Y =14 in the first equation , and in the second equation its y=8
Using the given information, the length of WZ is 8
<h3>Length of a line </h3>
From the question, we are to find the length of WZ
From the given information,
Y is the midpoint of WZ
and
X is the midpoint of WY
First,
We will create a line that models the given description
<u>W X Y Z</u>
2
From the given information,
XY = 2
Since X is the midpoint of WY
Then,
WX = XY
∴ WX = 2
Thus
WY = WX + XY
WY = 2 + 2
WY = 4
Also,
Y is the midpoint of WZ
Then,
WY = YZ
∴ YZ = 4
Thus,
WZ = WY + YZ
WZ = 4 + 4
WZ = 8
Hence, the length of WZ is 8
Learn more on Calculating length of a line here: brainly.com/question/13191885
#SPJ1
Answer:
15 in.
Use this website : http://graysonmath.com/wp-content/uploads/2018/10/HM2_6.4-Practice-Key.pdf
Step-by-step explanation:
Y=3/5x+5
hope this helps!!
Based on the property of the consecutive angles of a parallelogram, the value of x is calculated as: E. 37.
<h3>What are the Properties of the Angles of a Parallelogram?</h3>
In a parallelogram, the angles that are opposite to each other are congruent while consecutive angles are supplementary.
Angles F and G are consecutive angles and are therefore supplementary (have a sum of 180 degrees.)
Angle F + angle G = 180
4x - 2 + 34 = 180
4x + 32 = 180
4x = 180 - 32
4x = 148
x = 148/4
x = 37
Value of x is: E. 37.
Learn more about parallelogram on:
brainly.com/question/3050890
#SPJ1
