A pyramid has a base in the shape of a rhombus and a peak directly above the base's center. The pyramid's height is #5 #, its base's sides have lengths of #1 #, and its base has a corner with an angle of #( pi)/6 #. What is the pyramid's surface area?

1 Answer
Dec 2, 2017

T S A #= color(purple)(10.5499)#

Explanation:

AB = BC = CD = DA = a = 1
Height OE = h = 5
OF = a/2 = 1/2 = 0.5
# EF = sqrt(EO^2+ OF^2) = sqrt (h^2 + (a/2)^2) = sqrt(5^2+0.5^2) = color(red)(5.0249)#

Area of #DCE = (1/2)*a*EF = (1/2)*1*5.0249 = color(red)(2.5125)#
Lateral surface area #= 4*Delta DCE = 4*2.5125 = color(blue)(10.05#)#

#/_C = pi/6, /_C/2 = pi/12#
diagonal #AC = d_1# & diagonal #BD = d_2#
#OB = d_2/2 = BCsin (C/2)=1sin(pi/12)= 0.2588

#OC = d_1/2 = BC cos (C/2) = 8* cos (pi/12) = 0.9659

Area of base ABCD #= (1/2)*d_1*d_2 = (1/2)(2*0.2588) (2*0.9659) = color (blue)(0.4999)#

T S A #= Lateral surface area + Base area#
T S A # =10.05 + 0.4999 = color(purple)(10.5499)#

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