Respuesta :
Answer:
a. [tex]y=830*(0.87)^x[/tex]
b. The value of stereo system after 2 years will be $628.23.
c. After approximately 4.98 years the stereo will be worth half the original value.
Step-by-step explanation:
Let x be the number of years.
We have been given that you purchased a stereo system for $830. The value of the stereo system decreases 13% each year.
a. Since we know that an exponential function is in form: [tex]y=a*b^x[/tex], where,
a = Initial value,
b = For decay b is in form (1-r), where r is rate in decimal form.
Let us convert our given rate in decimal form.
[tex]13\%=\frac{13}{100}=0.13[/tex]
Upon substituting our given values in exponential decay function we will get
[tex]y=830*(1-0.13)^x[/tex]
[tex]y=830*(0.87)^x[/tex]
Therefore, the exponential model [tex]y=830*(0.87)^x[/tex] represents the value of the stereo system in terms of the number of years since the purchase.
b. To find the value of stereo system after 2 years we will substitute x=2 in our model.
[tex]y=830*(0.87)^2[/tex]
[tex]y=830*0.7569[/tex]
[tex]y=628.227\approx 628.23[/tex]
Therefore, the value of stereo system after 2 years will be $628.23.
c. The half of the original price will be [tex]\frac{830}{2}=415[/tex].
Let us substitute y=415 in our model to find the time it will take the stereo to be worth half the original value.
[tex]415=830*(0.87)^x[/tex]
Upon dividing both sides of our equation by 830 we will get,
[tex]\frac{415}{830}=\frac{830*(0.87)^x}{830}[/tex]
[tex]0.5=0.87^x[/tex]
Let us take natural log of both sides of our equation.
[tex]ln(0.5)=ln(0.87^x)[/tex]
Using natural log property [tex]ln(a^b)=b*ln(a)[/tex] we will get,
[tex]ln(0.5)=x*ln(0.87)[/tex]
[tex]\frac{ln(0.5)}{ln(0.87)}=\frac{x*ln(0.87)}{ln(0.87)}[/tex]
[tex]\frac{ln(0.5)}{ln(0.87)}=x[/tex]
[tex]\frac{-0.6931471805599}{-0.139262067}=x[/tex]
[tex]x=4.977286\approx 4.98[/tex]
Therefore, after approximately 4.98 years the stereo will be worth half the original value.
