6 Hackerrank Solution - Probability And Statistics

\[C(10, 2) = rac{10!}{2!(10-2)!} = rac{10 imes 9}{2 imes 1} = 45\] Next, we need to calculate the number of combinations where at least one item is defective. It’s easier to calculate the opposite (i.e., no defective items) and subtract it from the total.

The final answer is:

\[P( ext{at least one defective}) = rac{2}{3}\] probability and statistics 6 hackerrank solution

“A random sample of 2 items is selected from a lot of 10 items, of which 4 are defective. What is the probability that at least one of the items selected is defective?” To tackle this problem, we need to understand the basics of probability and statistics. Specifically, we will be using the concepts of combinations, probability distributions, and the calculation of probabilities. \[C(10, 2) = rac{10