequency: 40, 24, 43, 26, 47, 24

Do you have convincing evidence that Steven's die is not fair?