A tyre manufacturing company kept a record of the distance covered before a tyre needed to be placed . The table given below shows the results of 1000 cases . If you buy a tyre of this company , what is the probability that (i) it will need to be replaced before it has covered 4000 km ? (ii) It will last more than 9000 km ? (iii) it will need to be replaced after it has covered somewhere between 4000 km and 14000 km ?

A tyre manufacturing company kept a record of the distance covered bef

1.	A tyre manufacturing company kept a record of the distance covered before a tyre needed to be placed . The table given below shows the results of 1000 cases . If you buy a tyre of this company , what is the probability that (i) it will need to be replaced before it has covered 4000 km ? (ii) It will last more than 9000 km ? (iii) it will need to be replaced after it has covered somewhere between 4000 km and 14000 km ?
Answer» Total number of cases = 1000 . (i) Let `E_(1)` be the event that a tyre will need to be replaced before covering 4000 km . Number of tyres to be replaced before covering 4000 km = 20 . `therefore P (E_(1)) = (20)/(1000) = 0.02` (ii) Let `E_(2)` be the event that a tyre will last more than 9000 km . Number of tyres that will last more than 9000 km `= 325 + 445 = 770`. `therefore P(E_(2)) = (770)/(1000) = 0.77`. (iii) Let `E_(3)` be the event that a tyre needs replacement between 4000 km and 14000 km . Number of tyre which need replacement after covering between 4000 km and 14000 km = 210 + 325 = 535 `therefore P(E_(3)) = (535)/(1000) = 0.535`.

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