Let x be the amount of money, you fund in Fund A and y be the amount of mone yyou fund in Fund B.
1. You have 250,000 In an IRA at the time you retire and want to invest this money into Funds A and B, then
[tex]x+y=250,000.[/tex]
2. Fund A pays 1.2% (as a decimal 1.2% is 0.012) annually, then [tex]x\cdot 0.012=0.012x[/tex] is annual interest income in Fund A.
Fund B pays 6.2% (as a decimal 6.2% is 0.062) annually, then [tex]y\cdot 0.062=0.062y[/tex] is annual interest income in Fund B.
Since Fund A and Fund B produce an annual interest income of $8,000, then
[tex]0.012x+0.062y=8,000.[/tex]
3. Solve the system of equations:
[tex]\left\{\begin{array}{l}x+y=250,000\\0.012x+0.062y=8,000.\end{array}\right.[/tex]
Express x from first equation [tex]x=250,000-y[/tex] and substitute it into the second equation
[tex]0.012(250,000-y)+0.062y=8,000.[/tex]
Multiply this equation by 1000:
[tex]12(250,000-y)+62y=8000,000,\\ \\3000,000-12y+62y=8000,000,\\ \\62y-12y=8000,000-3000,000,\\ \\50y=5000,000,\\ \\y=100,000[/tex]
Then
[tex]x=250,000-100,000=150,000.[/tex]
Answer: you have to fund $150,000 in Fund A and $100,000 in Fund B.
