Thanks a lot for this. I was completely lost before, and watching the first one I was like "HUH?!" but by the 3rd example I was able to simplify all on my own! I still need more practice, but again this REALLY helped me.
I slightly didn't understand on the first example, I only understood the chart, but when you began the 2nd example it clicked. Thank you so much, it's hard to understand this on a sheet.
This helps sooo much than the online lectures that we are having right now during the Pandemic Staff having mic problems, connection issues on my part or inaudibility, so your little video really helped me out Thanks a lot :)
(2:37) A small cause of confusion there! For most people, the boolean Absorption Law is the theorems: A ∙ (A + B) = A and A + (A ∙ B) = A The theorem he is referring to is one of the two that make the the Law of Common Identities: A ∙ (ㄱA + B) = A ∙ B and A + (ㄱA ∙ B) = A + B Anyways, for anyone interested, here is a different and somewhat more detailed solution to the second exercise (I use Distribution): ㄱA ∙ ㄱB ∙ ㄱC + ㄱA ∙ ㄱB ∙ C + ㄱA ∙ ㄱC Given ㄱA ∙ (ㄱB ∙ ㄱC) + ㄱA ∙ (ㄱB ∙ C) + ㄱA ∙ ㄱC by Association ㄱA ∙ (ㄱB ∙ ㄱC + ㄱB ∙ C + ㄱC) by Distribution ㄱA ∙ ([ㄱB ∙ ㄱC + ㄱB ∙ C] + ㄱC) by Association ㄱA ∙ ([ㄱB ∙ {ㄱC + C}] + ㄱC) by Distribution ㄱA ∙ ([ㄱB ∙ {C + ㄱC}] + ㄱC) by Commutation ㄱA ∙ ([ㄱB ∙ 1] + ㄱC) by Complement Law ㄱA ∙ (ㄱB + ㄱC) by Identity Law (aka Intersection Law)
In the first example. What if we decided to use the A+1=1 rule and apply it to A.C.(1)+Ā and we get A.C.(1) Then we will have AC as an answer Will that be correct???
If you are reading this, and have a test coming up, please please please, just remember that chart he has, I made an A due to that
So kind of you. Thank you so much
@Mercury Si we have this in our syllabus.... I am in high school
I got A bar :(
yep! budy
@Mercury Si we have this in our syllabus .... and I am in high school
Man, I have Digital Electronics exam tomorrow but this guy's chart is a gem here. Thank you, man.
You're so much better at explaining this than my teacher. Thank you from this video I understood what I couldnt understand in class for like 3 weeks.
InstaBlaster...
youtube be like that
@@DarkArcticTV cri
Same
True
You just crushed my teacher on teaching this material. Thank you SOOO much!!
Fuck!
@@billionairediarie are you the teacher 😂
@@bishnugogoi9729 Hahaha
Ujefwwyw
Bishnu Gogoi the student has become the teacher
thanks man! it was really confusing topic but you explained it very nicely.
Your way of teaching is the best. It is easy to follow and understand. You just made my work easier.
The transformation of the same solution into various forms in Problem 2 would be really helpful for Multiple Choice Questions..... Great work!!
To remember demorgans remember the saying: Break the line change the sign
Thankyou so much man !!
Thanks alot.
legendddd
whhha... thanqqqqqqq
Thanks a lot for this. I was completely lost before, and watching the first one I was like "HUH?!" but by the 3rd example I was able to simplify all on my own! I still need more practice, but again this REALLY helped me.
Well explained
what an absolute mad lad,really helps me a lot
I slightly didn't understand on the first example, I only understood the chart, but when you began the 2nd example it clicked. Thank you so much, it's hard to understand this on a sheet.
This helps sooo much than the online lectures that we are having right now during the Pandemic
Staff having mic problems, connection issues on my part or inaudibility, so your little video really helped me out
Thanks a lot :)
not alot of videos help but let me say this helped another lost soul thank you brother
Thanks man really helpful straight to the point.
didn't really understand at class, thanks to this video I got more insight about this and learned new tidbits.
We have different notation, but this is just so much clearer to me, thank you!
Yeah we too. Idk why they dont use this Instead they do it like A' + B' which is annoying.
Very clear and detailed explanation about simplifying the logical functions. Thanks a million.
Kind of wish my online course explained it this way. Thanks :)
ive just joined a computing class halfway through the semester and I really struggled on learning this. thanks so much
Thanks man! I appreciate this walkthrough. My CS Final exam in uni is just 2 days away and I was potatoes in this topic
very interesting, helped me a lot to clear my concepts, thank you, sir.
thank you for this video, it really helped me a lot.
This was an excellent exercise, thank you!
man THANK YOU i've been trying to understand this for the last hour and watching your video just helped it click.
Wow.. this guy is amazing for real💯
Thank you very much for this video.. really helpful
Excellent demonstratation of Boolean, was a nice & quick refresher!
Very good explanation, and nice English too. You deserve more subscribers
I'm grateful to you sir, my utmost veneration to you. I've perceived well
Amazing Video thank you sm, this really helped me with my Electrical Engineering Class
Very helpful, thank you sir!
