On a normal standard die one of the 21 dots fromany one of the six faces is removed at random with each dot equally likely tothe chosen. If the die is then rolled, then find the probability that the oddnumber appears.

On a normal standard die one of the 21 dots fromany one of the six fac

1.	On a normal standard die one of the 21 dots fromany one of the six faces is removed at random with each dot equally likely tothe chosen. If the die is then rolled, then find the probability that the oddnumber appears.
Answer» `E_(2):` event that the dot is removed from and odd face: `P(E_(1))=(1+3+5)/(21)=9/21` `E_(2):` dot is removed from the even face, `P(E_(2))=(2+4+6)/(21)=12/21` E : odd number appears when die is thrown Also when dot is removed from and odd numbered face, there are exactly 2 faces with odd number of dots, and when dot is removed from an even numbered face, there are exactly 4 faces with odd number of dots. `therefore` Required probability `P(E)=P(EnnE_(1))+P(EnnE_(2))` `=P(E_(1)).P(E//E_(1))+P(E_(2)).P(E//E_(2))` `=((9)/(21))xx2/9+((12)/(21))xx4/6=11/21`

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On a normal standard die one of the 21 dots fromany one of the six faces is removed at random with each dot equally likely tothe chosen. If the die is then rolled, then find the probability that the oddnumber appears.

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