To solve this problem, let us recall that the formula for
the volume of a cone is:
V = (1 / 3) π r^2 h
where,
r = is the radius of the cone
h = is the height of the cone
Now since the equilateral triangle is rotated about the
altitude (center of the triangle figure), therefore we can say that the radius
and height is:
r = 7 cm
h = 14 cm
Hence, the volume of the cone is:
V = (1 / 3) π (7 cm)^2 (14 cm)
V = 228.67 π cm^3
or
V = 718.38 cm^3
