Question 1072215: what shape is: (3,0)(6,3)(3,5)(0,3) Found 3 solutions by KMST, white_chocolate, ikleyn:Answer by KMST(5347) (Show Source): You can put this solution on YOUR website! The line segment connecting points (3,0) and (3,5)
is a vertical segment of length {5-0=5}}} .
Its midpoint is (3,2.5).
The line segment connecting points (6,3) and (0,3)
is a horizontal segment of length ,
with point (3,3) as its midpoint.
If those segments are diagonal of a quadrilateral,
the quadrilateral is a kite.
The horizontal diagonal (with throughout)
and the vertical diagonal (with throughout)
intersect at point (3,3).
That point is the midpoint odd the horizontal diagonal,
but not the midpoint of the vertical one,
so it is not a rhombus, or a parallelogram,
but it is a kite. Answer by white_chocolate(3) (Show Source): You can put this solution on YOUR website! This would be a kite. None of it's lines are equal, and therefore it has no lines of symmetry. Do you need me to complete the distance formula to prove? Answer by ikleyn(53763) (Show Source): You can put this solution on YOUR website! .
white_chocolate !
For your information:
1. a kite HAS two pairs of congruent sides, and
2. a kite HAS a symmetry line.