Answer:
The annual multiplier is 0.27 and Annual Percent in decrease is 73%.
Step-by-step explanation:
Given:
Initial Value [tex]a_i = \$500[/tex]
Elapsed time [tex]n= 3\ years[/tex]
Final Value [tex]a_3 = \$10[/tex]
We need to find the annual multiplier and annual percent of decrease.
Solution:
Now we know that;
The Final value after n years is equal to Initial value multiplied by the multiplier raise to number of elapsed years.
framing in equation form we get;
[tex]a_n=a_i\times (m)^n[/tex]
m⇒ annual multiplier
Substituting the values we get;
[tex]10=500\times (m)^3\\\\m^3=\frac{10}{500}\\\\m^3=\frac{1}{50}[/tex]
Taking cube root we get;
[tex]\sqrt[3]{m^3}=\sqrt[3]{\frac{1}{50}} \\\\m=0.27[/tex]
Hence the annual multiplier is 0.27.
Now We will find the annual percent of decrease.
Now we know that;
annual multiplier is equal to 1 minus the depreciation rate.
[tex]m=1-r[/tex]
r ⇒ annual percent in decrease.
[tex]0.27 =1-r\\\\r = 0.73\ \ Or \ \ 73\%[/tex]
Hence Annual Percent in decrease is 73%.
