The HCF of 144 and 198 is
6
9
12
18
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By division method:
144)198(‾1x))−144‾x21(()54)144(‾2x+1xa−108‾x2a+2x()36)54(‾1x+1xa+()−36‾x2a+2x++(18)36(‾2x+1xa+++(−36‾x2a+2x++++(0\begin{array}{l} 144\overline{\smash{\big)}198\smash{\big(}}\phantom{}1 \ \phantom{x}\phantom{))}\underline{-144} \ \phantom{{x^2 } 1(()}54\overline{\smash{\big)}144\smash{\big(}}\phantom{}2 \ \phantom{{x} +1xa}\underline{-108} \ \phantom{{x^2 a} + 2x()} 36\overline{\smash{\big)}54\smash{\big(}}\phantom{}1 \ \phantom{{x} +1xa+()}\underline{-36} \ \phantom{{x^2 a} + 2x++(} 18\overline{\smash{\big)}36\smash{\big(}}\phantom{}2 \ \phantom{{x} +1xa+++(}\underline{-36} \ \phantom{{x^2 a} + 2x++++(} 0 \ \end{array}144)198(1x))−144x21(()54)144(2x+1xa−108x2a+2x()36)54(1x+1xa+()−36x2a+2x++(18)36(2x+1xa+++(−36x2a+2x++++(0
So, HCF of 144 and 198 = 18.
Hence, option 4 is the correct option.
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If a number is divisible by 5 and 6 both, then it may not be divisible by
10
15
30
60
The number of common prime factors of 60, 75 and 105 is
2
3
4
5
The LCM of 30 and 45 is
45
90
If HCF of two numbers is 15 and their product is 1575, then their LCM is
105
525
1575
