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प्रश्न
Find the number of ways of forming a committee of 5 members out of 7 Indians and 5 Americans, so that always Indians will be the majority in the committee
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उत्तर
Number of Indians = 7
Number of Americans = 5
Number of members in the committee = 5
Selection of 5 members committee with majority Indians
Case (i): 3 Indians and 2 Americans
The number of ways of selecting 3
Indians from 7 Indians is = 7C3
The number of ways of selecting 2
Americans from 5 Americans is = 5C2
Total number of ways in this case is = 7C3 × 5C2
Case (ii): 4 Indians and 1 American
The number of ways of selecting 4
Indians from 7 Indians is = 7C4
The number of ways of selecting 1
American from 5 Americans is = 5C1
The total number of ways, in this case, is = 7C4 × 5C1
Case (iii): 5 Indians no American
Number of ways of selecting 5
Indians from 7 Indians is = 7C5
Total number of ways, in this case, = 7C5 × 5C0
∴ Total number of ways of forming the committee
= 7C3 × 5C2 + 7C4 × 5C1 + 7C5 × 5C0
= `(7!)/(3!(7 - 3)!) xx (5!)/(2!(5 - 2)!) + (7!)/(4!(7 - 2)!) xx 5 + (7!)/(4!(7 - 2)!) xx 1`
= `(7!)/(3! 4!) xx (5!)/(2! 3!) + (7!)/(4! 3!) xx 5 + (7!)/(5! 2!)`
= `(7 xx 6 xx 5 xx 4!)/(3! xx 4!) xx (5 xx 4 xx 3!)/(2! xx 3!) + (7 xx 6 xx 5 xx 4!)/(4! xx 3!) xx 5 + (7 xx 6 xx 5!)/(5! xx 2!)`
= `(7 xx 6 xx 5)/(3 xx 2 xx 1) xx (5 xx 4)/(2 xx 1) + (7 xx 6 xx 5 xx 5)/(3 xx 2 xx 1) + (7 xx 6)/(2 xx 1)`
= 7 × 5 × 5 × 2 + 7 × 5 × 5 + 7 × 3
= 350 + 175 + 21
= 546
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