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Use Euclid's division algorithm to find the HCF of
(1) 900 and 270 (ii) 196 and 38220 (iii) 1651 and 2032
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Answer:
(i ) a= b(q) + r
900=270(3) +90
270=90(3)+0
The HCF of the 900 and 270 by using Euclid's Division algorithm is 90.
(ii) a=b(q)+r
38220=196(195)+0
The HCF of the 196 and 38220 by using Euclid's Division algorithm is 196.
(iii)a=b(q)+r
2032=1681(1)+381
1651=381(4)+127
381=127(3)+0
The HCF of the 1651 and 2032 by using Euclid's Division algorithm is 127.
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