A parallelogram has sides with lengths of #14 # and #6 #. If the parallelogram's area is #28 #, what is the length of its longest diagonal?

1 Answer
Alan P.
Apr 6, 2016

Longest diagonal: #2sqrt(58+2sqrt(2))#

Explanation:

enter image source here
In the above diagram:
#triangle PSX=triangle QRZ#
#color(white)("XXX")rarr "Area"(square PQZX)="Area"(square PQRS)#

Given
#color(white)("XXX")"Area"(square PQRS)= 28#

Let #abs(RY)=w#
then
#color(white)("XXX")wxx14=28 rarr w=2#

and by the Pythagorean Theorem
#color(white)("XXX")abs(QY)=sqrt(6^2-2^2)=sqrt(32)=4sqrt(2)#

Therefore
#color(white)("XXX")abs(PY)=14+4sqrt(2)#
and
#color(white)("XXX")abs(PY)=14+4sqrt(2)#

Applying the Pythagorean Theorem again
#color(white)("XXX")abs(PR)=sqrt((14+4sqrt(2))^2+2^2)#

#color(white)("XXXXX")=2sqrt(58+2sqrt(2))#

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