To find the value of \( x \) in this context, we need more information about the relationship between the angles mentioned (54° and \( x \)). Common scenarios where we would have to find \( x \) involve equal angles, supplementary angles, or complementary angles.
Here are some possible scenarios:
-
If 54° and \( x \) are complementary angles: \[ x + 54° = 90° \] Solving for \( x \): \[ x = 90° - 54° = 36° \]
-
If 54° and \( x \) are supplementary angles: \[ x + 54° = 180° \] Solving for \( x \): \[ x = 180° - 54° = 126° \]
-
If 54° and \( x \) are equal angles: \[ x = 54° \]
If you can clarify the relationship between the angles, I'd be happy to help you determine \( x \) based on the specific condition!