x→0+lim(x([x1]+[x2]+…..+[xp])−x2([x21]+[x222]+[x292]))≥1(1+2+……+p)−(12+22+…92)≥1 $\begin{aligned}
& \frac{p(p+1)}{2}-\frac{9.10 .19}{6} \geq 1 \
& p(p+1) \geq 572
\end{aligned}Leastnaturalvalueofp$ is 24
Let [t] be the greatest integer less than or equal to t. Then the least value of p∈N for which x→0+lim(x([x1]+[x2]+…+[xp])−x2([x21]+[x222]+…+[x292]))≥1 is equal to ________.
Held on 29 Jan 2025 · Verified 6 Jul 2026.
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