The modulus of $ z $ is:
$$ |z| = \frac{\sqrt{ 1289369 }}{ 2 }$$To find modulus of a complex number $ z = a + bi $ we use formula:
$$ |z| = \sqrt{a^2 + b^2} $$In this example we have $ a = 470 $ and $ b = -\frac{ 637 }{ 2 } $ so:
$$ \begin{aligned}|z| &= \sqrt{ 470^2 + \left(-\frac{ 637 }{ 2 }\right)^2 } \\[1 em]|z| &= \sqrt{ 220900 + \frac{ 405769 }{ 4 } } \\[1 em]|z| &= \sqrt{ \frac{ 1289369 }{ 4 } } \\[1 em]|z| &= \frac{\sqrt{ 1289369 }}{ 2 } \\[1 em] \end{aligned} $$