4 out of 15 apples are rotten. They are taken out one by one at random and examined. The ones which are examined are not replaced. What is the probability that the 9th one examined is the last rotten one?

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akivieobukomena akivieobukomena · Answer 1 · 2019-12-04T17:57:35+01:00

Answer:

0.041

Step-by-step explanation:

Number of rotten apples = 4

Total number of apples= 15

Number of good apples = 15-4

= 11

If the 9th apple is the last rotten apple, the first 8 apples picked should have 3 rotten apples and 5 good apples. This selection can be done by

C(4,3) * C(11,5)

Recall that C(n,r) = n! /(n-r)! r!

C(4,3) = 4!/(4-3)!3!

= 4!/1!3!

= 4

C(11,5)= 11!/(11-5)!5!

= 11!/ 6!5!

= 462

To select 8 apples from 15 apples, we have C(15,8)

= 15!/(15-8)!8!

= 15!/7!8!

= 6435

The 9th apple which is the rotten apple remaining can be selected in one way out of (15-8) = 7apples

C(7,1) = 7!/(7-1)!1!

= 7!/6!1!

= 7

Total probability = [C(4,3) * C(11,5)] / [C(15,8) * C(7,1)]

= (4*462)/(6435*7)

= 1848/45045

= 0.041