SOLUTION: A set X with n(x)=525 is partitioned into subsets X_1....X_6. If n(X_1)=n(X_2)=n(X_3), n(X_4)=n(X_5)=n(X_6) and n(X_1)=6n(X_4), find n(X_1)

Algebra ->  Finite-and-infinite-sets -> SOLUTION: A set X with n(x)=525 is partitioned into subsets X_1....X_6. If n(X_1)=n(X_2)=n(X_3), n(X_4)=n(X_5)=n(X_6) and n(X_1)=6n(X_4), find n(X_1)      Log On


   

Question 1045430: A set X with n(x)=525 is partitioned into subsets X_1....X_6. If n(X_1)=n(X_2)=n(X_3), n(X_4)=n(X_5)=n(X_6) and
n(X_1)=6n(X_4),
find n(X_1)
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