Which of the following statement(s) is/are TR | vedclass

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(D) To evaluate statement $I$: $33^{3} > 3^{33}$.We can write $33^{3} = (3 	imes 11)^{3} = 3^{3} 	imes 11^{3}$.Comparing $3^{3} 	imes 11^{3}$ with

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Neither $I$ nor $II$

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(D) To evaluate statement $I$: $33^{3} > 3^{33}$.We can write $33^{3} = (3 	imes 11)^{3} = 3^{3} 	imes 11^{3}$.Comparing $3^{3} 	imes 11^{3}$ with $3^{33}$,we divide both sides by $3^{3}$:$11^{3}$ vs $3^{30}$.Since $11^{3} = 1331$ and $3^{30} = (3^{3})^{10} = 27^{10}$,it is clear that $1331 Therefore,$33^{3} To evaluate statement $II$: $333 > (3^{3})^{3}$.$(3^{3})^{3} = 3^{9} = 19683$.Since $333 Thus,neither $I$ nor $II$ is true.

Which of the following statement$(s)$ is/are $TRUE$?
$I.$ $33^{3} > 3^{33}$
$II.$ $333 > (3^{3})^{3}$

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Which of the following statement$(s)$ is/are $TRUE$?$I.$ $33^{3} > 3^{33}$$II.$ $333 > (3^{3})^{3}$