This is literally the only resource that I've found that *actually* explains what minterms and maxterms are in an easily understandable way, as well as clearly showing their relevance. I (somehow) managed to get through a dissertation on formal methods without it truly clicking in the way it just has. You're an excellent teacher, thanks for putting this up!
yeah, nothing against indians, but they have a sing-songy language and English is not sing-songy at all. so their accent doesnt work well with speaking english.
@@freddy7304 There are many wonderful TH-camrs, who I am guessing speak possibly Hindi or another close dialect primarily, who have been a blessing with my continued college success in computer science/electrical engineering courses. What I think may be challenging for me primarily is their cadence, and their mispronunciations second. When you are trying to grasp not only a challenging concept but also trying to decipher what they are trying to convey, it makes for a challenging learning experience.
superb explanation, because of this video I am able comprehend what minterms and maxterms are truly are. The idea of min and max terms truly a genius work , for me it seems like factoring a function over a basis(of a vector space for functions).
Is there any difference in changing POM to SOM with duality and demorgan's law? Suppose i have POM of (a,b) = M0.M1. Is the SOM m0+m1 (using demorgans) or m2+m3 (using duality)?
If we start from Z and want the canonical form, we need to add X and Y to the term. Z = Z*1 because of the identity rule, and X+X' = 1 because of the complement rule. so we can go Z → Z*1 → Z(X+X'). We can add any number of variables this way: Z → Z*1*1 → Z*1*(Y+Y') → Z*(X+X')*(Y+Y')
This is literally the only resource that I've found that *actually* explains what minterms and maxterms are in an easily understandable way, as well as clearly showing their relevance. I (somehow) managed to get through a dissertation on formal methods without it truly clicking in the way it just has. You're an excellent teacher, thanks for putting this up!
I rarely comment on videos but this is def one of the best videos I've found for digital logics, thank you sm!
thank god someone`s explaining that in a non indian accent
Yeah really
yeah, nothing against indians, but they have a sing-songy language and English is not sing-songy at all. so their accent doesnt work well with speaking english.
Their accent really gives me headache !
@@freddy7304 There are many wonderful TH-camrs, who I am guessing speak possibly Hindi or another close dialect primarily, who have been a blessing with my continued college success in computer science/electrical engineering courses. What I think may be challenging for me primarily is their cadence, and their mispronunciations second. When you are trying to grasp not only a challenging concept but also trying to decipher what they are trying to convey, it makes for a challenging learning experience.
Why don't they use a free ai voice. It would be way clearer than the accent
This is great! Simple explanations, clean visuals, and a touch of contextual information made this extremely helpful.
You know its extra good when professors are linking the video.
superb explanation, because of this video I am able comprehend what minterms and maxterms are truly are. The idea of min and max terms truly a genius work , for me it seems like factoring a function over a basis(of a vector space for functions).
Thank you for the straight forward no-bullshit explanation... I was struggling to understand this and u made it extremely easy.. Thank you again.
Man, you are a lifesaver.
Helped me before my exam.
Thank you! I like that your explanation is step-by-step and it is easy to understand
I wish I found you before my midterm 😪 but going to crush this final thanks to you and your videos!! ☺
WOW! You are the best teacher. Thank you very much!!!
Awesome! Thank you for sharing these great videos on TH-cam!
This is so helpful thank you for taking the time to make these videos!!
Thank you very much! Digital Logic is a blast, but man some things just need some extra coverage.
excellent video thank you sir
Thank you for the amazing explanation
U are a life saver man
Extremely helpful.
thank you so much! really good explanation
Thanks a LOT sir
that was very helpful. thanks
very good. Thanks man.
Great Explanation
This was very helpful thank you!
thank you so much , that helped me alot
Thank you so much
Thank you so much! !
its so useful thank you
Thankyou so much
thank you
YOU'RE TE BEST I LOVE U WITH EVERY PART OF MY BOOLEAN-SOLVING MIND
can you expound more on how line 4 was distributed in product of maxterms
thank you sir
W rizz bro you're saving my life rn
Is there any difference in changing POM to SOM with duality and demorgan's law? Suppose i have POM of (a,b) = M0.M1. Is the SOM m0+m1 (using demorgans) or m2+m3 (using duality)?
Can you explain how you expand Z = (X+X')(Y+Y')Z. Please i can't understand
If we start from Z and want the canonical form, we need to add X and Y to the term. Z = Z*1 because of the identity rule, and X+X' = 1 because of the complement rule. so we can go Z → Z*1 → Z(X+X'). We can add any number of variables this way: Z → Z*1*1 → Z*1*(Y+Y') → Z*(X+X')*(Y+Y')
what's a "literal"
Thank you so much!