题目内容
已知集合M={x|x=3n,n=1,2,3,4},N={x|x=3k,k=1,2,3},则满足:(M∩N)?S⊆(M∪N)的集合S有( )
| A.6 | B.7 | C.8 | D.9 |
∵集合M={x|x=3n,n=1,2,3,4}={3,6,9,12},
N={x|x=3k,k=1,2,3}={3,9,27},
∴M∩N={3,9},M∪N={3,6,9,12,27},
∵(M∩N)?S⊆(M∪N),
∴满足条件的集合S可能为:{3,6,9},{3,9,12},{3,9,27},
{3,6,9,12},{3,6,9,27},{3,9,12,27},{3,6,9,12,27},
共7种可能.
故选B.
N={x|x=3k,k=1,2,3}={3,9,27},
∴M∩N={3,9},M∪N={3,6,9,12,27},
∵(M∩N)?S⊆(M∪N),
∴满足条件的集合S可能为:{3,6,9},{3,9,12},{3,9,27},
{3,6,9,12},{3,6,9,27},{3,9,12,27},{3,6,9,12,27},
共7种可能.
故选B.
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