Bézout's identity: ax+by=gcd(a,b)
Here's an example of using Bézout's identity, ax+by=gcd(a,b), to find all integer solutions to 432x+126y=18. The key is to use Euclid's algorithm, aka zigzag...
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About this video
Here's an example of using Bézout's identity, ax+by=gcd(a,b), to find all integer solutions to 432x+126y=18. The key is to use Euclid's algorithm, aka zigzag division, to find the greatest common factor of 432 and 126 and then connect the computations together. This is a very important concept in Number Theory.
number theory playlist: https://www.youtube.com/playlist?list=PLj7p5OoL6vGzEZIo2yutOIaQhzVEwFKFm
Check out Max! Proof of the Division Algorithm, https://youtu.be/ZPtO9HMl398
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Published
Apr 25, 2018
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#Bézout's identity #ax+by=gcd #division algorithm #number theory bases #zigzag division #long division #Extended Euclidean
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