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#29

ninjakill
Reply 0 123456789123345869
(02/01/2013) [] Obviously it is about the url # thing , ending in 144 or 12^2 www.funnyjunk.com/funny_pictures/4405144/Finally+found+square+root/
#46 to #17

tornwingsofangels
Reply 1 123456789123345869
(02/01/2013) [] so we're fighting over quadrilaterals now?
#102 to #71

hecticsilence
Reply 0 123456789123345869
(02/01/2013) [] I wasn't commenting on the shape of the root, I honestly couldn't care less, I was just correcting the other guy.
#107 to #105

hecticsilence
Reply 0 123456789123345869
(02/02/2013) [] Oh everyone watch out! Einstein is here to add some "mother ******* intelligence." It's funny junk, you don't need to be the smart guy.
#56 to #47

hecticsilence
Reply 0 123456789123345869
(02/01/2013) [] It's just continuing the joke, it's not a bandwagon thing.
#24 to #17

merrymarvelite If you look closely, it seems not all angles are 90 degrees.
Furthermore, while the top and bottom sides appear parallel, the right side does not appear to be parallel to the left.
Ergo, this is a trapezoid at best.
(Possibly a parallelogram if the right and left sides are indeed parallel.)
Reply +9 123456789123345869
(02/01/2013) [] Furthermore, while the top and bottom sides appear parallel, the right side does not appear to be parallel to the left.
Ergo, this is a trapezoid at best.
(Possibly a parallelogram if the right and left sides are indeed parallel.)
#20 to #17

cannabinoid
Reply 0 123456789123345869
(02/01/2013) [] not exactly, more of a rhombus root
#26 to #23

trollgiggity
Reply 1 123456789123345869
(02/01/2013) [] There is no square root of pi since it goes on to forever.
#28 to #26

themastertroller
Reply 1 123456789123345869
(02/01/2013) [] but the first group of digits do have a square root. pi is indeed a number after all.
#12

shashashanasha
Reply +45 123456789123345869
(02/01/2013) [] Why did the tree have a square root?
Because it was a Geometree
Haha get it? Geometry? Please don't kill me
Because it was a Geometree
Haha get it? Geometry? Please don't kill me
#57 to #53

secondlawprevails Listening to metal while watching this. Oh lawd......
Reply +4 123456789123345869
(02/01/2013) [] #25 to #10

anon
Reply 0 123456789123345869
(02/01/2013) [] Geometry lesson for today.
Squares = quadrilateral (4 sided figure) with equal sides and angles (90° angles)
Rectangles = quadrilateral with equal angles (has to be 90°, again)
Rhombus = quadrilateral with equal sides.
A square is a rectangle and a rhombus put together, and not vise versa.
tl;dr you're wrong
Squares = quadrilateral (4 sided figure) with equal sides and angles (90° angles)
Rectangles = quadrilateral with equal angles (has to be 90°, again)
Rhombus = quadrilateral with equal sides.
A square is a rectangle and a rhombus put together, and not vise versa.
tl;dr you're wrong
#33 to #11

danniegurl
Reply 2 123456789123345869
(02/01/2013) [] squares are rectangles, but rectangles are not necessarily squares.
rectangle is any quadrilateral with parallel sides with 90 degree angles.
a square must also have these qualities, while also having sides of equal length.
rectangle is any quadrilateral with parallel sides with 90 degree angles.
a square must also have these qualities, while also having sides of equal length.
#99 to #33

JMF
Reply 0 123456789123345869
(02/01/2013) [] Rectangles are never squares, because being defined as a rectangle means that it can not meet the requirements needed to be defined as a square, where as a square can be defined as itself and meet the requirements needed to be defined as a rectangle.
#101 to #99

danniegurl
Reply 2 123456789123345869
(02/01/2013) [] exactly what i said. it's kind of like saying all anglosaxons are white people, but not all white people are anglosaxons.
squares are a type of rectangle, so they can be defined as both a rectangle and square. in this case, and this case alone, a rectangle is a square.
otherwise, they are just rectangles.
rectangles can be squares, but only when the sides are equal.
squares are a type of rectangle, so they can be defined as both a rectangle and square. in this case, and this case alone, a rectangle is a square.
otherwise, they are just rectangles.
rectangles can be squares, but only when the sides are equal.
#103 to #101

JMF
Reply +1 123456789123345869
(02/02/2013) [] A rectangle can never be a square. What you are saying is that rectangles can be squares if their sides are equal, but if their sides are equal, then it is defined as a square, not a rectangle. Are you saying that since squares are rectangles, a rectangle can be a square? I'm a bit confused.
#106 to #103

danniegurl
Reply 2 123456789123345869
(02/02/2013) [] no! did you read nothing i wrote? i said a rectangle can be defined as a square only when it qualifies as a square. a square is a type of rectangle. as i said, all other rectangles are just rectangles alone.
a rectangle definitely can be a square. as long as its angles are 90 degrees and the sides are parallel, it is a rectangle. but it is a square and a rectangle if the sides are also equal.
did you not read my comparison at all?
here, i'll make another one.
all oranges are fruits, but not all fruits are oranges.
all squares are rectangles, but not all rectangles are squares.
a rectangle definitely can be a square. as long as its angles are 90 degrees and the sides are parallel, it is a rectangle. but it is a square and a rectangle if the sides are also equal.
did you not read my comparison at all?
here, i'll make another one.
all oranges are fruits, but not all fruits are oranges.
all squares are rectangles, but not all rectangles are squares.
#4

cryingchicken
Reply +1 123456789123345869
(01/31/2013) [] The square root of tree... get it? tree...
no?
oh... try saying it while impersonating mike tyson...
get it now?
no?
oh... try saying it while impersonating mike tyson...
get it now?
#43 to #3

youngduece
Reply +2 123456789123345869
(02/01/2013) [] i is the answer to all of your problems
i= √ 1
i= √ 1
#41 to #3

theblowtorch
Reply +1 123456789123345869
(02/01/2013) [] I don't think anybody can see them together....But lets just use our imaginations