The segment bisector is either a point, a line segment, a ray or a line that bisects another line
The solution to the questions are;
7. Part A; The midpoint is the point M
Part B; JM = 40
8. Part A; The midpoint is the line l
Part B; JM = 9
The basis for the above values is presented here as follows:
7. Part A
From the given diagram of the line with point M, we have;
JM = 7·x + 5
KM = 8·x
From the same length symbol, we have;
Segment JM = Segment KM
Therefore, the segment bisector is the point marked M
Given that JM = KM, by substitution property, we have;
7·x + 5 = 8·x
Therefore;
5 = 8·x - 7·x = x
5 = x
∴ x = 5
The length of JM = 7·x + 5
∴ JM = 7 × 5 + 5 = 40
JM = 40
8. Part A
The given diagram is a line JK being bisected by the line l
JM = 3·x + 15
KM = 8·x + 25
From the same length symbol, we have;
Segment JM = Segment KM
Therefore, the midpoint = The point M
The line l that marks the midpoint M on the line segment JK is the segment bisector, and we have;
The segment bisector = The line l
Part B
Given that JM = KM, by substitution property, we get;
3·x + 15 = 8·x + 25
Therefore;
3·x - 8·x = 25 - 15
-5·x = 10
x = 10/(-5) = -2
x = -2
JM = 3·x + 15
Therefore;
JM = 3 × (-2) + 15 = 9
The length of segment JM = 9
In conclusion, a segment bisector is the point or line that bisects another line
Learn more about segment bisectors here;
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