Consider the following statements:I: The numb | vedclass

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(C) Given number $N = 2^{\alpha_1} \cdot 3^{\alpha_2} \cdot (2^2)^{\alpha_3} \cdot 5^{\alpha_4} \cdot (2 \cdot 3)^{\alpha_5} = 2^{\alpha_1+2\alpha_3+\

Vedclass · Accepted Answer

$I$ is false and $II$ is true

Vedclass · Answer

(C) Given number $N = 2^{\alpha_1} \cdot 3^{\alpha_2} \cdot (2^2)^{\alpha_3} \cdot 5^{\alpha_4} \cdot (2 \cdot 3)^{\alpha_5} = 2^{\alpha_1+2\alpha_3+\alpha_5} \cdot 3^{\alpha_2+\alpha_5} \cdot 5^{\alpha_4}$.Let $A = \alpha_1+2\alpha_3+\alpha_5$,$B = \alpha_2+\alpha_5$,and $C = \alpha_4$.The total number of divisors is $(A+1)(B+1)(C+1)$.The number of odd divisors is $(B+1)(C+1)$.The number of even divisors is $(A+1)(B+1)(C+1) - (B+1)(C+1) = A(B+1)(C+1)$.Non-trivial even divisors exclude the number itself,so it is $A(B+1)(C+1)-1 = (\alpha_1+2\alpha_3+\alpha_5)(\alpha_2+\alpha_5+1)(\alpha_4+1)-1$. Thus,$I$ is false.Non-trivial odd divisors exclude $1$,so it is $(B+1)(C+1)-1 = (\alpha_2+\alpha_5+1)(\alpha_4+1)-1 = \alpha_2\alpha_4 + \alpha_2 + \alpha_5\alpha_4 + \alpha_5 + \alpha_4 + 1 - 1 = \alpha_2+\alpha_4+\alpha_5+\alpha_2\alpha_4+\alpha_4\alpha_5$. Thus,$II$ is true.

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