Question
triangle, left corner = 1 right corner = 25° middle = 2
M<1=
M<2=
M<1=
M<2=
Answers
GPT-4o mini
To determine the measures of angles \( M\angle 1 \) and \( M\angle 2 \) in the triangle you described, we need to consider the properties of triangles.
You've stated that the left corner (which we'll assume is one of the triangle's angles) has a measure of \( M\angle 1 = 1^\circ \) and the right corner has a measure of \( M\angle 2 = 25^\circ \).
In a triangle, the sum of the interior angles is always \( 180^\circ \). Therefore, we can express the third angle \( M\angle 3 \) as follows:
\[
M\angle 1 + M\angle 2 + M\angle 3 = 180^\circ
\]
Substituting the known values:
\[
1^\circ + 25^\circ + M\angle 3 = 180^\circ
\]
Combining the known angles:
\[
26^\circ + M\angle 3 = 180^\circ
\]
Now, isolate \( M\angle 3 \):
\[
M\angle 3 = 180^\circ - 26^\circ = 154^\circ
\]
Thus, the measures are:
- \( M\angle 1 = 1^\circ \)
- \( M\angle 2 = 25^\circ \)
- \( M\angle 3 = 154^\circ \)
If you were referring to something different for the triangle, please provide additional details!
You've stated that the left corner (which we'll assume is one of the triangle's angles) has a measure of \( M\angle 1 = 1^\circ \) and the right corner has a measure of \( M\angle 2 = 25^\circ \).
In a triangle, the sum of the interior angles is always \( 180^\circ \). Therefore, we can express the third angle \( M\angle 3 \) as follows:
\[
M\angle 1 + M\angle 2 + M\angle 3 = 180^\circ
\]
Substituting the known values:
\[
1^\circ + 25^\circ + M\angle 3 = 180^\circ
\]
Combining the known angles:
\[
26^\circ + M\angle 3 = 180^\circ
\]
Now, isolate \( M\angle 3 \):
\[
M\angle 3 = 180^\circ - 26^\circ = 154^\circ
\]
Thus, the measures are:
- \( M\angle 1 = 1^\circ \)
- \( M\angle 2 = 25^\circ \)
- \( M\angle 3 = 154^\circ \)
If you were referring to something different for the triangle, please provide additional details!