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anonymous

  • one year ago

Could someone help me with karnaugh map question?

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  1. anonymous
    • one year ago
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    Find the minimum sum of products for each function using Karnaugh map. \[f_1(a,b,c)=m_0 + m_2 + m_5 + m_6\] I don't really know how to answer this but I might have an idea but still unsure as if correct.

  2. anonymous
    • one year ago
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    |dw:1442628272728:dw|

  3. anonymous
    • one year ago
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    so if that is the Karnaugh map that I assume is the correct one... \[f_1(a,b,c)=m_0+m_2+m_5+m_6\]\[f_1(a,b,c)=A'B'C'+A'BC+AB'C+ABC\]

  4. anonymous
    • one year ago
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    Since they are not cap letters then I switch them to that I guess.\[f_1(a,b,c)=a'b'c'+a'bc+ab'c+abc\]

  5. anonymous
    • one year ago
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    but then the answer its incorrect The real answer is : \[f=bc'+a'c'+ab'c\] so erasing that out of my mind, I assume the next newborn box!

  6. anonymous
    • one year ago
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    |dw:1442628735078:dw|

  7. anonymous
    • one year ago
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    \[f_(a,b,c)=m_0+m_2+m_5+m_6\]

  8. anonymous
    • one year ago
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    |dw:1442628849033:dw| I assume that's how it is done from tutorial videos I saw.

  9. anonymous
    • one year ago
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    |dw:1442628919956:dw|

  10. anonymous
    • one year ago
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    out of ideas

  11. anonymous
    • one year ago
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    |dw:1442629007298:dw|

  12. anonymous
    • one year ago
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    nope, neither that.

  13. anonymous
    • one year ago
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    @ganeshie8 could you give me a hint? I have no clue hos this is done and I'm trying to figure out a base to stand on so I could work out those problems :[

  14. anonymous
    • one year ago
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    New Idea/ New try!

  15. anonymous
    • one year ago
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    |dw:1442629208736:dw|

  16. anonymous
    • one year ago
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    |dw:1442629316815:dw|

  17. anonymous
    • one year ago
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    \[f_1(a,b,c)=m_0+m_2+m_5+m_6\]

  18. anonymous
    • one year ago
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    |dw:1442629465353:dw|