# SOLUTION: I want to make sure I did this question correct, but do not know how to upload a picture so I do hope my description helps. Write down all possible subsets of set Q using correct s

Algebra ->  Algebra  -> Subset -> SOLUTION: I want to make sure I did this question correct, but do not know how to upload a picture so I do hope my description helps. Write down all possible subsets of set Q using correct s      Log On

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 Logic: Subset Solvers Lessons Answers archive Quiz In Depth

 Click here to see ALL problems on Subset Question 626836: I want to make sure I did this question correct, but do not know how to upload a picture so I do hope my description helps. Write down all possible subsets of set Q using correct set notation? The picture looks as followed: Green circle with P on the outside while inside is f, h, i , s Red circle with a Q on the outside while inside is e,p,i,s Both circles intersect at i,s My answers are as followed: {i,s} {i,e} {i,p} {s,i} {s,e} {s,p} {e,i} {e,s} {e,p} {p,i} {p,s} {p,e} Thank you !!Answer by jim_thompson5910(28598)   (Show Source): You can put this solution on YOUR website!The set Q has 4 items: e, p, i, s One possible subset is the entire set itself {e, p, i, s} ------------------------------------------------------- Then there are subsets that have 3 items in them: {e,i,s} {e,p,i} {e,p,s} {p,i,s} ------------------------------------------------------- Then there are subsets that have 2 elements {e,p} {e,i} {e,s} {p,i} {p,s} {i,s} ------------------------------------------------------- Then there are subsets that just have one element {e} {p} {i} {s} ------------------------------------------------------- and finally, every subset has the empty set {} ======================================================= So we have the subsets {e, p, i, s} {e,i,s} {e,p,i} {e,p,s} {p,i,s} {e,p} {e,i} {e,s} {p,i} {p,s} {i,s} {e} {p} {i} {s} {} Note: there are 4 elements, so there are 2^4 = 16 subsets total -------------------------------------------------------------------------------------------------------------- If you need more help, email me at jim_thompson5910@hotmail.com Also, please consider visiting my website: http://www.freewebs.com/jimthompson5910/home.html and making a donation. Thank you Jim --------------------------------------------------------------------------------------------------------------