Quantcast

A community for students. Sign up today!

Here's the question you clicked on:

55 members online
  • 0 replying
  • 0 viewing

Carolin

  • one year ago

Let the set B={0, 1, 2, 3, 4, 5, 6, 7}. Consider the following subnets of B: B1 = {0, 1, 2, 3}, B2 = {0, 2, 4, 6, 8}, B3 = {0, 2, 4, 6}, B4 = {1, 3}, B5 = {5, 7} Determine whether the following sets are particians of set B and justify your answers: a. {B3, B5} B. {B3, B4, B5}

  • This Question is Closed
  1. patdistheman
    • one year ago
    Best Response
    You've already chosen the best response.
    Medals 0

    Partitions?

  2. Carolin
    • one year ago
    Best Response
    You've already chosen the best response.
    Medals 0

    yup

  3. Carolin
    • one year ago
    Best Response
    You've already chosen the best response.
    Medals 0

    sorry, mistyping

  4. LogicalApple
    • one year ago
    Best Response
    You've already chosen the best response.
    Medals 3

    Which one of those choices includes subsets that are non-overlapping, and also include the entirety of the set?

  5. eliassaab
    • one year ago
    Best Response
    You've already chosen the best response.
    Medals 0

    1 is not in B3 or B5

  6. Carolin
    • one year ago
    Best Response
    You've already chosen the best response.
    Medals 0

    sorry for late replying.. Thanks for answering me so, partitions means that it can represent itself, no redundant elements, and it has no less and more elements.

  7. Carolin
    • one year ago
    Best Response
    You've already chosen the best response.
    Medals 0

    Hence, answer for (a) is not a partition and (b) is a partition.

  8. Not the answer you are looking for?
    Search for more explanations.

    • Attachments:

Ask your own question

Ask a Question
Find more explanations on OpenStudy

Your question is ready. Sign up for free to start getting answers.

spraguer (Moderator)
5 → View Detailed Profile

is replying to Can someone tell me what button the professor is hitting...

23

  • Teamwork 19 Teammate
  • Problem Solving 19 Hero
  • You have blocked this person.
  • ✔ You're a fan Checking fan status...

Thanks for being so helpful in mathematics. If you are getting quality help, make sure you spread the word about OpenStudy.

This is the testimonial you wrote.
You haven't written a testimonial for Owlfred.