Answer :
We invested $7000 invested in two accounts, we don't know how much exactly is in each account, therefore we will assign variables to these amounts. The amount invested in the "8%" account is "x", while the other one is "y". The sum of these two numbers must be equal to $7000, therefore:
[tex]x+y=7000[/tex]The sum of interest of each account should be equal to 580, therefore:
[tex]0.08\cdot x+0.12\cdot y=580[/tex]We need to solve the system in order to determine the values.
[tex]\begin{gathered} \begin{cases}x+y=7000 \\ 0.08x+0.12y=580\end{cases} \\ \begin{cases}-0.12x-0.12y=-840 \\ 0.08x+0.12y=580\end{cases} \\ -0.04x=-260 \\ x=\frac{-260}{-0.04}=6500 \\ \end{gathered}[/tex]Now we can replace the value of "x" in the first equation to determine the value of "y".
[tex]\begin{gathered} 6500+y=7000 \\ y=7000-6500 \\ y=500 \end{gathered}[/tex]The values are 6500 in the 8% account and 500 in the 12% account.