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A shipping company offers various sized shipping boxes to its customers. Some of these boxes are cube-shaped, with equal height, width, and depth. As part of an upcoming sales promotion, the company will offer two cube-shaped boxes for the price of one.
a. Write an expression to represent the total volume of two different sized boxes as a sum of cubes if one of the boxes has sides with a length of 1 foot and the other has sides with a length of x feet.
b. Factor the sum of cubes.
c. Calculate the total volume of the two boxes if x = 3 feet.

Respuesta :

A cube shaped box of side length equal to m foot has volume 
[tex]m*m*m= m^{3} [/tex]  foot cubed.

a.
Let v1 be the volume of the box with side length 1 ft. 
and v2 be the volume of the box with side length x ft.

[tex]V1=1^{3}=1[/tex] (foot cubed)
[tex]V2=x^{3}[/tex] (foot cubed)

Vtotal=[tex]V1+V2=1+x^{3}[/tex] feet cubed

b. 

by the "sum of cubes" identity:

[tex]x^{3}+1=(x+1)( x^{2} -x+1) [/tex],

this identity can be derived by dividing [tex]x^{3}+1[/tex] by (x+1), by long division.

c. Vtotal when x=3 feet is:

          Vtotal=[tex]V1+V2=1+3^{3}=1+27=28[/tex]   (feet cubed)

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