Question

Three labs, A, B and C produce, respectively, 40%, 10% and 50% of our finished prescription glasses. The percentage of defective items produced by the labs is, respectively, 3%, 4% and 5%. A VIP order is generated, randomly allocated to one of the three labs, and the finished pair of glasses are sent to headquarters.

(a) Find the probability that the pair of glasses are defective.
(b) If the pair of glasses are defective, find the probability that it was produced by
lab A
lab B
lab C

Answer 1

Solution: Let's assume three labs produce 1000 pairs of glasses.

We know that 40% of glasses are produced by Lab A. Therefore, the number of pairs of glasses produced by Lab A is:

`40\% of 1000 = 0.4 * 1000=400`

And number of defective glasses produced by Lab A is
`0.03 * 400=12`

Number of pairs of glasses produced by Lab B is:

`10\% of 1000=0.10 * 1000=100`

And number of defective glasses produced by Lab B is
`0.04 * 100 =4`

Number of pairs of glasses produced by Lab C is:

`50\% of 1000=0.50 * 1000=500`

And number of defective glasses produced by Lab C is
`0.05 * 500 =25`

(a) Find the probability that the pair of glasses are defective.

Answer: The probability that the pair of glasses are defective is:

`(12+4+25)/(1000)= (41)/(1000)=0.041`

(b) If the pair of glasses are defective, find the probability that it was produced by

lab A

lab B

lab C

Answer: The probability that it was produced by lab A is:

`(12)/(41)=0.2927` rounded to 4 decimal places

The probability that it was produced by lab B is:

`(4)/(41)=0.0976` rounded to 4 decimal places

The probability that it was produced by lab C is:

`(25)/(41)=0.6098` rounded to 4 decimal places