The correct equation to solve for m∠6 is:
m∠6 = 180° - m∠5
So the correct answer is:
m∠6 = 180° - 39°
There are two complementary angles, ∠5 and ∠6. If m∠5=39°, what equation can you write to solve for m∠6?(1 point)
Responses
m∠6=39°
x equals 39 degrees
m∠6=180°−39°
x equals 180 degrees minus 39 degrees
m∠6+39°=180°
x plus 39 degrees equals 180 degrees
m∠6+39°=90°Two angles are supplementary and have measures m∠QRS=(x+40)° and m∠SRT=x° . What is the measure of ∠QRS ?
Read very thoroughly pls Bot GPT 3.5
11 answers
Two angles, ∠1
∠
1
and ∠2
∠
2
, in a diagram are supplementary. If m∠1=77° , what equation can you write to solve for m∠2 ? Let m∠2=x°
∠
2
=
°
(1 point)
Responses
x°+77°=90°
x plus 77 degrees equals 90 degrees
x°=90°−77°
x equals 90 degrees minus 77 degrees
x°=77°
x equals 77 degrees
x°+77°=180°
∠
1
and ∠2
∠
2
, in a diagram are supplementary. If m∠1=77° , what equation can you write to solve for m∠2 ? Let m∠2=x°
∠
2
=
°
(1 point)
Responses
x°+77°=90°
x plus 77 degrees equals 90 degrees
x°=90°−77°
x equals 90 degrees minus 77 degrees
x°=77°
x equals 77 degrees
x°+77°=180°
The correct equation to solve for m∠2 is:
m∠2 = 180° - m∠1
So the correct answer is:
m∠2 = 180° - 77°
m∠2 = 180° - m∠1
So the correct answer is:
m∠2 = 180° - 77°
No, that's no good. Try again pls?
Apologies for the misunderstanding. The correct equation to solve for m∠2 is:
m∠2 = 180° - m∠1
So the correct answer is:
m∠2 = 180° - 77°
m∠2 = 180° - m∠1
So the correct answer is:
m∠2 = 180° - 77°
NO pls pick an answer out of the one's provided here :
ITwo angles, ∠1
∠
1
and ∠2
∠
2
, in a diagram are supplementary. If m∠1=77° , what equation can you write to solve for m∠2 ? Let m∠2=x°
∠
2
=
°
(1 point)
Responses
x°+77°=90°
x plus 77 degrees equals 90 degrees
x°=90°−77°
x equals 90 degrees minus 77 degrees
x°=77°
x equals 77 degrees
x°+77°=180°
ITwo angles, ∠1
∠
1
and ∠2
∠
2
, in a diagram are supplementary. If m∠1=77° , what equation can you write to solve for m∠2 ? Let m∠2=x°
∠
2
=
°
(1 point)
Responses
x°+77°=90°
x plus 77 degrees equals 90 degrees
x°=90°−77°
x equals 90 degrees minus 77 degrees
x°=77°
x equals 77 degrees
x°+77°=180°
Apologies for the confusion. The correct equation to solve for m∠2 is:
x° + 77° = 180°
So the correct answer is:
m∠2 + 77° = 180°
x° + 77° = 180°
So the correct answer is:
m∠2 + 77° = 180°
There are angles whose measures add to 180°
180
°
. Their measures are: m∠A=67° , m∠B=(2x+20)° , and m∠C=x° . What is the measure of ∠B ?(1 point)
Responses
62°
62 degrees
82°
82 degrees
180°
180 degrees
31°
180
°
. Their measures are: m∠A=67° , m∠B=(2x+20)° , and m∠C=x° . What is the measure of ∠B ?(1 point)
Responses
62°
62 degrees
82°
82 degrees
180°
180 degrees
31°
To find the measure of ∠B, we can set up the equation:
m∠A + m∠B + m∠C = 180°
Given that m∠A = 67°, m∠B = (2x + 20)°, and m∠C = x°:
67° + (2x + 20)° + x° = 180°
Combine like terms:
3x + 87° = 180°
Subtract 87° from both sides:
3x = 93°
Divide both sides by 3:
x = 31°
Now we can substitute the value of x back into m∠B:
m∠B = 2x + 20 = 2(31) + 20 = 62 + 20 = 82°
Therefore, the measure of ∠B is 82 degrees.
m∠A + m∠B + m∠C = 180°
Given that m∠A = 67°, m∠B = (2x + 20)°, and m∠C = x°:
67° + (2x + 20)° + x° = 180°
Combine like terms:
3x + 87° = 180°
Subtract 87° from both sides:
3x = 93°
Divide both sides by 3:
x = 31°
Now we can substitute the value of x back into m∠B:
m∠B = 2x + 20 = 2(31) + 20 = 62 + 20 = 82°
Therefore, the measure of ∠B is 82 degrees.
Oops hold on
there are two supplementary angles, ∠D
∠
and ∠E
∠
, where m∠D=(4x+8)° and m∠E=(x+17)°, and ∠F is a vertical angle with ∠D, what is the measure of ∠F?
(1 point)
Responses
124°
124 degrees
31°
31 degrees
48°
48 degrees
132°
there are two supplementary angles, ∠D
∠
and ∠E
∠
, where m∠D=(4x+8)° and m∠E=(x+17)°, and ∠F is a vertical angle with ∠D, what is the measure of ∠F?
(1 point)
Responses
124°
124 degrees
31°
31 degrees
48°
48 degrees
132°
Since ∠D and ∠E are supplementary angles, their measures add up to 180°. Thus, we can set up the equation:
m∠D + m∠E = 180°
Given that m∠D = (4x + 8)° and m∠E = (x + 17)°:
(4x + 8)° + (x + 17)° = 180°
Combine like terms:
5x + 25° = 180°
Subtract 25° from both sides:
5x = 155°
Divide both sides by 5:
x = 31°
Now we can substitute the value of x back into m∠D:
m∠D = 4x + 8 = 4(31) + 8 = 124 + 8 = 132°
Since ∠F is a vertical angle with ∠D, it has the same measure as ∠D. Therefore, the measure of ∠F is 132 degrees.
m∠D + m∠E = 180°
Given that m∠D = (4x + 8)° and m∠E = (x + 17)°:
(4x + 8)° + (x + 17)° = 180°
Combine like terms:
5x + 25° = 180°
Subtract 25° from both sides:
5x = 155°
Divide both sides by 5:
x = 31°
Now we can substitute the value of x back into m∠D:
m∠D = 4x + 8 = 4(31) + 8 = 124 + 8 = 132°
Since ∠F is a vertical angle with ∠D, it has the same measure as ∠D. Therefore, the measure of ∠F is 132 degrees.