In each part, find the greatest common divisor ( a , b ) and integers m and n such that ( a , b ) = a m + b n . a = 0 , b = − 3 . a = 65 , b = − 91 . a = 102 , b = 66 . a = 52 , b = 124 . a = 414 , b = − 33 . a = 252 , b = − 180 . a = 414 , b = 693 . a = 382 , b = 26 . a = 1197 , b = 312 . a = 3780 , b = 1200 . a = 6420 , b = 132 . a = 602 , b = 252 . a = 5088 , b = − 156 . a = 8767 , b = 252
In each part, find the greatest common divisor ( a , b ) and integers m and n such that ( a , b ) = a m + b n . a = 0 , b = − 3 . a = 65 , b = − 91 . a = 102 , b = 66 . a = 52 , b = 124 . a = 414 , b = − 33 . a = 252 , b = − 180 . a = 414 , b = 693 . a = 382 , b = 26 . a = 1197 , b = 312 . a = 3780 , b = 1200 . a = 6420 , b = 132 . a = 602 , b = 252 . a = 5088 , b = − 156 . a = 8767 , b = 252
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