Chapter 7.2, Problem 52E

To determine

To find : the amount invested in 5.75% bond.

Answer to Problem 52E

The amount invested in 5.75% bond is $\boxed{\$20000}$

Explanation of Solution

Given information : Total amount invested in two municipal bonds that pay 5.75% and 6.25% simple interest is $32000. Annual interest income required for the investments is $1900

Formula used:

  $I=P\cdot r\cdot t$ whereP represents the initial investment, r represents the annual rate of interest in decimal, t represents the number of years and I represent the simple interest.

Concept Involved:

Assign variable for the unknown that we need to find. Write system of equations based on the given statements. Solve the system of equation either by elimination method or by substitution method.

Calculation:

Description	Steps
Assign variables for the unknown that we need to find	Let x be the amount invested in municipal bond paying 5.75% as interest, and y be the amount invested in municipal bond paying 6.25% as interest
Write an equation based on total amount of investment. Amount invested in municipal bond paying 5.75% interest + Amount invested in municipal bond paying 6.25% interest = Total investment	$x+y=32000$
Use the interest formula to find the interest amount earned due to the investment in municipal bond paying 5.75% interest in one year	$\begin{array}{l}{I}_{5.75\%}=x\cdot 0.0575\cdot 1\\ =0.0575x\end{array}$

Calculation (Continued):

Description	Steps
Use the interest formula to find the interest amount earned due to the investment in municipal bond paying 6.25% interest in one year	$\begin{array}{l}{I}_{6.25\%}=y\cdot 0.0625\cdot 1\\ =0.0625y\end{array}$
Write an equation based on the information that Annual interest income required for the investments is $1900	$0.0575x+0.0625y=1900$
Label the system of equations	$x+y=32000\to 1^{st}Equation$$0.0575x+0.0625y=1900\to 2^{nd}Equation$
Solve the 1st equation for y by subtracting x on both sides	$\begin{array}{l}x+y-x=32000-x\\ y=32000-x\end{array}$
Substitute 32000 − x for y in the 2nd equation	$0.0575x+0.0625\left(32000-x\right)=1900$
Distribute 0.0625 in the left side of the equation	$\begin{array}{l}0.0575x+0.0625\left(32000\right)+0.0625\left(-x\right)=1900\\ 0.0575x+2000-0.0625x=1900\end{array}$
Group and combine like terms	$\begin{array}{l}0.0575x-0.0625x+2000=1900\\ -0.005x+2000=1900\end{array}$
In the process of solving for x subtract 2000 on both sides of the equation and simplify	$-0.005x+2000-2000=1900-2000$ $-0.005x=-100$
Dividing -0.005 on both sides and simplify fraction on both sides	$\begin{array}{l}\frac{-0.005x}{-0.005}=\frac{-100}{-0.005}\\ x=20000\end{array}$
Substitute 20000 for x in $y=32000-x$	$\begin{array}{l}y=32000-20000\\ =12000\end{array}$

Conclusion:

The amount invested in municipal bond paying 5.75% as interest is $20000 and the amount invested in municipal bond paying 5.75% as interest is $12000