Asked by liquidlew

To find angle \( x \), we need more context about the relationships between the given angles. Assuming that angles are in a triangle or related in some other geometric context, I’ll provide a general approach to solve for \( x \).

For example, if you have a triangle and the three angles sum to 180°, you can find \( x \) using the equation:

\[
x + 122° + 90° = 180°
\]

Solving for \( x \):

\[
x + 212° = 180°
\]
\[
x = 180° - 212°
\]
\[
x = -32° \quad \text{(not possible)}
\]

If the angles mentioned are instead part of a linear pair or formed by parallel lines, let’s say angle \( x \) is supplementary to either \( 122° \) or \( 90° \):

1. For \( 122° \):
\[
x + 122° = 180°
\]
\[
x = 180° - 122° = 58°
\]

2. For \( 90° \):
\[
x + 90° = 180°
\]
\[
x = 180° - 90° = 90°
\]

If you can share the context or configuration these angles are in, we can find out the exact value of angle \( x \). Based on the potential answers provided, if we were to choose from them, \( 68° \) or \( 90° \) could be potential choices depending on the situation.

Please provide additional context or conditions for a more accurate solution!