What is the current value of a $1,000 bond with a 6% annual coupon rate (paid semi-annually) that matures in 11 years if the appropriate stated annual discount rate is 12%.?

The yield to maturity of a bond is the appropriate discount rate (YTM).
The YTM represents the return an investor will receive if he or she holds the bond until maturity.
The YTM and bond price are linked; if we know one, we can figure out the other.

To find the current value:

Let,

C = bond semiannual coupon = 10% / 2 × 1,000 = $50
r = semiannual interest rate (discount rate, YTM) = 9% / 2 = 4.5%
n = number of semiannual periods = 4 × 2 = 8

The price of a bond can be calculated using a formula.

This is the formula:

[tex]\begin{aligned}&\text { Price }=C * \frac{1-(1+r)^{-n}}{r}+\frac{\text { Par }}{(1+r)^n} \\&\text { Price }=50 * \frac{1-(1+0.045)^{-8}}{0.045}+\frac{1,000}{(1+0.045)^8} \\&\text { Price }=\$ 1,032.98\end{aligned}[/tex]

Therefore, the current value is $1,032.98.

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The correct question is given below:
What is the current value of a $1,000 bond with a 10% annual coupon rate (paid semi-annually) that matures in 4 years if the appropriate stated annual discount rate is 9%?