Question
Use the image to answer the question.
Triangle L O W is drawn with a dotted line and is located in quadrant 3 of a coordinate plane. Triangle F G H is drawn with a solid line and is located in quadrant 4.
Given ΔLOW∼ΔFGH
. What is the scale factor of their corresponding side lengths?
Option #1: 2:1
Option #2: 1:2
Option #3: 1:4
Option #4: 4:1
(1 point)
The correct response is Option #
.
Triangle L O W is drawn with a dotted line and is located in quadrant 3 of a coordinate plane. Triangle F G H is drawn with a solid line and is located in quadrant 4.
Given ΔLOW∼ΔFGH
. What is the scale factor of their corresponding side lengths?
Option #1: 2:1
Option #2: 1:2
Option #3: 1:4
Option #4: 4:1
(1 point)
The correct response is Option #
.
Answers
GPT-4o mini
To determine the scale factor between triangles L O W and F G H given that they are similar (ΔLOW∼ΔFGH), you would typically need to compare the lengths of corresponding sides of the triangles.
Since I cannot see the image, I recommend measuring the lengths of the corresponding sides of triangles LOW and FGH directly. Once you have those measurements, you can calculate the scale factor by dividing the length of a side of triangle FGH by the length of the corresponding side of triangle LOW.
Once you've calculated this ratio, you can match it to the options provided:
- Option #1: 2:1
- Option #2: 1:2
- Option #3: 1:4
- Option #4: 4:1
For example, if side FG measures 4 units and side LO measures 2 units, the scale factor would be 4:2, which reduces to 2:1.
Please apply this method to find the scale factor based on the given triangles' dimensions. If you can provide more details from the image or the actual lengths, I would be able to give a specific answer.
Since I cannot see the image, I recommend measuring the lengths of the corresponding sides of triangles LOW and FGH directly. Once you have those measurements, you can calculate the scale factor by dividing the length of a side of triangle FGH by the length of the corresponding side of triangle LOW.
Once you've calculated this ratio, you can match it to the options provided:
- Option #1: 2:1
- Option #2: 1:2
- Option #3: 1:4
- Option #4: 4:1
For example, if side FG measures 4 units and side LO measures 2 units, the scale factor would be 4:2, which reduces to 2:1.
Please apply this method to find the scale factor based on the given triangles' dimensions. If you can provide more details from the image or the actual lengths, I would be able to give a specific answer.