U

Since we are given that the transformation from △PBU to △GZD is a rotation, we know that corresponding angles are congruent. Therefore, we have:

m∠P = m∠G
m∠B = m∠Z
m∠U = m∠D

We are given that m∠P = 38 degrees, so we know that m∠G = 38 degrees as well.

We want to find m∠Z. Since m∠B = m∠Z, we just need to find one of these angles, and we can use the fact that the sum of the angles in a triangle is 180 degrees. Therefore:

m∠P + m∠B + m∠U = 180 degrees
38 + m∠B + m∠U = 180
m∠B + m∠U = 142

But we also know that m∠B = m∠Z and m∠U = m∠D, so we can substitute to get:

m∠Z + m∠D = 142

We don't know m∠D, but we do know that m∠D + m∠G + m∠Z = 180 (since △GZD is a triangle). We already know that m∠G = 38, so we can substitute to get:

m∠D + 38 + m∠Z = 180

Simplifying this equation, we get:

m∠D + m∠Z = 142

This is the same equation we got earlier! Therefore, we can substitute the expression m∠D + m∠Z = 142 in for m∠Z + m∠D = 142, giving us:

m∠D + m∠D + m∠G = 180

Simplifying this equation, we get:

2m∠D + 38 = 180

Subtracting 38 from both sides, we get:

2m∠D = 142

Dividing by 2, we get:

m∠D = 71

Now we can substitute this value back into our equation m∠Z + m∠D = 142 to get:

m∠Z + 71 = 142

Subtracting 71 from both sides, we get:

m∠Z = 71

Therefore, m∠Z = 71 degrees.