Lesson 8
246
w w w . p e t e r s o n s . c o m / a r c o
ARCO
■
SAT II Subject Tests
47. The correct answer is (B). The plane cuts the cube in this way:
The smaller fragment has four sides: three right isosceles triangles with sides of 1
and an equilateral
triangle with sides equal to the diagonal of the face of the cube. So we need only find the areas of
those triangles and add in order to find the surface area of the smaller fragment.
The area of the three right isosceles triangles is:
(Or you might just see that their area is half
that of the face of the cube, and 1/2 of 1 = 1/2.) And since
there are three of them:
The sides of the equilateral triangle are diagonals of faces of the cube.
To find the area of the equilateral
triangle, we need an altitude:
Using the properties of the 30–60–90 triangle, we determine the length of the altitude:
Side opposite 60
° angle =
1
2
× hypotenuse ×
Alt
= ×
×
=
1
2
2
3
6
2
