A pyramid has a parallelogram shaped base and a peak directly above its center. Its base's sides have lengths of #1 # and #8 # and the pyramid's height is #2 #. If one of the base's corners has an angle of #(5pi)/12#, what is the pyramid's surface area?

1 Answer

#28.527\ \text{unit}^2#

Explanation:

Area of parallelogram base with sides #1# & #8# & an interior angle #{5\pi}/12#

#=1\cdot 8\sin({5\pi}/12)=7.727#

The parallelogram shaped base of pyramid has its semi-diagonals

#1/2\sqrt{1^2+8^2-2\cdot 1\cdot 8\cos({5\pi}/12)}=3.9# &

#1/2\sqrt{1^2+8^2-2\cdot 1\cdot 8\cos({7\pi}/12)}=4.157#

Now, two unequal lateral edges of each triangular lateral face of pyramid are given as

#\sqrt{2^2+(3.9)^2}=4.383# &

#\sqrt{2^2+(4.157)^2}=4.613#

There are two pairs of opposite identical triangular lateral faces of pyramid. One pair of two opposite triangular faces has the sides #1, 4.383# & #4.613# and another pair of two opposite triangular faces has the sides #8, 4.383# & #4.613#

1) Area of each of two identical triangular lateral faces with sides #1, 4.383# & #4.613#

semi-perimeter of triangle, #s={1+4.383+4.613}/2=4.998#

Now, using heron's formula the area of lateral triangular face of pyramid

#=\sqrt{4.998(4.998-1)(4.998-4.383)(4.998-4.613)}#

#=2.175#

2) Area of each of two identical triangular lateral faces with sides #8, 4.383# & #4.613#

semi-perimeter of triangle, #s={8+4.383+4.613}/2=8.498#

Now, using heron's formula the area of lateral triangular face of pyramid

#=\sqrt{8.498(8.498-8)(8.498-4.383)( 8.498 -4.613)}#

#=8.225#

Hence, the total surface area of pyramid (including area of base)

#=2(\text{area of lateral triangular face of type-1})+2(\text{area of lateral triangular face of type-2})+\text{area of parallelogram base}#

#=2(2.175)+2(8.225)+7.727#

#=28.527\ \text{unit}^2#