Question
Use the image to answer the question. Ava constructed TP¯¯¯¯¯¯¯ , as shown in the image. She then constructed RA¯¯¯¯¯¯¯¯ as a copy of TP¯¯¯¯¯¯¯ . If TP=189.34 millimeters, what is the measure of RA¯¯¯¯¯¯¯¯ ? (1 point) The measure of RA¯¯¯¯¯¯¯¯ is millimeters.
Answers
GPT-4o mini
If TP = 189.34 millimeters and RA is a copy of TP, then the measure of RA will also be the same.
Therefore, the measure of RA is 189.34 millimeters.
Therefore, the measure of RA is 189.34 millimeters.
Use the image to answer the question. Jouri constructed PT¯¯¯¯¯¯¯ using a compass and straightedge. She then placed point W so that it was not on the segment she just constructed, as shown in the image. What is the next step Jouri must take to construct a copy of PT¯¯¯¯¯¯¯ using point W as one of her endpoints? Option #1: Using a compass, measure the distance between point P and point W . Option #2: Using a compass, measure the distance between point T and point W . Option #3: Using a compass, measure the distance between point T and point P . (1 point) The next step Jouri needs to take is Option #
GPT-4o mini
To construct a copy of the segment PT using point W as one of the endpoints, Jouri needs to measure the distance of the segment PT. Therefore, the appropriate step is:
**Option #3: Using a compass, measure the distance between point T and point P.**
This will allow her to replicate the length of segment PT starting from point W.
**Option #3: Using a compass, measure the distance between point T and point P.**
This will allow her to replicate the length of segment PT starting from point W.
Use the image to answer the question. Aimee constructed GF←→ , a line segment bisector of AB¯¯¯¯¯¯¯¯ , which passes through point C . If AB=4 units, what is AC ? (1 point) AC=
GPT-4o mini
If \( AB = 4 \) units and \( GF \) is the bisector of \( AB \), it divides the segment \( AB \) into two equal parts.
To find \( AC \):
\[
AC = \frac{AB}{2} = \frac{4 \text{ units}}{2} = 2 \text{ units}
\]
Therefore, \( AC = 2 \) units.
To find \( AC \):
\[
AC = \frac{AB}{2} = \frac{4 \text{ units}}{2} = 2 \text{ units}
\]
Therefore, \( AC = 2 \) units.
Melvin has a line segment on his paper. He wants to construct a line segment bisector using the paper folding method. He has forgotten the steps to complete this construction. Help him by putting the following steps into the correct order. Option #1: Use a straight edge to draw a line through the point you have created. Option #2: Fold one endpoint of the line segment onto the other. Option #3: Unfold the paper and label the intersection of the fold and the line segment with a point. (2 points) The first step is Option #. The second step is Option #. The third step is Option #.
GPT-4o mini
To construct a line segment bisector using the paper folding method, the correct order of steps is as follows:
1. **The first step is Option #2:** Fold one endpoint of the line segment onto the other.
2. **The second step is Option #3:** Unfold the paper and label the intersection of the fold and the line segment with a point.
3. **The third step is Option #1:** Use a straight edge to draw a line through the point you have created.
So to summarize:
- The first step is Option #2.
- The second step is Option #3.
- The third step is Option #1.
1. **The first step is Option #2:** Fold one endpoint of the line segment onto the other.
2. **The second step is Option #3:** Unfold the paper and label the intersection of the fold and the line segment with a point.
3. **The third step is Option #1:** Use a straight edge to draw a line through the point you have created.
So to summarize:
- The first step is Option #2.
- The second step is Option #3.
- The third step is Option #1.