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Container A was filled with water to the brim. Then, some of the water was poured into an empty Container B until the height of the water in both containers was the same. Find the new height in both water containers

Container A was filled with water to the brim Then some of the water was poured into an empty Container B until the height of the water in both containers was t class=

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28cm is the answer for your question!
Lanuel

The new height of the water container is equal to 66.7 centimeters.

For Container A:

  • Height = 40 cm.
  • Length = 25 cm.
  • Width = 30 cm.

For Container B:

  • Length = 18 cm.
  • Width = 25 cm.

First of all, we would determine the volume of the water in Container A:

The volume of a rectangular prism.

Mathematically, the volume of a rectangular prism is given by this formula:

[tex]V = L \times W \times H[/tex]

Where:

  • V is the volume.
  • L is the length.
  • W is the width.
  • H is the height.

Substituting the given parameters into the formula, we have;

[tex]V = 25 \times 30 \times 40[/tex]

V = 30,000 cubic centimeters.

Note: The volume of the two containers must be the same.

The new height:

[tex]30000=18\times 25 \times h\\\\30000=450h\\\\h=\frac{30000}{450}[/tex]

h = 66.7 centimeters.

Read more on volume of a rectangular prism here: brainly.com/question/3867601

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