Let x represent amount invested in the higher-yielding account.
We have been given that a man puts twice as much in the lower-yielding account because it is less risky. So amount invested in the lower-yielding account would be [tex]2x[/tex].
We are also told that his annual interest is $6600 dollars. We know that annual interest for one year will be principal amount times interest rate.
[tex]I=Prt[/tex], where,
I = Amount of interest,
P = Principal amount,
r = Annual interest rate in decimal form,
t = Time in years.
We are told that interest rates are 6% and 10%.
[tex]6\%=\frac{6}{100}=0.06[/tex]
[tex]10\%=\frac{10}{100}=0.10[/tex]
Amount of interest earned from lower-yielding account: [tex]2x(0.06)=0.12x[/tex].
Amount of interest earned from higher-yielding account: [tex]x(0.10)=0.10x[/tex].
[tex]0.12x+0.10x=6600[/tex]
Let us solve for x.
[tex]0.22x=6600[/tex]
[tex]\frac{0.22x}{0.22}=\frac{6600}{0.22}[/tex]
[tex]x=30,000[/tex]
Therefore, the man invested $30,000 at 10%.
Amount invested in the lower-yielding account would be [tex]2x\Rightarrow 2(30,000)=60,000[/tex].
Therefore, the man invested $60,000 at 6%.
