Answer:
$14,000 should be invested in the 4.75% bond
Step-by-step explanation:
We need to find the amount "x" that needs to be invested at 4.75%.
Notice as well that the total to be invested equals $38,000, and therefore, what is going to be invested in the other bond (5.25%) must be "$38,000-x"
We now write the equation for the addition of both interests coming from such investment, recalling the formula for simple interest as : I = P * r * t
Where I = Interest
P = Principal (amount deposited)
r = percent rate in decimal form
t = time (one year)
so for the amount x on the 4.75% bond, the interest after one year would be:
[tex]I_1=x\,*\,0.0475\,*\,1=0.0475\,x[/tex]
For the amount ($38000-x on the 5.25% bond, the interest after one year would be:
[tex]I_2=(38000-x)\,*\,0.0525\,*\,1=1995-0.0525\,x[/tex]
Then, the addition of both interests would render:
[tex]I_1+I_2=0.0475\,x+1995-0.0525\,x=1995-0.005\,x[/tex]
Now, recall that the investor wants this total interest to be $1925, then we can write the following equation and solve for "x":
[tex]1995-0.005\,x=1925\\1995-1925=0.005\,x\\70=0.005\,x\\x=70/0.005\\x=14000[/tex]
Therefore, the amount to be deposited in the 4.75% bond should be $14,000
