The coordinates of the vertex W are (5 , -1)
Step-by-step explanation:
In the parallelogram, the diagonal bisect each other
To find a missing vertex in a parallelogram do that:
∵ WXYZ is a parallelogram
∴ Its diagonals are WY and XZ
∵ The diagonal bisect each other
- That mean they have the same mid-point
∴ They intersect each other at their mid-point
∵ x = (-2 , -3) and z = (7 , 7)
∴ [tex]x_{1}[/tex] = -2 and [tex]x_{2}[/tex] = 7
∴ [tex]y_{1}[/tex] = -3 and [tex]y_{2}[/tex] = 7
- Substitute them in the rule of the mid point to find the
mid-point of XZ
∴ [tex]M_{XZ}=(\frac{-2+7}{2},\frac{-3+7}{2})=(2.5 , 2)[/tex]
∴ The mid-point of diagonals WY and XZ is (2.5 , 2)
Let us use it to find the coordinates of vertex W
∵ W = (x , y) and Y = (0 , 5)
∴ [tex]x_{1}[/tex] = x and [tex]x_{2}[/tex] = 0
∴ [tex]y_{1}[/tex] = y and [tex]y_{2}[/tex] = 5
- Equate 2.5 by the rule of the x-coordinate of the mid-point
∵ [tex]2.5=\frac{x+0}{2}[/tex]
- Multiply both sides by 2
∴ 5 = x + 0
∴ 5 = x
∴ The x-coordinate of point W is 5
- Equate 2 by the rule of the y-coordinate of the mid-point
∵ [tex]2=\frac{y+5}{2}[/tex]
- Multiply both sides by 2
∴ 4 = y + 5
- Subtract 5 from both sides
∴ -1 = y
∴ The y-coordinate of point W is -1
The coordinates of the vertex W are (5 , -1)
Learn more:
You can learn more about the mid-point in brainly.com/question/10480770
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