# SOLUTION: List all the subcet of {11,12,13,14}

Algebra ->  Algebra  -> Subset -> SOLUTION: List all the subcet of {11,12,13,14}      Log On

 Ad: Algebra Solved!™: algebra software solves algebra homework problems with step-by-step help! Ad: Algebrator™ solves your algebra problems and provides step-by-step explanations!

 Logic: Subset Solvers Lessons Answers archive Quiz In Depth

 Question 618406: List all the subcet of {11,12,13,14}Found 2 solutions by jim_thompson5910, Edwin McCravy:Answer by jim_thompson5910(28476)   (Show Source): You can put this solution on YOUR website!List of all subsets of set {11,12,13,14} {11,12,13,14} {11,12,13}, {11,12,14}, {11,13,14}, {12,13,14} {11,12}, {11,13}, {11,14}, {12,13}, {12,14}, {13,14} {11}, {12}, {13}, {14} {} Note: {} is the empty set. Answer by Edwin McCravy(8880)   (Show Source): You can put this solution on YOUR website!```There are 2^4 or 16 of them since there are 4 elements. {} The empty set, has 0 elements {11} {12} These 4 have just 1 element, they are called "singletons" {13} (14) {11,12} {11,13} {11,14} These 6 have 2 elements {12,13} {12,14} {13,14} {11,12,13} {11,12,14} These 4 have 3 elements {11,13,14} {12,13,14} {11,12,13,14} This 1 has all four elements. It is not considered a PROPER subset, since it is the WHOLE, not really deserving of the prefix "sub" but it is considered a subset anyway. Edwin```