Cedric and Josh both ordered the same size pizzas at Marco’s Pizzeria; however, they ordered different toppings. Marco’s charges an additional fee for toppings, but all toppings cost the same. Cedric got pepperoni, banana peppers, and black olives on his pizza for a cost of $15.74. Josh ordered mushrooms and eggplant on his pizza and paid $14.49. Using this information, write an equation for the cost of a pizza, C, as a function of the number of toppings, t ordered.

Let
C---------> the cost of a pizza
t----------> number of toppings

we know that
$15.74-3t=$14.49-2t
15.74-14.49=3t-2t-------------> t=1.25

the cost of one topping is $1.25
and the cost of one pizza without topping is
15.74-3*1.25--------> $11.99

then
an equation for the cost of a pizza, C, as a function of the number of toppings, t ordered is
C=11.99+1.25t

the answer is
C=11.99+1.25t

Answer Link

chisnau chisnau · Answer 2 · 2019-07-23T06:31:25+02:00

Answer:

[tex]f(c)=1.25x+11.99[/tex]

Step-by-step explanation:

Let x be the number of toppings

Let c be the cost of pizza

Cedric got pepperoni, banana peppers, and black olives on his pizza for a cost of $15.74.

Josh ordered mushrooms and eggplant on his pizza and paid $14.49.

As the toppings has the same cost, we can equate the equations:

[tex]15.74-3x=14.49-2x[/tex]

[tex]3x-2x=15.74-14.49[/tex]

x = $1.25

Thus each topping costs $1.25.

And cost of any pizza without topping = [tex]14.49-2(1.25)=11.99[/tex] dollars

So, the function becomes in terms of c ;

[tex]f(c)=1.25x+11.99[/tex]

The base price of pizza is $11.99 and it will increase as the toppings increase.