The base of a triangular pyramid is a triangle with corners at #(2 ,5 )#, #(1 ,6 )#, and #(2 ,8 )#. If the pyramid has a height of #4 #, what is the pyramid's volume?

1 Answer
Binayaka C.
Jul 12, 2017

Volume of a pyramid is # 2 # cubic unit.

Explanation:

Volume of a pyramid is #1/3*#base area #*#hight.

#(x_1,y_1)=(2,5) ,(x_2,y_2)=(1,6),(x_3,y_3)=(2,8) , h=4#

Area of Triangle is #A_b = |1/2(x1(y2−y3)+x2(y3−y1)+x3(y1−y2))|#

#A_b = |1/2(2(6−8)+1(8−5)+2(5−6))|# or

#A_b = |1/2(-4+3-2)| = | -3/2| =3/2#sq.unit

Volume of a pyramid is #1/3*A_b*h = 1/cancel3 *cancel3/2*4 = 2 # cubic.unit [Ans]

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