12.1(d) - Carry Look Ahead (CLA) Adders
You learn best from this video if you have my textbook in front of you and are following along. Get the book here: amzn.to/32IbAaN. This video covers a portion (see title of video!) of the textbook "Introduction to Logic Circuits & Logic Design with VHDL" by Brock LaMeres. I also have a Verilog version of this textbook, which you can get here: amzn.to/2FDCs2Q.
Пікірлер: 42
Man, this professor is great. So peppy and explains it pretty well while keeping it entertaining.
you can't imagine how thankful am i right now thanks so much sir .
His enthusiasm and energy
Jesus this is the best video in youtube period
Holy crap this makes so much more sense now. Thank you.
fantastic description of something everyone else makes extremely complicated, many thanks!
@gpsaranya8578
3 жыл бұрын
🙏
What an absolutely fantastic video. The library of Congress needs to preserve this video
I love this video. I'm not a circuit designer but wanted a basic understanding of how non-cascading adders work, and that's exactly what I got. Thank you!
Really really thank you for this great and in-depth video. I didnt understand it in my lecture that was held in German, but here it seemed way clearer. I also love your energy, that you bring to the lesson. Thank you again Sir, you are a great teacher!
Finally makes sense, thank you so much!
Amazing, simple and very straight forward
This is great! I just found this channel and I love it.
ZERO DISLIKE - THATS THE LEVEL OF TEACHING
Thank you so much for making this video!
Really really thank you save my digital logic, thank you!!
beauifuly explained sir thank you I learned 2 or 4 times before finally understood here
Thank you so so much. You are the best
Very nice video, thank you professor
Which textbook are you using? Thank you for this video, by the way!!
Thk you oh so much. I'm interested in adding a pair of irrational numbers exactly. A pair of irrational numbers can not be traditionally added from their right-to-leftward placeholder digits because there are infinite placeholder digits to the right of the decimal point of each irrational number. But they might be added from left-to-rightward placeholder digits. However still there's the problem of a cumulative ripple carry-over add delay. As you pointed-out, the carry-over from one placeholder to another is a function of the pair of irrational numbers (aka carry-look-ahead). Thus carry-look-ahead addition would avoid that cumulative ripple leftward carry-over delay. Although carry-look-ahead addition would still take an infinite time to add a pair of irrational numbers, it would be infinitely better than an carry-over adder. I’m an optimistic person & would like to consider this progress towards my goal :)
Anybody else noticing, that the p and g expressions at 5:30 are the same as min/max in the comparator elements in a sorting network?
can you please upload a video for Carry look ahead Subtractor?
@nitinbhattacharyya8784
4 жыл бұрын
Put the initial Cin as 1 ,then put B through not gate as the input for CLA
can you just make videos for an entire CSO class pls.
this lecture is great, but whatever
You sound like a mixture of Chris Evans and RDJ.
😇🙌
Parabolic past arch
hahah "wat the hell"
Ohawh
ChifFEeeeeeee
Kraked@C
#
Tooth precC
I. P distinguisher from alp varia
Logf
Carrd
Odds evend
NOT SUMOR
Hyper