To find the measure of angle \( x \), we need to clarify the relationship between the angles given (45 degrees and 110 degrees). Assuming these angles are part of a triangle or some other geometric figure, the context is essential.
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If these angles are part of a triangle, the sum of the angles in a triangle is always 180 degrees. In this case, you can set up the equation: \[ x + 45 + 110 = 180 \] \[ x + 155 = 180 \] \[ x = 180 - 155 \] \[ x = 25 \text{ degrees} \]
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If 45 degrees and 110 degrees are supplementary angles, meaning they add up to 180 degrees, they would not be directly relevant to finding \( x \) unless you are looking for a third angle: \[ x + 45 + 110 = 360 \text{ (for a complete circle)} \] This doesn't pertain to just 45 and 110; it would be more relevant for a quadrilateral or another context. In this situation, you would arrive at: \[ x + 155 = 360 \] \[ x = 360 - 155 = 205 \text{ degrees} \]
Please specify in what context you are looking for \( x \) to give the most accurate angle measure. If you meant something different, please provide additional details!
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