find hcf 52 and 117 and express it in the form of 52x+117y
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According to Euclid's division lemma
a=bq+r, 0<=r117=52*2+13
52=13*4+0
13=(117*1)-(52*2)
13=-(52*2)+(117*1)
13=52x+117y
x = (-2), y = 1
a=bq+r, 0<=r117=52*2+13
52=13*4+0
13=(117*1)-(52*2)
13=-(52*2)+(117*1)
13=52x+117y
x = (-2), y = 1
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