70,170 views
43 votes
43 votes
Consider quadrilateral EFGH.

Quadrilateral E F G H is shown. Sides F G and E H are parallel. Angles E and H are congruent. The length of E F is 4 n minus 4, the length of F G is 3 n + 3, and the length of G H is 2 n + 6.

What is the length of line segment GH?

5 units
7 units
16 units
24 units

User Turtleboy
by
2.7k points

2 Answers

10 votes
10 votes

Answer:

the answer is C

Explanation:

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Consider quadrilateral EFGH. Quadrilateral E F G H is shown. Sides F G and E H are-example-1
User Sandrea
by
2.8k points
14 votes
14 votes

Given:

In quadrilateral EFGH,
FG\parallel EH,\angleE\cong \angle H,EF=4n-4,FG=3n+3, GH=2n+6

To find:

The length of segment GH.

Solution:

Draw a figure according to the given information as shown below.

In quadrilateral EFGH,
FG\parallel EH,\angleE\cong \angle H, it means the quadrilateral EFGH is an isosceles quadrilateral because base angles are equal.

Now, quadrilateral EFGH is an isosceles quadrilateral, so the sides EF and GH are equal.


EF=GH


4n-4=2n+6


4n-2n=4+6


2n=10

Divide both sides by 2.


n=(10)/(2)


n=5

Now,


GH=2n+6


GH=2(5)+6


GH=10+6


GH=16

Therefore, the correct option is C.

Consider quadrilateral EFGH. Quadrilateral E F G H is shown. Sides F G and E H are-example-1
User Ahmed Abbas
by
3.1k points
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