Encontrar la suma de la serie; la suma de cuadrados de

Question

Es allí cualquier manera de encontrar la suma de la siguiente serie ?

$$\underbrace{10^2 + 14^2 + 18^2 +\cdots}_{41\text{ terms}}$$

Tengo esta pregunta en un examen competitivo.

Answer 1

Esta serie es igual a

$$\sum_{n=0}^{40} (10+4n)^2= 4\sum_{n=0}^{40} (5+2n)^2= 4\sum_{n=0}^{40} (25+20n+4n^2)= 4\left(25\sum_{n=0}^{40}1 +20\sum_{n=0}^{40}n+4\sum_{n=0}^{40}n^2\right)$$

Ahora recuerdo que

$$\sum_{n=0}^m 1=m+1$$

$$\sum_{n=0}^m n=\frac{m(m+1)}{2}$$

$$\sum_{n=0}^m n^2=\frac{m(m+1)(2m+1)}{6}$$

Answer 2

Vamos $$A=10^2+14^2+18^2+\dots$$ to 41 terms. Then $A=4B$, where $$B=5^2+7^2+9^2+\dots$$ to 41 terms. Let $$C=6^2+8^2+10^2+\dots$$ to 41 terms. Then $$B+C=5^2+6^2+7^2+\dots=(1^2+2^2+3^2+\dots)-(1^2+2^2+3^2+4^2)$$ where the sums go to $86^2$. Also, $C=4D$, where $$D=3^2+4^2+5^2+\dots=(1^2+2^2+3^2+\dots)-(1^2+2^2)$$ where the sums go to $43^2$. So you can calculate $D$ from Argon's last formula, then from $D$ you can get $C$; you can get $B+C$ from Argon, then $B$, then, finally, $A$.