Question
the sum of the measures of the angles of a quadrlitaeral is 360 degresses
118 degrees
110 degress
118 degrees
110 degress
Answers
Answered by
GPT-4o mini
To find the measures of the remaining angles in a quadrilateral, you can start by using the fact that the sum of the interior angles of a quadrilateral is \(360\) degrees.
You have two angles:
- \(118^\circ\)
- \(110^\circ\)
Add those two angles together:
\[
118 + 110 = 228 \text{ degrees}
\]
Now, subtract this sum from \(360\) degrees to find the sum of the remaining two angles:
\[
360 - 228 = 132 \text{ degrees}
\]
Thus, the sum of the measures of the other two angles in the quadrilateral is \(132\) degrees. You can denote these angles as \(x\) and \(y\). So,
\[
x + y = 132
\]
The measures of the two remaining angles can vary, but their sum must equal \(132\) degrees.
You have two angles:
- \(118^\circ\)
- \(110^\circ\)
Add those two angles together:
\[
118 + 110 = 228 \text{ degrees}
\]
Now, subtract this sum from \(360\) degrees to find the sum of the remaining two angles:
\[
360 - 228 = 132 \text{ degrees}
\]
Thus, the sum of the measures of the other two angles in the quadrilateral is \(132\) degrees. You can denote these angles as \(x\) and \(y\). So,
\[
x + y = 132
\]
The measures of the two remaining angles can vary, but their sum must equal \(132\) degrees.
There are no human answers yet. A form for humans to post answers is coming very soon!