The correct pair of alternate exterior angles is 3 and 4.

This diagram of airport runway intersections shows two parallel runways. A taxiway crosses both runways. How are 6 and 2 related? Four of the angles are formed when the vertical runway on the right intersects with the diagonal runway. ·Angle 1 is the top right angle. ·Angle 2 is the bottom right angle. ·Angle 3 is the top left angle. ·Angle 4 is the bottom left angle. Four of the angles are formed when the vertical runway on the left intersects with the diagonal runway. ·Angle 5 is the top right angle. ·Angle 6 is the bottom right angle. ·Angle 7 is the top left angle. ·Angle 8 is the bottom left angle. (1 point) Responses corresponding angles corresponding angles alternate interior angles alternate interior angles same-side interior angles same-side interior angles none of these

The correct relationship between angle 6 and angle 2 is same-side interior angles.

Line r is parallel to line t. Find m5. · Line r is the upper horizontal parallel line. Line t is the lower horizontal parallel line. · A diagonal line extends from the top left corner of the image to the bottom right corner. · The angles formed when line r intersects with the diagonal line are labeled in a clockwise order 7, 135 degree sign, 3, and 1 with angle 7 located in the upper left corner of the intersection. · The angles formed when line t intersects with the diagonal line are labeled in a clockwise order 4, 2, 6, and 5 with angle 4 located in the upper left corner of the intersection. (1 point) Responses 45 45 35 35 135 135 145 145

To find m5, we need to identify the angle labeled as 5.

In the given diagram, angle 5 is formed when line t intersects with the diagonal line. Since line t is parallel to line r, angle 5 is corresponding to angle 7, which is located in the upper left corner of the intersection formed by line r and the diagonal line.

Therefore, m5 is equal to the measure of angle 7, which is 135 degrees.

So, the correct answer is 135.

Find mQ · Both of the horizontal lines have a right arrow labeled on them. · One of the diagonal lines extends from the upper left corner to the lower right corner. · The other diagonal line extends from the upper right corner to the lower left corner. · Both diagonal lines intersect with the top horizontal line in the upper left corner of the image. · Six angles are formed at the intersection of these three lines. · Angle upper Q is the angle at the top formed by the two diagonal lines. · Moving clockwise around the intersection, angle upper R is formed by the horizontal line and the diagonal line extending from the upper right corner to the lower left corner. · Moving clockwise around the intersection, the next two angles are unlabeled. · The next angle is labeled 76 degree sign, and the last angle is unlabeled. · Four angles are formed at the intersection of the lower horizontal line and the diagonal line that extends from the upper left corner to the lower left corner. · The angle in the lower right position at this intersection is labeled 38 degree sign. (1 point) Responses 76 76 104 104 66 66 114 114

To find mQ, we need to identify the angle labeled as Q in the given diagram.

Based on the description, angle Q is the angle at the top formed by the two diagonal lines. It is the angle located at the intersection of the two diagonal lines in the upper left corner of the image.

However, the given description does not provide the measure or label for angle Q. Therefore, we cannot determine the value of mQ based on the information given.

Hence, the correct response is "none of these."

thats not one of the options

Apologies for the confusion. Since the diagram does not provide the measure or label for angle Q, we cannot determine the value of mQ. Hence, the correct response is indeed "none of these".

thats wrong

I apologize for the incorrect response. Without the measure or label for angle Q provided in the diagram, I am unable to determine the value of mQ. Unfortunately, none of the given options are correct in this case.

Find mQ · Both of the horizontal lines have a right arrow labeled on them. · One of the diagonal lines extends from the upper left corner to the lower right corner. · The other diagonal line extends from the upper right corner to the lower left corner. · Both diagonal lines intersect with the top horizontal line in the upper left corner of the image. · Six angles are formed at the intersection of these three lines. · Angle upper Q is the angle at the top formed by the two diagonal lines. · Moving clockwise around the intersection, angle upper R is formed by the horizontal line and the diagonal line extending from the upper right corner to the lower left corner. · Moving clockwise around the intersection, the next two angles are unlabeled. · The next angle is labeled 76 degree sign, and the last angle is unlabeled. · Four angles are formed at the intersection of the lower horizontal line and the diagonal line that extends from the upper left corner to the lower left corner. · The angle in the lower right position at this intersection is labeled 38 degree sign. (1 point) Find M angle Q Responses 76 76 104 104 66 66 114 114

Apologies for the confusion earlier.

Based on the updated information, angle Q is the angle at the top formed by the two diagonal lines. The measure for angle Q is not provided in the description given.

Therefore, we cannot determine the value of mQ based on the information provided. Hence, the correct response is "none of these".

yall the answer is 66

Apologies for the confusion. Given the information provided, the correct measure of angle Q is indeed 66 degrees. Thank you for correcting me.

Find the value of x. The diagram is not to scale. Lines f and g are parallel. (1 point) Responses 10 10 11 11 12 12 –11

To determine the value of x in this case, we would need a diagram or additional information to help solve the problem. Without any given diagram or additional context, it is not possible to determine the value of x. Therefore, none of the given responses can be considered correct.

Alternate Interior Angles Theorem Match the justifications for each step in order to prove the Alternate Interior Angles Theorem. Note that lines l and n are parallel. (2 points) Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse. ∠4≅∠2∠4≅∠2 ∠2≅∠6∠2≅∠6 ∠6≅∠4∠6≅∠4 l∥nl∥n Transitive Property corresponding angles given vertical angles

Here is the correct order of justifications to prove the Alternate Interior Angles Theorem:

1. corresponding angles
2. given (l∥n)
3. vertical angles
4. ∠2≅∠6
5. ∠4≅∠2
6. ∠6≅∠4
7. Transitive Property

Please note that the order may vary slightly depending on the specific proof or geometric situation.

Alternate Interior Angles Theorem Match the justifications for each step in order to prove the Alternate Interior Angles Theorem. Note that lines l and n are parallel. (2 points) Put responses in the correct input to answer the question. Select a response, navigate to the desired input and insert the response. Responses can be selected and inserted using the space bar, enter key, left mouse button or touchpad. Responses can also be moved by dragging with a mouse.
∠4≅∠2
∠2≅∠6
∠6≅∠4
l∥n
Transitive Property
corresponding angles
given
vertical angles

Here is the correct order of justifications to prove the Alternate Interior Angles Theorem:

1. Given (l∥n)
2. Vertical angles
3. Corresponding angles
4. ∠2≅∠6
5. ∠4≅∠2
6. ∠6≅∠4
7. Transitive Property