1 Answer

Flopic · Answer 1 · 2023-12-27T23:52:51+0000

Step 1: Write out the formula for finding the distance d between two points (x1,y1) and (x2,y2)

$\begin{gathered} d=\sqrt[]{(x_2-x_1)^2+(y_2-y_1)^2} \\ \end{gathered}$

Step 2: Find the distance between the vertices of the figure

The distance d1 between vertices X(6,-5) and Y(11,-5) is 11-6 = 5 units.

The distance d2 between vertices Y(11,-5) and Z(11,-10) is -5 -- 10 = 5 units.

The distance d3 between vertices Z(11,-10) and W(6,-10) is 11 - 6 = 5 units.

The distance d4 between vertices W(6,-10) and X(6,-5) is -5 -- 10 = 5 units.

Hence all the sides of the figure are congruent

Step 3: Write out the formula for finding the gradient m of the line joining two points (x1,y1) and (x2,y2).

Step 4: Check if side XY is Parallel to side WZ

Let m1 be the gradient of XY. Then

$m1=(-5--5)/(11-6)=(0)/(5)=0_{}$

Let m2 be the gradient of WZ. Then

$m2=(-10--10)/(11-6)=(0)/(5)=0_{}$

Hence XY is parallel to WZ ( and they are parallel to the x-axis)

Step 5: Check if side XW is Parallel to side YZ

Let m1 be the gradient of XW. Then

$m1=(-10--5)/(6-6)=(-5)/(0)=\text{undefined}$

Let m2 be the gradient of YZ. Then

$m2=(-10--5)/(11-11)=(-5)/(0)=\text{ undefined}$

Hence XY is parallel to YZ ( and they are parallel to the y-axis)

Therefore,

WXYZ is a rhombus. Based on the coordinates opposite sides are parallel and all the sides are congruent

The second option

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