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Original Question
Are the two indicated angles adjacent? Why or why not? (1 point) Responses Yes, the two indicated angles share a common vertex....Question
Are the two indicated angles adjacent? Why or why not?
(1 point)
Responses
Yes, the two indicated angles share a common ray.
Yes, the two indicated angles share a common ray.
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 verte
(1 point)
Responses
Yes, the two indicated angles share a common ray.
Yes, the two indicated angles share a common ray.
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 verte
Answers
Answer
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)
°
Answer
Angle Pairs Unit Test
3 of 153 of 15 Items
Question
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−
)° =
°
Answer
could u solve it
Answer
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−
)° =
°
Skip to navigation
u sure its for this
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−
)° =
°
Skip to navigation
u sure its for this
Answer
Two adjacent angles, ∠1
and ∠2
, form a resulting angle with measure 135° . If m∠1=(2x)° and m∠2=(2x+7)° , what are the two unknown angle measures?(1 point)
m∠1=
°, m∠2=
°
and ∠2
, form a resulting angle with measure 135° . If m∠1=(2x)° and m∠2=(2x+7)° , what are the two unknown angle measures?(1 point)
m∠1=
°, m∠2=
°
Answered by
GPT 3.5
x.
Yes, the two indicated angles share a common vertex.
Yes, the two indicated angles share a common vertex.
Answered by
GPT 3.5
The measure of ∠TSV is 157°.
Answered by
GPT 3.5
(x + 2x + 3)° + (x - 6)° = °
Answered by
GPT 3.5
Certainly! To solve the equation, let's simplify it:
(x + 2x + 3)° + (x - 6)° = °
Combine like terms:
3x + 3 + x - 6 = °
Combine the constant terms:
4x - 3 = °
Add 3 to both sides of the equation:
4x - 3 + 3 = ° + 3
4x = ° + 3
Finally, divide both sides of the equation by 4 to solve for x:
4x/4 = (° + 3)/4
x = (° + 3)/4
So, the solution for x is x = (° + 3)/4.
(x + 2x + 3)° + (x - 6)° = °
Combine like terms:
3x + 3 + x - 6 = °
Combine the constant terms:
4x - 3 = °
Add 3 to both sides of the equation:
4x - 3 + 3 = ° + 3
4x = ° + 3
Finally, divide both sides of the equation by 4 to solve for x:
4x/4 = (° + 3)/4
x = (° + 3)/4
So, the solution for x is x = (° + 3)/4.
Answered by
GPT 3.5
Apologies for the confusion earlier. Based on the given description, the correct equation for the two adjacent angles is:
(2x + 3)° + (x - 6)° = °
(2x + 3)° + (x - 6)° = °
Answered by
GPT 3.5
Based on the given information, we have:
m∠1 = (2x)°
m∠2 = (2x + 7)°
Resulting angle measure = 135°
To find the two unknown angle measures, we can set up an equation:
m∠1 + m∠2 = Resulting angle measure
(2x)° + (2x + 7)° = 135°
Now, let's solve for x.
2x + 2x + 7 = 135
4x + 7 = 135
4x = 135 - 7
4x = 128
x = 128/4
x = 32
Now we can substitute the value of x back into the expressions for m∠1 and m∠2 to find their measures:
m∠1 = (2x)° = 2(32)° = 64°
m∠2 = (2x + 7)° = 2(32) + 7° = 64 + 7° = 71°
Therefore, the two unknown angle measures are:
m∠1 = 64°
m∠2 = 71°
m∠1 = (2x)°
m∠2 = (2x + 7)°
Resulting angle measure = 135°
To find the two unknown angle measures, we can set up an equation:
m∠1 + m∠2 = Resulting angle measure
(2x)° + (2x + 7)° = 135°
Now, let's solve for x.
2x + 2x + 7 = 135
4x + 7 = 135
4x = 135 - 7
4x = 128
x = 128/4
x = 32
Now we can substitute the value of x back into the expressions for m∠1 and m∠2 to find their measures:
m∠1 = (2x)° = 2(32)° = 64°
m∠2 = (2x + 7)° = 2(32) + 7° = 64 + 7° = 71°
Therefore, the two unknown angle measures are:
m∠1 = 64°
m∠2 = 71°
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