We derive necessary conditions for the existence of complex Seidel matrices containing
p
p
th roots of unity and having exactly two eigenvalues, under the assumption that
p
p
is prime. The existence of such matrices is equivalent to the existence of equiangular Parseval frames with Gram matrices whose off-diagonal entries are a common multiple of the
p
p
th roots of unity. Explicitly examining the necessary conditions for
p
=
5
p=5
and
p
=
7
p=7
rules out the existence of many such frames with a number of vectors less than 50, similar to previous results in the cube roots case. On the other hand, we confirm the existence of
p
2
×
p
2
p^2\times p^2
Seidel matrices containing
p
p
th roots of unity, and thus the existence of the associated complex equiangular Parseval frames, for any
p
≥
2
p\ge 2
. The construction of these Seidel matrices also yields a family of previously unknown Butson-type complex Hadamard matrices.