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Joseph owns a hot dog stand and sells specialized hot dogs. He charges $1.50 for a plain hot dog and then an additional $0.50 for each topping that you want. This can be modeled by the equation C = .5x + 1.5, where C is the total cost of the hot dog and x is the number of toppings you ordered. Hattie sells hamburgers at the stand next door and has the same basic cost except she charges $2.50 for a plain hamburger and then $0.25 for each additional topping. How should she change Joseph's cost equation to represent her hamburger cost?

Respuesta :

KitKat69
.25x+2.5=c. She would change the cost of the toppings and the total cost :)
calculista

Hot Dog Stand

Let

C--------> total cost of the hot dog

x-------> is the number of toppings

we know that

[tex]C=0.5x+1.5[/tex]

where

The slope of the linear equation is equal to [tex]0.5\frac{\$}{topping}[/tex]

The y-coordinate of the y-intercept of the linear function is equal to [tex]\$1.5[/tex]

That means -------> This is the cost of the hot dog without topping  

Hamburgers Stand

Let

C--------> total cost of the hamburger

x-------> is the number of toppings

we know that

[tex]C=0.25x+2.50[/tex]

where

The slope of the linear equation is equal to [tex]0.25\frac{\$}{topping}[/tex]

The y-coordinate of the y-intercept of the linear function is equal to [tex]\$2.5[/tex]

That means -------> This is the cost of the hamburger without topping

therefore

the answer is

The linear equation of the hamburger cost is equal to

[tex]C=0.25x+2.50[/tex]