A parallelogram has sides with lengths of #16 # and #8 #. If the parallelogram's area is #32 #, what is the length of its longest diagonal?

1 Answer
CW
Feb 18, 2017

#23.830#

Explanation:

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As shown in the diagram, #ABCD# is the parallelogram.
Area of a parallelogram #A= bxxH#, where #b# is the base and #H# is the height.
Given that #AB=CD=8, AD=BC=16#, and area #A=32#,
#=> 32=8xxH, => H=4#

#DeltaBCE# is a right triangle.
Using Pythagorean theorem, we know that
#BC^2=CE^2+H^2#
#=> CE=sqrt(16^2-4^2)=sqrt240=4sqrt15#

#DeltaBDE# is also a right triangle.
#DB^2=DE^2+H^2#
#DE=DC+CE=8+4sqrt15=23.492#
#DB=sqrt(23.492^2+4^2)=23.830#

Hence, longest diagonal = #DB=23.830#

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