GEOMETRY Express the volume of each solid as a monomial. a. m3n3b. m3n4c. m4n4d. m4n5

Question

asked Mar 9, 2023 200k views

1 Answer

Piotrp · Answer 1 · 2023-03-13T04:14:21+0000

SOLUTION

Consider the image given below

The image above is a cuboid and the volume of a cuboid is given by the formula

$\text{Volume of cuboid= L x W x H}$

Where

$\begin{gathered} L=length=m^3n \\ W=\text{width}=mn^3 \\ H=\text{height}=n \end{gathered}$

Substituting into the formula, we have

$\text{Volume of cuboid=m}^3n* mn^3* n$

Simplifying the expression we have

Applying the rule of indices i.e when the base are the same, we add their powers

Hence.

$\begin{gathered} m^(3+1)* n^(1+3+1) \\ m^4* n^5 \end{gathered}$

Therefore, the monomial becomes

Answer ; Option D