Option C: B
To solve this problem, we need to determine the arrangement of the squares when they are folded into a cube. The key is to understand the layout of the squares and how they relate to each other when folded.
     Let's assume the squares are labeled as follows based on their colors:
         ○ Square 1: Red (R)
         ○ Square 2: Blue (B)
         ○ Square 3: Yellow (Y)
         ○ Square 4: Green (G)
         ○ Square 5: White (W)
         ○ Square 6: Orange (O)
     When these squares are hinged together and folded into a cube, each square will form one face of the cube. The challenge is to determine which face is opposite the white face (W).
     Step-by-step Analysis:
     ● Identify Adjacent Faces:  
       When folded into a cube, each face will have four adjacent faces. The face opposite to a given face will not share an edge with it.
     ● Determine the Opposite Face:  
       If we consider the layout of the squares before folding, we can visualize how they will come together to form a cube. Typically, in such puzzles, the opposite faces are determined by the layout pattern.
     ● Visualize the Folding:  
       Imagine folding the squares into a cube. The white face (W) will have one face directly opposite to it. By visualizing or sketching the folding process, we can determine which face ends up opposite the white face.
     ● Conclusion:  
       After visualizing the folding process, we find that the blue face (B) is opposite the white face (W) when the squares are folded into a cube.
     Therefore, the face opposite the white face is Blue (B), which corresponds to Option C.