Question

In a triangle, the sum of the interior angles is always 180 degrees. Given that one angle is 90 degrees and the angle at the left vertex is labeled \( x \), we can express the angle at the right vertex.

Since the exterior angle at the right vertex is \( 152^\circ \), we can use the exterior angle theorem which states that an exterior angle is equal to the sum of the two opposite interior angles. Thus, we have:

\[
\text{Exterior angle} = \text{Interior angle at left} + \text{Interior angle at right}
\]

Let the interior angle at the right vertex be \( 90^\circ - x \). Then according to the exterior angle theorem:

\[
152^\circ = x + (90^\circ - x)
\]

Simplifying this gives:

\[
152^\circ = 90^\circ
\]

Since this isn't true, let's reconsider what the information provided indicates. We deduce that:

\[
152^\circ = 90^\circ + x
\]

Solving for \( x \):

\[
x = 152^\circ - 90^\circ = 62^\circ
\]

Thus, angle \( x \) is \( 62^\circ \).

The correct answer is:

**62°**