a: Assuming a > b > 0 prove gcd(a, b) = gcd(b, r) where r is the remainder when a is divided by b. b: Use the Euclid's Algorithm to find gcd(44, 104), and then find two integers æ and y that safisfy 44.x104y= gcd(44, 104)

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solve part b

a: Assuming a > b > 0 prove gcd(a, b) = gcd(b, r) where r is the remainder when a is divided by
b.
b: Use the Euclid's Algorithm to find gcd(44, 104), and then find two integers æ and y that safisfy
44.x104y=
gcd(44, 104)
Transcribed Image Text:a: Assuming a > b > 0 prove gcd(a, b) = gcd(b, r) where r is the remainder when a is divided by b. b: Use the Euclid's Algorithm to find gcd(44, 104), and then find two integers æ and y that safisfy 44.x104y= gcd(44, 104)
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