Question
Quadrilateral EFGH is a rectangle, GI=b+54, and HI=19b. What is the value of b?
G
H
E
F
I
b=
G
H
E
F
I
b=
Answers
GPT-4o mini
To find the value of \( b \) in the rectangle \( EFGH \), we need to establish the relationships from the geometry of the rectangle.
Given that:
- \( GI = b + 54 \)
- \( HI = 19b \)
In a rectangle, the opposite sides are equal. Thus:
1. \( GI \) is a side of the rectangle.
2. \( HI \) is the adjacent side of the rectangle.
In the context of a rectangle, since both are lengths, we can equate the values of \( GI \) and \( HI \) under the conditions that they are the sides of the rectangle:
\[
b + 54 = 19b
\]
Now, solve this equation for \( b \):
1. Subtract \( b \) from both sides:
\[
54 = 19b - b
\]
\[
54 = 18b
\]
2. Now divide both sides by 18:
\[
b = \frac{54}{18}
\]
\[
b = 3
\]
Thus, the value of \( b \) is:
\[
\boxed{3}
\]
Given that:
- \( GI = b + 54 \)
- \( HI = 19b \)
In a rectangle, the opposite sides are equal. Thus:
1. \( GI \) is a side of the rectangle.
2. \( HI \) is the adjacent side of the rectangle.
In the context of a rectangle, since both are lengths, we can equate the values of \( GI \) and \( HI \) under the conditions that they are the sides of the rectangle:
\[
b + 54 = 19b
\]
Now, solve this equation for \( b \):
1. Subtract \( b \) from both sides:
\[
54 = 19b - b
\]
\[
54 = 18b
\]
2. Now divide both sides by 18:
\[
b = \frac{54}{18}
\]
\[
b = 3
\]
Thus, the value of \( b \) is:
\[
\boxed{3}
\]