The equation that best represents the remaining units when rearranging the formula V=lwh to solve for the width is:
w = V / (lh)
This equation shows that the width is equal to the volume divided by the product of the length and height.
w = V / (lh)
This equation shows that the width is equal to the volume divided by the product of the length and height.
The equation can be rearranged as follows to solve for the width (w):
V / (lh) = w
Therefore, the equation that best represents the remaining units when justifying the rearrangement to solve for the width is:
V / (lh) = w
1. Start with the original equation: V = lwh
2. To solve for the width (w), we need to isolate it on one side of the equation. To do this, we can divide both sides of the equation by both the length (l) and the height (h):
V / (lh) = (lwh) / (lh)
3. Simplifying the equation, we can cancel out the lh terms on the right-hand side, leaving:
V / (lh) = w
4. We have now isolated the width (w) on one side of the equation. So the rearranged equation that solves for the width is:
w = V / (lh)
Therefore, the correct equation that represents the remaining units when justifying the rearrangement to solve for the width is:
w = V / (lh)