Answer:
The amount invested at 8% was $37,459.5
The amount invested at 6% was $1,513.5
The amount invested at 9% was $7,027
Explanation:
Let
x ----> the amount invested at 8%
y ---> the amount invested at 6%
z ---> the amount invested at 9%
we know that
[tex]x+y+z=46,000[/tex] ----> equation A
[tex]0.08x+0.06y+0.09z=3,720[/tex] ----> equation B
[tex]0.08x=33(0.06y)[/tex] ----> equation C
Solve the system of equations by calculator (wolfram alpha's tool)
see the attached figure
The solutions are
[tex]x=\$37,459.5\\y=\$1,513.5\\z=\$7,027[/tex]
therefore
The amount invested at 8% was $37,459.5
The amount invested at 6% was $1,513.5
The amount invested at 9% was $7,027
