Level:
Project ID:
1103059506
Accepted:
1
Clonable:
0
Easy:
0
Let \( ABCDEFGH \) be a cube and let \( X \), \( Y \), and \( Z \) be the midpoints of edges \( AB \), \( AE \), and \( CG \) respectively. What is the cross-section of the cube if we slice it with a plane \( XYZ \)?
a hexagon \( XLZKMY \) with points \( L \), \( K \), and \( M \) lying on edges \( BC \), \( GH \), and \( EH \) respectively
a pentagon \( XLZKY \) with points \( L \) and \( K \) lying on edges \( BC \) and \( GH \) respectively
a triangle \( XYZ \)
a quadrilateral \( XZKY \) with \( K \) being the midpoint of the edge \( GH \)