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The image you've uploaded appears to show a geometry problem involving cubes ("Kubu") and rectangular boxes ("Balok") along with formulas for calculating their volumes. From what I can extract:

- The diagrams seem to illustrate the shapes of cubes and rectangular boxes.
- The text appears to be about calculating the volume of these shapes, with the following formulas:
  - **Volume Kubus** (Cube) = \( s^3 \), where \( s \) is the side length of the cube.
  - **Volume Balok** (Rectangular Box) = \( l \times w \times h \), where \( l \) is the length, \( w \) is the width, and \( h \) is the height.
  
It seems there are instructions related to comparing the volumes of cubes and rectangular boxes, and possibly adding their volumes together.

Would you like me to provide a detailed solution based on this setup? Let me know if you'd like further explanation or if there's a particular part of this that you'd like clarified.

Here are five questions to expand the understanding:
1. How is the volume of a cube calculated from its side length?
2. What is the formula for the volume of a rectangular prism (balok), and what do the terms represent?
3. How can you compare the volumes of a cube and a rectangular box?
4. How would you approach calculating the total volume if you have multiple cubes and boxes?
5. What real-life objects can be modeled as cubes or rectangular boxes?

**Tip**: To distinguish between the volume of different 3D shapes, focus on identifying the length, width, and height, especially when dealing with rectangular prisms.

The image uploaded contains a problem involving cubes ("Kubu") and rectangular boxes ("Balok") and the calculations of their volumes.

Explore how to calculate the volume of cubes and rectangular prisms (Balok) with detailed formulas and explanations. Learn to apply volume formulas for 3D shapes, ideal for students in Grades 5-7.

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