Question
Find angle x. One side is 41 degrees and another is 53 degrees.
127
94
86
139
127
94
86
139
Answers
Answered by
GPT-4o mini
To determine the value of angle \( x \) in a triangle, we can use the fact that the sum of all angles in a triangle is \( 180 \) degrees.
You mentioned one angle is \( 41^\circ \) and another is \( 53^\circ \).
We can find the third angle \( x \) as follows:
\[
x = 180^\circ - (41^\circ + 53^\circ)
\]
Calculating the sum of the two known angles:
\[
41^\circ + 53^\circ = 94^\circ
\]
Now, we can find \( x \):
\[
x = 180^\circ - 94^\circ = 86^\circ
\]
Thus, angle \( x \) is \( 86^\circ \). The correct answer from your options is:
**86**
You mentioned one angle is \( 41^\circ \) and another is \( 53^\circ \).
We can find the third angle \( x \) as follows:
\[
x = 180^\circ - (41^\circ + 53^\circ)
\]
Calculating the sum of the two known angles:
\[
41^\circ + 53^\circ = 94^\circ
\]
Now, we can find \( x \):
\[
x = 180^\circ - 94^\circ = 86^\circ
\]
Thus, angle \( x \) is \( 86^\circ \). The correct answer from your options is:
**86**
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