Question
Anika constructed ray AC that bisected ∠A . If the m∠BAD is 46 degrees, what is the m∠BAC ? which is the true correct answer solve it and tell me why
(1 point)
Responses
The m∠BAC is 92 degrees.
The m angle upper B upper A upper C is 92 degrees.
The m∠BAC=m∠DAC.
The m angle upper B upper A upper C equals m angle upper D upper A upper C .
The m∠BAC is 23 degrees.
The m angle upper B upper A upper C is 23 degrees.
The m∠BAC is 46 degrees.
(1 point)
Responses
The m∠BAC is 92 degrees.
The m angle upper B upper A upper C is 92 degrees.
The m∠BAC=m∠DAC.
The m angle upper B upper A upper C equals m angle upper D upper A upper C .
The m∠BAC is 23 degrees.
The m angle upper B upper A upper C is 23 degrees.
The m∠BAC is 46 degrees.
Answers
GPT-4o mini
To solve the problem, we need to understand what it means for ray AC to bisect angle A.
Given:
- Ray AC bisects ∠A
- m∠BAD = 46 degrees
Since ray AC bisects ∠A, this means that it divides ∠A into two equal parts:
\[
m∠BAC = m∠DAC
\]
Now, let's denote the measures of the angles:
\[
m∠BAC = x
\]
Since ray AC bisects ∠A, then:
\[
m∠DAC = x
\]
The total measure of angle A is the sum of these two angles:
\[
m∠A = m∠BAC + m∠DAC = x + x = 2x
\]
We know that the measure of one part, m∠BAD, is 46 degrees. In this scenario, it's not given that m∠BAD is equal to m∠BAC, but rather that angle B refers to angle A's composition. We can set up an equation to relate what we know about angles A and B.
Since m∠BAD + m∠DAC = m∠A:
\[
m∠BAD + m∠BAC = 2x
\]
Given that m∠BAD = 46 degrees, we can state:
\[
46 + x = 2x
\]
Rearranging gives us:
\[
46 = 2x - x
\]
\[
x = 46
\]
This means:
\[
m∠BAC = 46 \text{ degrees}
\]
Thus, the correct answer is:
The m∠BAC is 46 degrees.
Given:
- Ray AC bisects ∠A
- m∠BAD = 46 degrees
Since ray AC bisects ∠A, this means that it divides ∠A into two equal parts:
\[
m∠BAC = m∠DAC
\]
Now, let's denote the measures of the angles:
\[
m∠BAC = x
\]
Since ray AC bisects ∠A, then:
\[
m∠DAC = x
\]
The total measure of angle A is the sum of these two angles:
\[
m∠A = m∠BAC + m∠DAC = x + x = 2x
\]
We know that the measure of one part, m∠BAD, is 46 degrees. In this scenario, it's not given that m∠BAD is equal to m∠BAC, but rather that angle B refers to angle A's composition. We can set up an equation to relate what we know about angles A and B.
Since m∠BAD + m∠DAC = m∠A:
\[
m∠BAD + m∠BAC = 2x
\]
Given that m∠BAD = 46 degrees, we can state:
\[
46 + x = 2x
\]
Rearranging gives us:
\[
46 = 2x - x
\]
\[
x = 46
\]
This means:
\[
m∠BAC = 46 \text{ degrees}
\]
Thus, the correct answer is:
The m∠BAC is 46 degrees.