Answer:
GB
Step-by-step explanation:
Given:
BC = BD
DE is ⊥ to AC.
GB is ⊥ CD.
we need to find the perpendicular bisector from the given figure.
Solution:
By Definition of Perpendicular bisector which states that;
" If a line which is perpendicular to the segment such that it bisects the segment in 2 equal parts then it is said to be perpendicular bisector."
From the above figure we can see that;
Line GB is is ⊥ segment CD.
Also BC = BD (given)
Hence Line GB is a Perpendicular bisector.
(8+x)/2 is the exspression and x is the variable
Hope it helps ❤️
Answer:
In naming a ray, we always begin with the letter of the endpoint (where the ray starts) followed by another point on the ray in the direction it travels. Since the vertex of the angle is the endpoint of each ray and our vertex is , each of our rays must begin with . Only fails to do so.
7y = 8x - 14
7y= 7(6) Reason : Given
7y = 42
8x -14 = 42 Reason: Because 8x - 14 equals to 7y
8x = 42 + 14 Reason : Because we flip 14 on to the other side of the equation thus it becomes opposute of what it was.
8x = 56
× = 7
Proven
Answer:
It is letter C! I just learned about this a couple of weeks ago!