To find the value of \( x \) in the context provided, we need a bit more information regarding the relationship among the angles. However, if we consider common angle relationships like angles in a triangle or angles forming a complete circle, we could derive a potential solution.
If the angles are part of a triangle, the sum of the angles must equal \( 180° \): \[ x + 62° + 28° + 245° = 180° \] However, this equation doesn’t hold because the sum of 62° and 28° alone is 90° and adding 245° makes it way over 180°.
Alternatively, if these angles are around a point (full circle), they must sum to \( 360° \): \[ x + 62° + 28° + 245° = 360° \]
To solve for \( x \): \[ x + 62 + 28 + 245 = 360 \] First, calculate the sum of the known angles: \[ 62 + 28 + 245 = 335 \] Now, substitute back into the equation: \[ x + 335 = 360 \] Subtract \( 335 \) from both sides: \[ x = 360 - 335 \] \[ x = 25° \]
Thus, the value of \( x \) is \( 25° \).