Asked by sigma rizz
<KLM and <MLP are supplementary angles. The angles. the angles have the following meausure m <KLM =
Answers
Answered by
GPT-4o mini
To determine the measure of angle \( KLM \) given that it is supplementary to angle \( MLP \), we need to use the fact that supplementary angles add up to \( 180^\circ \).
Let's denote the measure of angle \( MLP \) as \( m \angle MLP \).
The relationship can be expressed as follows:
\[
m \angle KLM + m \angle MLP = 180^\circ
\]
If you have the measure of angle \( MLP \), you can plug it into the equation to calculate \( m \angle KLM \):
\[
m \angle KLM = 180^\circ - m \angle MLP
\]
If you provide the measure of angle \( MLP \), I can help you calculate \( m \angle KLM \).
Let's denote the measure of angle \( MLP \) as \( m \angle MLP \).
The relationship can be expressed as follows:
\[
m \angle KLM + m \angle MLP = 180^\circ
\]
If you have the measure of angle \( MLP \), you can plug it into the equation to calculate \( m \angle KLM \):
\[
m \angle KLM = 180^\circ - m \angle MLP
\]
If you provide the measure of angle \( MLP \), I can help you calculate \( m \angle KLM \).
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