Question
Jl is a perpendicular bisector of KM. Hallie locates point H along line segment JL. if the length of KH is given by 6y + 3 and the length of Hm is given by 27 + 7 what is the length in units of segment HM
Answers
GPT-4o mini
Since \( JL \) is the perpendicular bisector of \( KM \), it means that:
1. Point \( J \) is the midpoint of \( KM \).
2. The lengths from \( K \) to the midpoint \( J \) and from \( J \) to \( M \) are equal.
Therefore, we have:
\[
KH = HM
\]
Given that \( KH = 6y + 3 \) and \( HM = 27 + 7 = 34 \), we set these equal to each other:
\[
6y + 3 = 34
\]
Now, we will solve for \( y \):
1. Subtract 3 from both sides:
\[
6y = 34 - 3
\]
\[
6y = 31
\]
2. Now, divide by 6:
\[
y = \frac{31}{6}
\]
Even though we have found \( y \), we also need to find HM:
From the earlier equation for \( HM \):
\[
HM = 34 \text{ units}
\]
Thus, the length of segment \( HM \) is:
\[
\boxed{34} \text{ units}
\]
1. Point \( J \) is the midpoint of \( KM \).
2. The lengths from \( K \) to the midpoint \( J \) and from \( J \) to \( M \) are equal.
Therefore, we have:
\[
KH = HM
\]
Given that \( KH = 6y + 3 \) and \( HM = 27 + 7 = 34 \), we set these equal to each other:
\[
6y + 3 = 34
\]
Now, we will solve for \( y \):
1. Subtract 3 from both sides:
\[
6y = 34 - 3
\]
\[
6y = 31
\]
2. Now, divide by 6:
\[
y = \frac{31}{6}
\]
Even though we have found \( y \), we also need to find HM:
From the earlier equation for \( HM \):
\[
HM = 34 \text{ units}
\]
Thus, the length of segment \( HM \) is:
\[
\boxed{34} \text{ units}
\]