Answer:
B. [tex]c[p(g)]=0.896g[/tex]
Step-by-step explanation:
We have been given that gaming systems are on sale for 20% off the original price (g), which can be expressed with the function p(g) = 0.8g.
[tex]\text{The price of gaming system after discount}=g-\frac{20}{100}g[/tex]
[tex]\text{The price of gaming system after discount}=g-0.20g[/tex]
[tex]\text{The price of gaming system after discount}=0.80g[/tex]
We are also given that local taxes are an additional 12% of the discounted price, so final price of gaming system will be 0.8g plus 12% of 0.8g.
[tex]\text{Price of the gaming system after sales tax}=0.8g+(\frac{12}{100}\times 0.8g)[/tex]
[tex]\text{Price of the gaming system after sales tax}=0.8g+(0.12\times 0.8g)[/tex]
Upon factoring out 0.8 we will get,
[tex]\text{Price of the gaming system after sales tax}=0.8g(1+0.12)[/tex]
[tex]\text{Price of the gaming system after sales tax}=0.8g(1.12)[/tex]
We can see that this is a composite function as:
[tex]p(g)=0.8g[/tex]
[tex]c(p)=1.12p[/tex]
Upon substituting p's value in 2nd function we will get,
[tex]c[p(g)]=1.12*0.8g[/tex]
[tex]c[p(g)]=0.896g[/tex]
Therefore, the composite function [tex]c[p(g)]=0.896g[/tex] represents the final price of a gaming system with the discount and taxes applied and option B is the correct choice.
