3.) $a_{n}=-\frac{5}{n}$

Step 1 - Write the sequence starting from index 1:
The sequence terms are:
$a_1=-5$a_(1)=-5
$a_2=-\frac{5}{2}$a_(2)=-(5)/(2)
$a_3=-\frac{5}{3}$a_(3)=-(5)/(3)
$a_4=-\frac{5}{4}$a_(4)=-(5)/(4)
$...$...
$a_n=-\frac{5}{n}$a_(n)=-(5)/(n)
Step 2 - We can find the Sum of the first n terms of the sequence using the formula:
$S_n=\sum _{i=1}^n{a}_i$S_(n)=sum_(i=1)^(n)a_(i)
By substituting the value of $a_n=-\frac{5}{n}$a_(n)=-(5)/(n), we solve for the formula of $S_n$S_(n).
$S_n=-5(\frac{1}{1}+\frac{1}{2}+\frac{1}{3}+...+\frac{1}{n})$S_(n)=-5((1)/(1)+(1)/(2)+(1)/(3)+...+(1)/(n))
Step 3 - Simplify the formula by using the Harmonic Number formula:
$H_n=\sum _{k=1}^n\frac{1}{k}$H_(n)=sum_(k=1)^(n)(1)/(k)
$S_n=-5H_n+5$S_(n)=-5H_(n)+5
Step 4 - Write the final answer:
$S_n=-5H_n+5$S_(n)=-5H_(n)+5
Answer: $S_n=-5H_n+5$S_(n)=-5H_(n)+5
Harmonic Number and Sequence Summation in Series