Question

Essa é fácil pessoal, vamos aguçar a mente!!

Dada a Progressão Aritmética:
P.A : (...,44,...,58,...,93)
A6=44
A8=58

Determine

Razão:
A1:
Quantos termos tem a P.A:
Soma de todos os Termos dessa P.A:

Answer 1

Boa tarde Juliano!

Solução!

$a6=44\\\\ a8=58$

Vamos escrever esses termos em forma de um sistema.

$\begin{cases} a1+5r=44\\\ a1+7r=58 \end{cases}\\\\\\ \begin{cases} -a1-5r=-44\\\ a1+7r=58 \end{cases}\\\\\\ -5r+7r=-44+58\\\\\ 2r=14\\\\\ r= \dfrac{14}{2}\\\\\ \boxed{r=7} \\\\\\\\ a1+5r=44\\\\\ a1+5(7)=44\\\\ a1+35=44\\\\\ a1=44-35\\\\\ \boxed{a1=9}$

Numero de termos da P.A

$an=a1+(n-1).r\\\\\ 93=9+(n-1)7\\\\\\ 93=9+7n-7\\\\\ 93=2+7n\\\\\ 93-2=7n\\\\\ 91=7n\\\\\ n= \dfrac{91}{7}\\\\ \boxed{n=13}$

Soma dos termos da P.A

$Sn= \dfrac{(a1+an)n}{2}\\\\\\\ Sn= \dfrac{(9+93)13}{2}\\\\\\\ Sn= \dfrac{(96)13}{2}\\\\\\\ Sn= \dfrac{1326}{2}\\\\\\\ \boxed{Sn= 663}$

Boa tarde!
Bons estudos!