in Combinatory
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The number of ways six distinct balls be distributed into 3 distinct urns. If each urn contain at least one ball are ____
in Combinatory
659 views

8 Comments

It is equal to the no. of ONTO function from a set containing 6 elements to the set containing 3 elements.

= $3^6$  - ( 3C1 * $2^6$  - 3C2 * $1^6$ )

= $3^6$ - (189) = 729 - 189 = 540.
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Can you please explain in much more detail @Hemant
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 Hemant Parihar please explain  - ( 3C1 * 2- 3C2 * 1)
 

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Yes exactly I am unable to understand this part 

(3C1 * 26  - 3C2 * 1
 

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Read this it is from Rosen.

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check the last comment i tried distinct objects and distinct bins problem with restrictions
https://gateoverflow.in/191081/arrangement
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36 -(3C2 * 26  - 3C1 * 1)  :- 

(3C2 * 26  - 3C1 * 1):- here we are removing the case when balls are distributed only between two persone(3C2 * 26 )  ...means balls are distributed either AB,BC or CA now for all these cases ...there is a chance that balls are given two only one (for AB only A or ONLY B) ...for all A,B,C this would happen two times there for we would add this one more time.....(3C1 * 16)

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@Hemant Parihar

why we are not use here  (n-1+r  c r )

many time im confusion in between 

acc to me first we can 1 ball to every one so renaming 6-3=3 ball  then we can use ball and box method any wrong im not visualize 

@Bikram

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