Use the image to answer the question.
An illustration shows four rays with points near the arrows labeled A, B, C, and D in a clockwise direction emerging from a common point labeled O. The angle A O B is marked as 40 degrees and angle C O D is marked as 50 degrees.
Are the two indicated angles adjacent? Why or why not?
(1 point)
Responses
No, the two indicated angles do not share a common ray.
No, the two indicated angles do not share a common ray.
Yes, the two indicated angles share a common vertex.
Yes, the two indicated angles share a common vertex.
No, the two indicated angles do not share a common vertex.
No, the two indicated angles do not share a common vertex.
Yes, the two indicated angles share a common ray.
8 answers
No, the two indicated angles do not share a common ray.
Angle Pairs Unit Test
2 of 15 2 of 15 Items
Question
Use the image to answer the question.
An illustration shows three rays passing through three points from a common origin point at upper S. Point upper T is to the horizontal left of upper S. A ray from upper S joins upper T with an arrow near upper T. Point upper V is on the top inclined to the right of point upper S. A ray from upper S joins upper V with an arrow near upper V. Point upper R is to top right of point upper S, below point upper V. A ray from upper S joins upper R with an arrow near upper R. Angle upper T upper S upper R is labeled as 157 degrees. Angle upper V upper S upper R as 54 degrees.
What is the measure of ∠TSV ?
(1 point)
°
2 of 15 2 of 15 Items
Question
Use the image to answer the question.
An illustration shows three rays passing through three points from a common origin point at upper S. Point upper T is to the horizontal left of upper S. A ray from upper S joins upper T with an arrow near upper T. Point upper V is on the top inclined to the right of point upper S. A ray from upper S joins upper V with an arrow near upper V. Point upper R is to top right of point upper S, below point upper V. A ray from upper S joins upper R with an arrow near upper R. Angle upper T upper S upper R is labeled as 157 degrees. Angle upper V upper S upper R as 54 degrees.
What is the measure of ∠TSV ?
(1 point)
°
To determine the measure of ∠TSV, we need to find the sum of the measures of ∠TSR and ∠RSV and then subtract it from 180 degrees (a straight angle).
Given:
∠TSR = 157 degrees
∠RSV = 54 degrees
Thus,
∠TSV = 180 degrees - (∠TSR + ∠RSV)
∠TSV = 180 degrees - (157 degrees + 54 degrees)
∠TSV = 180 degrees - 211 degrees
∠TSV = -31 degrees
However, angles cannot have negative measures. Therefore, ∠TSV cannot be calculated with the given information.
Given:
∠TSR = 157 degrees
∠RSV = 54 degrees
Thus,
∠TSV = 180 degrees - (∠TSR + ∠RSV)
∠TSV = 180 degrees - (157 degrees + 54 degrees)
∠TSV = 180 degrees - 211 degrees
∠TSV = -31 degrees
However, angles cannot have negative measures. Therefore, ∠TSV cannot be calculated with the given information.
there is literally sum that says what the illustration is
Apologies for the mistake. If the illustration clearly states the measure of ∠TSV, please provide the sum mentioned in the illustration. Then I can calculate the measure of ∠TSV.
Use the image to answer the question.
An illustration shows three rays passing through three points from a common origin point at upper S. Point upper T is to the horizontal left of upper S. A ray from upper S joins upper T with an arrow near upper T. Point upper V is on the top inclined to the right of point upper S. A ray from upper S joins upper V with an arrow near upper V. Point upper R is to top right of point upper S, below point upper V. A ray from upper S joins upper R with an arrow near upper R. Angle upper T upper S upper R is labeled as 157 degrees. Angle upper V upper S upper R as 54 degrees.
What is the measure of ∠TSV ?
(1 point)
°
An illustration shows three rays passing through three points from a common origin point at upper S. Point upper T is to the horizontal left of upper S. A ray from upper S joins upper T with an arrow near upper T. Point upper V is on the top inclined to the right of point upper S. A ray from upper S joins upper V with an arrow near upper V. Point upper R is to top right of point upper S, below point upper V. A ray from upper S joins upper R with an arrow near upper R. Angle upper T upper S upper R is labeled as 157 degrees. Angle upper V upper S upper R as 54 degrees.
What is the measure of ∠TSV ?
(1 point)
°
Based on the given information and the image, we can find the measure of ∠TSV by subtracting the measures of ∠TSR and ∠RSV from 180 degrees.
Given:
∠TSR = 157 degrees
∠RSV = 54 degrees
To find ∠TSV:
∠TSV = 180 degrees - (∠TSR + ∠RSV)
∠TSV = 180 degrees - (157 degrees + 54 degrees)
∠TSV = 180 degrees - 211 degrees
∠TSV = -31 degrees
However, angles cannot have negative measures. Therefore, ∠TSV cannot be calculated accurately with the given information.
Given:
∠TSR = 157 degrees
∠RSV = 54 degrees
To find ∠TSV:
∠TSV = 180 degrees - (∠TSR + ∠RSV)
∠TSV = 180 degrees - (157 degrees + 54 degrees)
∠TSV = 180 degrees - 211 degrees
∠TSV = -31 degrees
However, angles cannot have negative measures. Therefore, ∠TSV cannot be calculated accurately with the given information.
Use the image to answer the question.
An illustration shows three rays from a common vertex with labeled angles. The first ray is inclined to the horizontal left of the common vertex with an arrow at the end. The second ray is inclined to the horizontal right of the common vertex with an arrow at the end. The third ray is to the top right of the common vertex with an arrow at the end. It is between the other two rays. The angle between the first and the third rays is labeled as left parenthesis 2 x plus 3 right parenthesis degrees. The angle between the second and third rays is labeled as left parenthesis x minus 6 right parenthesis degrees.
What is an equation for these two adjacent angles?
(2 points)
(
x+
)° + (x−
)° =
°
An illustration shows three rays from a common vertex with labeled angles. The first ray is inclined to the horizontal left of the common vertex with an arrow at the end. The second ray is inclined to the horizontal right of the common vertex with an arrow at the end. The third ray is to the top right of the common vertex with an arrow at the end. It is between the other two rays. The angle between the first and the third rays is labeled as left parenthesis 2 x plus 3 right parenthesis degrees. The angle between the second and third rays is labeled as left parenthesis x minus 6 right parenthesis degrees.
What is an equation for these two adjacent angles?
(2 points)
(
x+
)° + (x−
)° =
°
5 answers