To find the value of \( g \), we need some context about the relationship between the angles you've provided. If we assume that these angles are part of a triangle or formed by intersecting lines, we can apply the appropriate angle rules.
Case 1: Triangle
If \( g \) is the third angle of a triangle where the other two angles are \( 26^\circ \) and \( 67^\circ \), then we can use the fact that the sum of the angles in a triangle is \( 180^\circ \):
\[ g + 26^\circ + 67^\circ = 180^\circ \]
Combining the given angles:
\[ g + 93^\circ = 180^\circ \]
Now, solving for \( g \):
\[ g = 180^\circ - 93^\circ \] \[ g = 87^\circ \]
Case 2: Linear Pair or Other Relationship
If \( g \) is directly related to the two angles in some other way (like supplementary angles), please specify that relationship, and we can find \( g \) accordingly.
Assuming the triangle scenario is correct, the value of \( g \) is:
\[ \boxed{87^\circ} \]