Final answer:
To maximize interest, invest $9,500 in municipal bonds at 3% and $4,000 in Treasury bills at 6%, achieving a total interest of $525. When market interest rates are higher than the bond's rate, as with the local water company bond, it will sell for less than face value; in the given scenario, the bond's price would not exceed $964.
Step-by-step explanation:
To maximize the interest earned in one year, the student must invest $9,500 in municipal bonds at a 3% return and the remaining $4,000 in Treasury bills at a 6% return. This is determined based on the conditions that at least $9,500 should be invested in municipal bonds and no more than $4,000 in Treasury bills.
To illustrate, if $x$ represents the amount in municipal bonds and $y$ represents the amount in Treasury bills:
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- If $x = $9,500 and $y = $4,000, then the total interest is $(0.03 \times 9500) + (0.06 \times 4000)$
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- Total Interest = $285 + $240 = $525
Any amount less than $9,500 in municipal bonds or more than $4,000 in Treasury bills will result in less total interest earned over the year.
When it comes to buying the local water company bond at a 6% rate when the market interest rate is 9%, investors would expect to pay less than the bond's face value of $10,000 due to the higher prevailing market interest rates.
If the expected payments from the bond one year from now are $1,080, and the market interest rate is 12%, the bond's price when its interest rate is less than the market interest rate would not exceed $964. By using the formula:
This implies that the current value of the bond's expected payments must be equal to the amount that could be earned from an alternative investment at the new market rate of 12%. Thus, the maximum that should be paid for this bond is $964.