Answer:
0.0707 radians
Step-by-step explanation:
Given that:
The dimension of the rectangular box is:
length (l) = 20 inches
width (w) = 20 inches
height (h) = 2 inches
The length of the diagonal of the rectangular box is :
[tex]D_1 = \sqrt{ l^2+w^2+h^2}[/tex]
[tex]D_1 = \sqrt {(20)^2+(20)^2+(2)^2}[/tex]
[tex]D_1 = \sqrt {400+400+4}[/tex]
[tex]D_1 = \sqrt {804}[/tex]
[tex]D_1 = 28.35[/tex]
The length of the diagonal of the base of the rectangular box is:
[tex]D_2 = \sqrt{l^2+w^2}[/tex]
[tex]D_2 = \sqrt{(20)^2+(20)^2}[/tex]
[tex]D_2 = \sqrt{400+400}[/tex]
[tex]D_2 = \sqrt{800}[/tex]
[tex]D_2 = 28.28[/tex]
If we take a critical look at a rectangular box; we will realize that the diagonal of the base is the adjacent side & diagonal of the box is the hypotenuse of a triangle formed by the rectangular box.
Therefore, the angle between them is :
[tex]Cos \theta = \frac{Diagonal \ of \ the \ base \ }{Diagonal \ of \ the \ box }[/tex]
[tex]Cos\ \theta = \frac{D_2}{D_1 }[/tex]
[tex]Cos\ \theta = \frac{28.28}{28.35 }[/tex]
[tex]Cos\ \theta = 0.9975[/tex]
[tex]\theta = Cos^{-1} \ 0.9975[/tex]
[tex]\theta = 4.052^0[/tex] to radians
[tex]\theta = 0.0707 \ radians[/tex]
