Answer:
9.66cm
Step-by-step explanation:
Given a cube, the Surface Distance between two points is defined as the length of the shortest path on the surface of the cube that joins the 2 points.
For a cube of length 4cm, we are to determine the surface distance between the lower left vertex on its front face and the upper right vertex on its back face.
In the produced diagram,
The shortest distance between A and C is the diagonal that joins point A to point C.
Using Pythagoras theorem,
[tex]|AC|=\sqrt{|AB|^2+|BC|^2} \\=\sqrt{4^2+4^2}\\=\sqrt{32} \\|AC|=4\sqrt{2} cm[/tex]
Therefore, the shortest distance between A and point X
=|AC|+|CX|
[tex]=4\sqrt{2} +4\\=9.66cm[/tex]
