To find the volume of the composite figure made of cubes and a rectangular prism, we'll need to calculate the volume of each individual component:
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Volume of the left cube:
- If we denote the side length of the left cube as \( s_1 \), then the volume \( V_1 \) is calculated using: \[ V_1 = s_1^3 \]
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Volume of the middle rectangular prism:
- If the dimensions of the rectangular prism are length \( l \), width \( w \), and height \( h \), then the volume \( V_2 \) is calculated using: \[ V_2 = l \times w \times h \]
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Volume of the right cube:
- If we denote the side length of the right cube as \( s_2 \), then the volume \( V_3 \) is calculated using: \[ V_3 = s_2^3 \]
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Volume of the entire composite figure:
- The total volume \( V_{total} \) is the sum of the volumes of all parts: \[ V_{total} = V_1 + V_2 + V_3 \]
You would need to provide the specific dimensions (side lengths of the cubes and the dimensions of the rectangular prism) in order to calculate the volumes accurately and fill in the blanks for the specific volumes and the total volume of the composite figure.