Since point \[\purple{M}\] is the midpoint of point \[\blue{A}\] and point \[\green{B}\], the coordinates of point \[\green{B}\] can be found by subtracting the difference between the x-coordinates of point \[\purple{M}\] and point \[\blue{A}\] from the x-coordinate of point \[\purple{M}\], and by subtracting the difference between the y-coordinates of point \[\purple{M}\] and point \[\blue{A}\] from the y-coordinate of point \[\purple{M}\].
The x-coordinate of point \[\purple{M}\] is \[0\], and the x-coordinate of point \[\blue{A}\] is \[-6\]. So, the difference between the x-coordinates is \[0 - (-6) = 6\].
The y-coordinate of point \[\purple{M}\] is \[0.5\], and the y-coordinate of point \[\blue{A}\] is \[8\]. So, the difference between the y-coordinates is \[0.5 - 8 = -7.5\].
Applying these differences to the x and y coordinates of \[\purple{M}\], we get
\[\green{B} = (0 - 6, 0.5 - 7.5) = \boxed{(-6, -7)}. \]
Point
\[\blue{A}\] is at
\[\blue{(-6, 8)}\] and point
\[\purple{M}\] is at
\[\purple{(0, 0.5)}\].
Point
\[\purple{M}\] is the midpoint of point
\[\blue{A}\] and point
\[\green{B}\].
What are the coordinates of point
\[\green{B}\]?
3 answers
Point
\[\blue{A}\] is at
\[\blue{(-6, 8)}\] and point
\[\purple{M}\] is at
\[\purple{(0, 0.5)}\].
Point
\[\purple{M}\] is the midpoint of point
\[\blue{A}\] and point
\[\green{B}\].
What are the coordinates of point
\[\green{B}\]?
\[\blue{A}\] is at
\[\blue{(-6, 8)}\] and point
\[\purple{M}\] is at
\[\purple{(0, 0.5)}\].
Point
\[\purple{M}\] is the midpoint of point
\[\blue{A}\] and point
\[\green{B}\].
What are the coordinates of point
\[\green{B}\]?
Since point \[\purple{M}\] is the midpoint of point \[\blue{A}\] and point \[\green{B}\], the coordinates of point \[\green{B}\] can be found by adding the difference between the x-coordinates of point \[\purple{M}\] and point \[\blue{A}\] to the x-coordinate of point \[\purple{M}\], and by adding the difference between the y-coordinates of point \[\purple{M}\] and point \[\blue{A}\] to the y-coordinate of point \[\purple{M}\].
The x-coordinate of point \[\purple{M}\] is \[0\], and the x-coordinate of point \[\blue{A}\] is \[-6\]. So, the difference between the x-coordinates is \[0 - (-6) = 6\].
The y-coordinate of point \[\purple{M}\] is \[0.5\], and the y-coordinate of point \[\blue{A}\] is \[8\]. So, the difference between the y-coordinates is \[0.5 - 8 = -7.5\].
Applying these differences to the x and y coordinates of \[\purple{M}\], we get
\[\green{B} = (0 + 6, 0.5 + (-7.5)) = \boxed{(6, -7)}.\]
The x-coordinate of point \[\purple{M}\] is \[0\], and the x-coordinate of point \[\blue{A}\] is \[-6\]. So, the difference between the x-coordinates is \[0 - (-6) = 6\].
The y-coordinate of point \[\purple{M}\] is \[0.5\], and the y-coordinate of point \[\blue{A}\] is \[8\]. So, the difference between the y-coordinates is \[0.5 - 8 = -7.5\].
Applying these differences to the x and y coordinates of \[\purple{M}\], we get
\[\green{B} = (0 + 6, 0.5 + (-7.5)) = \boxed{(6, -7)}.\]