Does the equality $\lfloor nx \rfloor = n\lfloor x \rfloor$ hold for the integers $n\ge 2$?
What does this sign "$\lfloor$" and " $\rfloor$" sign mean in this context?
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user1551
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Luthier415Hz
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5it is the "floor function" – user Jul 18 '23 at 10:29
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No, just take $x = 1/n$ – julio_es_sui_glace Jul 18 '23 at 11:19
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1Does this answer your question? Meaning of floor symbols in $f(x) = \dfrac{1}{2 \lfloor x \rfloor - x + 1}$ – Joe Jul 18 '23 at 11:31
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$\lfloor x \rfloor$ denotes the largest integer not more than $x$, where $x$ is any real number. For example, $\lfloor 13 \rfloor=13$, $\lfloor 22.2 \rfloor=22$ and $\lfloor -\pi \rfloor=-4$.
Now, to answer your original question, let $x=\dfrac{1}{n}$. Then, $\lfloor nx \rfloor=\lfloor 1 \rfloor=1$, but $n\lfloor x \rfloor=n\cdot 0=0$. Hence, the statement does not hold.
IraeVid
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