Is this shape a kite, parallelogram, or a rhombus? The shape has coordinates: L(7,5) M(5,0) N(3,5) P(5,10).

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Is this shape a kite, parallelogram, or a rhombus? The shape has coordinates: L(7,5) M(5,0) N(3,5) P(5,10).

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Answer 1 · 2016-04-30T07:32:22

a rhombus

Explanation:

The given coordinates:

L(7,5)
M(5,0)
N(3,5)
P(5,10).

The coordinates of the mid point of diagonal LN is
$\frac{7 + 3}{2}, \frac{5 + 5}{2} = (5, 5)$ $(7+3)/2,(5+5)/2=(5,5)$

The coordinates of the mid point of diagonal MP is
$\frac{5 + 5}{2}, \frac{0 + 10}{2} = (5, 5)$ $(5+5)/2,(0+10)/2=(5,5)$

So the coordinates of mid points of two diagonal being same they bisect each other, It is possible if the quadrilateral is a parallelogram.
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
Now Checking the length of 4 sides

Length of LM = $\sqrt{{(7 - 5)}^{2} + {(5 - 0)}^{2}} = \sqrt{29}$ $sqrt((7-5)^2+(5-0)^2)=sqrt29$

Length of MN = $\sqrt{{(5 - 3)}^{2} + {(0 - 5)}^{2}} = \sqrt{29}$ $sqrt((5-3)^2+(0-5)^2)=sqrt29$

Length of NP = $\sqrt{{(3 - 5)}^{2} + {(5 - 10)}^{2}} = \sqrt{29}$ $sqrt((3-5)^2+(5-10)^2)=sqrt29$

Length of PL= $\sqrt{{(5 - 7)}^{2} + {(10 - 5)}^{2}} = \sqrt{29}$ $sqrt((5-7)^2+(10-5)^2)=sqrt29$

So the given quadrilateral is equilateral one and it would be a
rhombus
The second part is sufficient to prove everything required here.
Because equality in length of all sides also proves it a parallelogram as well as a special kite having all sides equal.

Answer 2 · 2016-04-30T07:35:42

LMNP is a rhombus.

Explanation:

The points are $L (7, 5)$ $L(7,5)$ , $M (5, 0)$ $M(5,0)$ , $N (3, 5)$ $N(3,5)$ and $P (5, 10)$ $P(5,10)$

Distance between

LM is $\sqrt{{(5 - 7)}^{2} + {(0 - 5)}^{2}} = \sqrt{4 + 25} = \sqrt{29}$ $sqrt((5-7)^2+(0-5)^2)=sqrt(4+25)=sqrt29$

MN is $\sqrt{{(3 - 5)}^{2} + {(5 - 0)}^{2}} = \sqrt{4 + 25} = \sqrt{29}$ $sqrt((3-5)^2+(5-0)^2)=sqrt(4+25)=sqrt29$

NP is $\sqrt{{(5 - 3)}^{2} + {(10 - 5)}^{2}} = \sqrt{4 + 25} = \sqrt{29}$ $sqrt((5-3)^2+(10-5)^2)=sqrt(4+25)=sqrt29$

LP is $\sqrt{{(5 - 7)}^{2} + {(10 - 5)}^{2}} = \sqrt{4 + 25} = \sqrt{29}$ $sqrt((5-7)^2+(10-5)^2)=sqrt(4+25)=sqrt29$

As all the sides are equal, it is a rhombus.

Note If opposite (or alternate) sides are equal it is a parallelogram and if adjacent sides are equal, it is a kite.

Answer 3 · 2016-05-02T17:48:35

The diagonals bisect at 90° so the shape is a rhombus.

Explanation:

As proved by the contributor, dk_ch, the shape is not a kite, but is at least a parallelogram, because the diagonals have the same midpoint and therefore bisect each other.

Finding the lengths of all the sides is a rather tedious process.

Another property of a rhombus is that the diagonals bisect at 90°.

Finding the gradient of each diagonal is a quick method of proving whether or not they are perpendicular to each other.

From the coordinates of the four vertices, it can be seen that
PM is a vertical line $(x = 5)$ $( x = 5)$ (same $x$ $x$ coordinates)
NL is a horizontal line $(y = 5)$ $(y = 5)$ (same $y$ $y$ coordinates)

The diagonals are therefore perpendicular and bisect each other.

Answer 4 · 2018-07-04T08:33:02

It's not a kite or a square or a parallelogram. It's a rhombus .

Explanation:

$L (7, 5), M (5, 0), N (3, 5), P (5, 10)$ $L (7,5), M (5,0), N (3,5), P (5,10)$

To verify whether it's a kite.

For a kite, diagonals intersect each other at right angles but only one diagonal is bisected as against both in the case of rhombus and square.

$Slope = m_{ln} = \frac{5 - 5}{3 - 7} = - 0 or θ = 180^{0}$ $"Slope " = m_(ln) = (5-5) / (3 -7) = -0 "or" theta = 180^0$

$"Slope " = m_(mp) = (10-0) / (5-5) = oo " or ' theta_1 = 90^@$

$m_(ln) * m_(mp) = 0 * oo = -1$

Hence both diagonals are intersecting at right angles.

$"Mid point of " bar(LN) = (7+3)/2, (5 + 5)/2 = (5,5)$

$"Mid point of " bar(MP) = (5+5)/2, (0+10)/2 = (5,5)$

Since mid points of both the diagonals are the same, diagonals bisect each other at right angles and hence it's a rhombus or a square and not a kite.

$bar (LM) = sqrt((5-7)^2 + (0-5)^2) = sqrt29$

$bar (MN) = sqrt((3-5)^2 + (0-5)^2) = sqrt29$

$bar (LN) = sqrt((3-7)^2 + (5-5)^2) = sqrt16$

Since $(LM)^2 + (MN)^2 != (LN)^2$ , it's not a right triangle and the given measurement does not form a square.

hence it's only a Rhombus.

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Is this shape a kite, parallelogram, or a rhombus? The shape has coordinates: L(7,5) M(5,0) N(3,5) P(5,10).

4 Answers

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