Meu mano você me ajudou muito a entender como funciona e eu agradeço muito por isso, abraços do Brasil!
me salvou tambem!!
thank you it benefits me a lot while studying
Thank you very much . This video helps me a lot , for my studies. so again Thanks a lot .I'm from Sri Lanka
Thanks for making this logic so simple for uss❤️❤️
Thanks dude, your video helped me a lot!
Wow, you made me understand this so easily
Thankyou sir😊😊😊
It helped me a lot !!
Well explained ! ❤️❤️
this will really go a long way in me understanding it
من العراق
Excellent explanation 🎉❤
Thank you for this lesson
absolute legend thank you soooooooooo much
Thank you 😊
Loved your explanation.
Great example of Discrete Math course that i had, well explained
you are great you solved my doubt
of my first class
Thank you, it's clear now
(2:37) A small cause of confusion there! For most people, the boolean Absorption Law is the theorems:
A ∙ (A + B) = A and A + (A ∙ B) = A
The theorem he is referring to is one of the two that make the the Law of Common Identities:
A ∙ (ㄱA + B) = A ∙ B and A + (ㄱA ∙ B) = A
+ B
Anyways, for anyone interested, here is a different and somewhat more detailed solution to the second exercise (I use Distribution):
ㄱA ∙ ㄱB ∙ ㄱC + ㄱA ∙ ㄱB ∙ C + ㄱA ∙ ㄱC Given
ㄱA ∙ (ㄱB ∙ ㄱC) + ㄱA ∙ (ㄱB ∙ C) + ㄱA ∙ ㄱC by Association
ㄱA ∙ (ㄱB ∙ ㄱC + ㄱB ∙ C + ㄱC) by Distribution
ㄱA ∙ ([ㄱB ∙ ㄱC + ㄱB ∙ C] + ㄱC) by Association
ㄱA ∙ ([ㄱB ∙ {ㄱC + C}] + ㄱC) by Distribution
ㄱA ∙ ([ㄱB ∙ {C + ㄱC}] + ㄱC) by Commutation
ㄱA ∙ ([ㄱB ∙ 1] + ㄱC) by Complement Law
ㄱA ∙ (ㄱB + ㄱC) by Identity Law (aka Intersection Law)
Thank you !!
thank you because i was looking at it and i was like what this was not it. But thanks for clarifying
Imagine watching this video after your exam and then see that one of your exam questions was actually in this video 🙃
Thank you!!! I was so confused before this!!
Happy to help!
Amazing Explanation... Thank you
Thank you sooo much sir. I hope I can solve all problems from now, just practice...
very clear explanation thanks!
thank u so much
it will really help me in tommorrow's exam
Dary is a comedian hle🙌🙌🙌😂😂😂I've been laughing through the whole video
AMAZING MAN SO HELPFUL .......GOOD
Thank you 😊❤️ i understand it very easily 😊
you're still saving lives after 5 years even !!!!!
MUCH LOVE MAN
So helpful thanks❤
Thank you, dude.
It so helpful .Thank you!
So, can you start with any term, and use it a manipulate any other term?
So helpful ❤❤❤😍😍😍tq sooooooooo much
Thanks a lot, this is very helpful for nut brainer like me
Thank you very much great work😀😀
In the first example. What if we decided to use the A+1=1 rule and apply it to A.C.(1)+Ā and we get A.C.(1)
Then we will have AC as an answer
Will that be correct???
I follow you from Egypt
excellent exercises thanks
Really nice video thank you
Nice explanation dude...keep it up..👍👍
Exam on this in CMPEN 270 at PSU thanks mate
Thanks a lot mate.
Thanks so much , this actually helped alot
Glad it helped
i love how my lecturer just expected people to be able to do this
Here for the same reason brotha lol
I was the 4k person to like the video ;) thank you very much
Simple and smooth
Absolute W lad
Thank you for making something that was difficult for me to understand, understand fully well now thanks to your lesson.
thank you
Thanks a lot for this.
thanks very much I understand it easly
Thanks your video is so helpfull
Thank you, you help me to my report :D
Great job 👏👏👏
This is the 1st time I saw your video..... And I admit that your explanation is just awesome..... Enjoyed during your explanation.....
Nice.. .
Thanks brother 😊 i from India
Excellent teaching sir
Tnq so much sir
You are very nice teacher 👏😊
Fantastic, tysm!!!
if the given is (A+C+D) (A+C+D') (A+C'+D)
can I distribute (A+C+D) to (A+C+D') (A+C'+D) directly?
Thanks for this. Lesson boy. Expert
Thanks for sharing it with us
Was very helpful vedio
Thanks a lot sir after 3 hours my preboard exam will held 🤓
great job bro
If you have D’(AB + B’) how does this get reduced
Very helpful. Thanks
can someone explain to me why on the first problem letter B disappeared on the simplified expression? thanks
Didnt get what my professor was saying AT ALL, then you simply said "and" "or" and it all just magically clicked. W
Thank you so much 🙏
thank you very much ❤