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The volume of a rectangular prism is given by the formula V = lwh, where l is the length of the prism, w is the width, and h is the height. Suppose a box in the shape of a rectangular prism has length (2a + 11), width (5a – 12), and height (a + 6). Which expression represents the volume of the box?

Respuesta :

iGreen
Just plug the measurements into the formula.

[tex]\sf V=lwh[/tex]

[tex]\sf V=(2a+11)(5a-12)(a+6)[/tex]

Distribute the first two parentheses. Multiply every term in the first parenthesis to every term in the second parenthesis.

[tex]\sf V=(10a^2-24a+55a-132)(a+6)[/tex]

Simplify, combine like terms:

[tex]\sf V=(10a^2+31a-132)(a+6)[/tex]

Distribute again. Multiply ever term in the first parenthesis to every term in the second:

[tex]\sf V=10a^3+60a^2+31a^2+186a-132a-792[/tex]

Combine like terms:

[tex]\boxed{\sf V=10a^3+91a^2+54a-792}[/tex]
vgalesi3314

Answer:

10a^3+91a^2+54a-792

Step-by-step explanation:

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