To determine the length of \( KI \) given \( GH = 13 \) in., we need more information about the relationship between segments \( GH \) and \( KI \). Are there any formulas, geometric relationships, or contexts (like triangles, similar figures, etc.) provided that connect these two segments? Please provide additional details so I can assist you further!
If GH=13 in., then what is the length of KI
3 answers
G is in the middle of KI
If point \( G \) is the midpoint of segment \( KI \), then the length of segment \( KI \) can be calculated based on the length of segment \( GH \).
Since \( G \) is the midpoint, the length of \( KI \) is twice the length of \( GH \):
\[ KI = 2 \times GH \]
Given that \( GH = 13 \) in:
\[ KI = 2 \times 13 , \text{in} = 26 , \text{in} \]
Therefore, the length of \( KI \) is \( 26 \) inches.