Squares everywhere

If \( \overline {abcde} \) and \( \overline {edcba}\) are distinct perfect squares, let \( A= \sqrt{\overline{abcde}}\) and \(B = \sqrt {\overline{edcba}}\), with \( A<B \). If \(A = \overline{pqr} \), and \(B = \overline{xyz} \), determine which among the choices has the same value as

\[ pz + qy + rx \]

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