A big flower vase has 5 begonias, 6 carnations, and 7 tulips. Two flowers are randomly selected without replacement What is the probability of selecting two camations? Express the answer in the simplest form of fraction.

To calculate the probability of selecting two carnations, we first need to find the total number of ways to choose 2 flowers from the total of 5 begonias, 6 carnations, and 7 tulips.

Total number of flowers = 5 (begonias) + 6 (carnations) + 7 (tulips) = 18 flowers

Total number of ways to choose 2 flowers from 18 = 18 choose 2 = 18! / (2!(18-2)!) = 153 ways

Next, we need to calculate the number of ways to choose 2 carnations from the total of 6 carnations.

Number of ways to choose 2 carnations out of 6 = 6 choose 2 = 6! / (2!(6-2)!) = 15 ways

Therefore, the probability of selecting two carnations = number of ways to choose 2 carnations / total number of ways to choose 2 flowers = 15 / 153 = 5 / 51

So the answer is not in the list provided, but the correct answer in simplest form is 5/51.