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Certain superstores will often prove match or even beat a competitors price by 10%. The function g(x)= 0.90x represents the sale price of a prince of merchandise at such a superstore . The function f(x)= 0.13x represents the HST owed on a purchase with a selling price of x dollars a.) write a function that represents the HST owed on an item with a price tag of x dollars after it has been beaten by 10%b.) How much HST would be charged on a $39.99 purchase if this price is also lowered by 10% first?

User Joubarc
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1 Answer

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The given information is:

- The function that represents the sales price at the superstore is:


g(x)=0.90x

- The function that represents the HST owed on a purchase with a selling price of x dollars is:


f(x)=0.13x

a. The function that represents the HST owed on an item with a price tag of x dollars after it has been beaten by 10% is given by the composite function:


h(x)=f(g(x))

So, we replace the x in the f(x) function with the g(x) value, as follows:


\begin{gathered} f(g(x))=0.13(0.90x) \\ h(x)=0.117x \end{gathered}

The equation is above.

b. How much HST would be charged on a $39.99 purchase if this price is also lowered by 10% first?

Then, by using the equation we found in part a, we replace x by 39.99 and solve:


\begin{gathered} h(x)=0.117*39.99 \\ h(x)=4.68 \end{gathered}

$4.68 would be charged