Answer: $3,338.56.
Explanation:
Given, EAR = 11.4 percent =0.114
Weekly interest rate=[tex]\dfrac{EAR}{\text{Number of weeks in a year}}=\dfrac{0.114}{52}=0.00219[/tex]
Growth rate of price of flowers = 3.3 % per year
Weekly growth rate=[tex]\dfrac{0.033}{52}=0.00063[/tex]
Star Cost (C)= $6
Time period (t)= 25 years
= 25 x 52 = 1300 weeks
Required formula for growing annuity :
[tex]PV=\dfrac{C}{r-g}[1-(\dfrac{1+g}{1+r})^t][/tex],
where C = Star cost
r = rate per period
g= growth rate
t = time period
[tex]PV=\dfrac{6}{0.00219-0.00063}[1-(\dfrac{1+0.00063}{1+0.00219})^{1300}]\\\\=\dfrac{6}{0.00156}[1-(0.998443408934)^{1300}]\\\\=(3846.15384615)[1-0.13197471131]\\\\=(3846.15384615)(0.86802528869)\approx\$3338.56[/tex]
Hence, the present value of this commitment = $3,338.56.
