Heather has a bag with 16 red blocks, 11 blue blocks, 9 purple blocks, 15 green blocks, 8 yellow blocks, and 20 orange blocks. If she was to draw a block out of the bag, record the color and replace the block back in the bag, repeating 500 times, what would most likely be the probability of drawing a green block (round to the nearest hundredth)?

A)
0.14
B)
0.19
C)
0.20
D)
0.25

To calculate the probability of drawing a green block, we need to divide the number of green blocks by the total number of blocks.

The total number of blocks is the sum of the blocks of all colors:

16 (red) + 11 (blue) + 9 (purple) + 15 (green) + 8 (yellow) + 20 (orange) = 79.

The number of green blocks is 15.

So, the probability of drawing a green block is:

15 / 79 ≈ 0.19.

Therefore, the most likely probability of drawing a green block is approximately 0.19.

The correct answer is B) 0.19.

To find the probability of drawing a green block, we need to divide the number of green blocks by the total number of blocks in the bag and then round the result to the nearest hundredth.

First, let's find the total number of blocks in the bag by adding up the number of each color:
Total number of blocks = 16 + 11 + 9 + 15 + 8 + 20 = 79

Next, we find the probability of drawing a green block:
Probability of drawing a green block = Number of green blocks / Total number of blocks
Probability of drawing a green block = 15 / 79
Probability of drawing a green block ≈ 0.19

Therefore, the most likely probability of drawing a green block, rounded to the nearest hundredth, is 0.19.

So, the correct answer is B) 0.19.