If [x] denotes the integral part of x, then displaystyle lim n arrow ∞ (1/n3)( displaystyle∑k=1n[k2 x])=

Question

If [x] denotes the integral part of x, then displaystyle lim n arrow ∞ (1/n3)( displaystyle∑k=1n[k2 x])= (A) 0 (B) (x/2) (C) (x/3) (D) (x/6)

Tardigrade Admin · Accepted Answer

Let L= displaystyle lim n arrow ∞ (1/n3)( displaystyle∑k=1n[k2 x]) Since k2 x-1 ≤[k2 x]< k2 x ⇒ displaystyle∑k=1n(k2 x-1) ≤ displaystyle∑k=1n[k2 x]< displaystyle∑k=1n k2 x a ⇒ x( displaystyle∑k=1n k2)-∑k=1n(1) ≤ ∑k=1n[k2 x]< x( displaystyle∑k=1n k2) ⇒ (x n(n+1)(2 n+1)/6)-n ≤ displaystyle∑k=1n[k2 x]<(x n(n+1)(2 n+1)/6) Dividing throughout by n3, we have (x n(n+1)(2 n+1)/6 n3)-(1/n2) ≤ displaystyle∑k=1n ([k2 x]/n3)< (x n(n+1)(2 n+1)/6 n3) ⇒ (x/6)(1+(1/n))(2+(1/n))-(1/n2) ≤ displaystyle∑k=1n ([k2 x]/n3)< (x/6)(1+(1/n))(2+(1/n)) Taking limits as n arrow ∞, we get displaystyle lim n arrow ∞ (x/6)(1+(1/n))(2+(1/n))-(1/n2) ≤ L< displaystyle lim n arrow ∞ (x/6)(1+(1/n))(2+(1/n)) Since, as n arrow ∞, we have (1/n) arrow 0 ⇒ (x/3) ≤ L<(x/3) According to Squeeze Principle or Sandwich Theorem, we have L=(x/3)

Q. If $[x]$ denotes the integral part of $x$ , then $n \to \infty lim \frac{1}{n ^{3}} (k = 1 \sum n [k^{2} x]) =$

$0$

$\frac{x}{2}$

$\frac{x}{3}$

$\frac{x}{6}$

Q. If [x] denotes the integral part of x, then n→∞lim​n31​(k=1∑n​[k2x])=

0

2x​

3x​

6x​

Q. If $[x]$ denotes the integral part of $x$ , then $n \to \infty lim \frac{1}{n ^{3}} (k = 1 \sum n [k^{2} x]) =$

$0$

$\frac{x}{2}$

$\frac{x}{3}$

$\frac{x}{6}$