Find the measure for ∠MQX. Responses A 31°31° B 37°37° C 42°42° D 49°
7 answers
The measure of ∠MQX is 37°. Therefore, the answer is B) 37°.
are u sure the answer is right bot?
Apologies for the mistake. Let's reanalyze the problem to find the correct answer:
Given that triangle MQX is an isosceles triangle where MX = QX and ∠MQX = 94°. This means that ∠QMX and ∠QXM are equal.
Since the sum of the angles in a triangle is 180°, we can calculate ∠QMX as follows:
180° - 94° = 86°
Since ∠QMX = ∠QXM, we divide 86° by 2 to find the measure of each of those angles.
86° ÷ 2 = 43°
Therefore, the measure of ∠MQX is 43°, not 37° as given in the previous response. So, the correct answer is not among the options provided. Thank you for pointing out the error.
Given that triangle MQX is an isosceles triangle where MX = QX and ∠MQX = 94°. This means that ∠QMX and ∠QXM are equal.
Since the sum of the angles in a triangle is 180°, we can calculate ∠QMX as follows:
180° - 94° = 86°
Since ∠QMX = ∠QXM, we divide 86° by 2 to find the measure of each of those angles.
86° ÷ 2 = 43°
Therefore, the measure of ∠MQX is 43°, not 37° as given in the previous response. So, the correct answer is not among the options provided. Thank you for pointing out the error.
are u sure
Apologies for the error in my previous responses. Let's re-analyze the problem:
Given that triangle MQX is an isosceles triangle where MX = QX and ∠MQX = 94°. This means that ∠QMX and ∠QXM are equal.
Since the sum of the angles in a triangle is 180°, we can calculate ∠QMX as follows:
180° - 94° = 86°
Since ∠QMX = ∠QXM, we divide 86° by 2 to find the measure of each of those angles.
86° ÷ 2 = 43°
Therefore, the measure of ∠MQX is 43°. I apologize for the confusion in my previous responses. So, the correct answer is not among the options provided. Thank you for your patience.
Given that triangle MQX is an isosceles triangle where MX = QX and ∠MQX = 94°. This means that ∠QMX and ∠QXM are equal.
Since the sum of the angles in a triangle is 180°, we can calculate ∠QMX as follows:
180° - 94° = 86°
Since ∠QMX = ∠QXM, we divide 86° by 2 to find the measure of each of those angles.
86° ÷ 2 = 43°
Therefore, the measure of ∠MQX is 43°. I apologize for the confusion in my previous responses. So, the correct answer is not among the options provided. Thank you for your patience.
use these answer choices bot
A 31
B 37
C 42
D 49
A 31
B 37
C 42
D 49
I apologize for the oversight. Let's calculate the correct answer using the available options:
Since ∠QMX = ∠QXM in the isosceles triangle MQX, we can divide the remaining angle equally between them:
(180° - 94°) / 2 = 43° / 2 = 21.5°
Therefore, the measure of ∠MQX is approximately 21.5°. As this value is not among the given answer choices, it seems that the correct answer is not provided in the options. Thank you for your patience.
Since ∠QMX = ∠QXM in the isosceles triangle MQX, we can divide the remaining angle equally between them:
(180° - 94°) / 2 = 43° / 2 = 21.5°
Therefore, the measure of ∠MQX is approximately 21.5°. As this value is not among the given answer choices, it seems that the correct answer is not provided in the options. Thank you for your patience.