Answer:
The amount invested at 8% rate is $1,200
The amount invested at 10% rate is $2,000
The amount invested at 12% rate is $3,500
Step-by-step explanation:
step 1
Let
x-----> the amount invested at 8% rate
y-----> the amount invested at 10% rate
z-----> the amount invested at 12% rate
[tex]z=(x+y)+300[/tex] ----> equation A
[tex]x+y+z=6,700[/tex] ----> equation B
substitute equation A in equation B
[tex]x+y+(x+y+300)=6,700[/tex]
[tex]2x+2y=6,400[/tex]
[tex]x+y=3,200[/tex] -----> equation C
we know that
The simple interest formula is equal to
[tex]I=P(rt)[/tex]
where
I is the Final Interest Value
P is the Principal amount of money to be invested
r is the rate of interest
t is Number of Time Periods
in this problem we have
[tex]t=1\ year\\ P=\$6,700\\ I=\$716[/tex]
substitute in the formula above
[tex]716=x(0.08)+y(0.10)+z(0.12)[/tex]
substitute equation A
[tex]716=x(0.08)+y(0.10)+(x+y+300)(0.12)[/tex]
[tex]716=0.08x+0.10y+0.12x+0.12y+36[/tex]
[tex]716=0.20x+0.22y+36[/tex]
[tex]0.20x+0.22y=680[/tex] -----> equation D
step 2
Solve the system of equations
x+y=3,200 -----> equation C
[tex]0.20x+0.22y=680[/tex] -----> equation D
Solve the system by graphing
The solution is the point (1,200,2,000)
see the attached figure
Find the value of z
[tex]z=(x+y)+300[/tex]
[tex]z=(1,200+2,000)+300=3.500[/tex]
therefore
The amount invested at 8% rate is $1,200
The amount invested at 10% rate is $2,000
The amount invested at 12% rate is $3,500
