Question

find HCF of 195,2948 by Euclid's methid​

Answer 1

Answer: Given that,

Numbers are 195,2948

By using Euclid division lemma,

HCF is in the form of a=bq+r

Here 2948>195

2948=195×15+23

195=23×8+11

23=11×2+1

so the HCF is 1

Step-by-step explanation:

Hope it helps you frnd........

Answer 2

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Given :

$\sf{Numbers ~are~ 195,2948}$

Solution :

$\sf{By ~using ~Euclid ~division ;}$

$\sf{HCF~ is ~in ~the ~form ~of ~ a~=~bq~+~r}$

$\sf{Here~ 2948>195}$

$\sf{2948~=195×15+23}$

$\sf{195=23×8+11}$

$\sf{23=11×2+1}$

$\sf{\therefore{the~ HCF~ is ~1}}$

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