Answer:
DA= $800 and DB= $1200
Step-by-step explanation:
Equation I (Interest of Bank A):
IA= 0.06/year*DA *1year (DA= Deposit in Bank A)
IA= 0.06*DA
Equation II (Interest of Bank B):
IB= 0.08/year*DB *1year (DB= Deposit in Bank B)
IB= 0.08*DB
Total interest:
TI=IA+IB=$144
Total deposit:
TD= DA +DB= $2000
Adding equations I and II:
IA+IB = 0.06DA +0.08DB
$144= 0.06DA+0.08DB
(DB= $2000-DA)
When replacing DB:
$144= 0.06DA + 0.08($2000-DA)
Applying distributive property:
$144= 0.06DA + (0.08*$2000) -0.08DA
$144= -0.02DA + $160
0.02DA= $160-$144
0.02DA = $16
DA= $16/0.02
DA= $800
DB= $2000-$800
DB= $1200
Amount deposited in Bank A = $800
Amount deposited in Bank B = $1200
In the question,
Total amount deposited by Michael Perez in the Banks A and B = $2000
Interest rate of Bank A = 6% / year
Interest rate of Bank B = 8% / year
Also,
Total Interest earned by both the banks in a year = $144
Now,
Let us say the amount deposited in Bank A is = x
and,
Amount deposited in Bank B = (2000 - x)
So,
[tex]\frac{6}{100}x+\frac{8}{100}(2000-x)=144\\0.06x+0.08(2000)-0.08x=144\\-0.02x+160=144\\0.02x=16\\x=800[/tex]
Therefore,
Amount deposited in Bank A = $800
and,
Amount deposited in Bank B = $1200
