Answer :
Coordinates of point B are (19,20)
Step-by-step explanation:
The midpoint of a segment is located exactly halfway between the two ends of the segment.
Given a segment AB with endpoints with coordinates:
[tex]A(x_A,y_A)\\B(x_B,y_B)[/tex]
Then the coordinates of the midpoint C are given by
[tex]C(x_C,y_C)=(\frac{x_A+x_B}{2},\frac{y_A+y_B}{2})[/tex] (1)
In this problem, we know:
A (3,6)
C (11,13)
Therefore we need to find the coordinates of B. We can do it by re-arranging the equations (1):
[tex]x_C=\frac{x_A+x_B}{2}\rightarrow x_B=2x_C-xA[/tex]
And substituting,
[tex]x_B=2(11)-3=19[/tex]
Similarly, for the y-coordinate,
[tex]y_B=2y_C-y_A=2(13)-6=20[/tex]
Therefore the coordinates of point B are
B (19,20)
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