find the HCF of 180 252 and 324 by using Euclid division Lemma
Answers
Answered by
32
consider 252 and 324. here, a=324 and b=252
by euclid's division lemma-
a=bq+r, 0< or= r<b
324=252*1+72
252=72*3+36
72=36*2+0
therefore, HCF(252, 324)=36
Now consider 36 and 180. here a=180 and b=36.
by euclid's division lemma- a=bq+r, 0< or = r < b
180=36*5+0
therefore, HCF(180, 36)=36
Hence, HCF(180, 252, 324)=36
by euclid's division lemma-
a=bq+r, 0< or= r<b
324=252*1+72
252=72*3+36
72=36*2+0
therefore, HCF(252, 324)=36
Now consider 36 and 180. here a=180 and b=36.
by euclid's division lemma- a=bq+r, 0< or = r < b
180=36*5+0
therefore, HCF(180, 36)=36
Hence, HCF(180, 252, 324)=36
Answered by
5
First of all consider 252 and 324. here, a = 324
And b =252
By euclid's division lemma-
a = bq + r, 0 < or = r < b
324 = 252 * 1 + 72
252 = 72 * 3 + 36
72 = 36 * 2 + 0
Therefore, HCF (252, 324) = 36
Now consider 36 and 180. here a=180 and b=36.
By euclid's division lemma- a = bq + r, 0 < or = r < b
180 = 36 * 5 + 0
Therefore, HCF ( 180, 36 ) = 36
Hence, HCF(180, 252, 324)
= 36
Similar questions