Answer: The measure of ∠J = 36° and ∠K = 54°.
Step-by-step explanation:
Since we have given that
∠J and ∠K are complementary angles.
As we know that sum of two complementary angles is 90°.
and the measure of angle J is 18 less than the measure of angle K.
According to question, we get that
[tex]\angle J+\angle K=90^\circ\\\\\angle K-\angle J=18^\circ\\\\so,\\\angle K=18^\circ +\angle J[/tex]
So, it becomes,
[tex]\angle J+\angle K=90^\circ\\\\\angle J+18+\angle J=90^\circ\\\\2\angle J=90-18\\\\2\angle J=72\\\\\angle J=\dfrac{72}{2}\\\\\angle J=36^\circ[/tex]
So, the measure of ∠J = 36° and ∠K=36+18=54°.
Hence, the measure of ∠J = 36° and ∠K = 54°.
