The NIST P192 curve uses a form of \(y^2=x^3+ax+b\) and a finite field of \(p = 6277101735386680763835789423207666416083908700390324961279\). The base point (\(G\) is at and the base point is at (0x188da80eb03090f67cbf20eb43a18800f4ff0afd82ff1012, 0x07192b95ffc8da78631011ed6b24cdd573f977a11e7948119) [secp256k1 barebones][P256 barebones][P521 barebones][Curve 25519 barebones]. Some test vectors from here are:
k = 1 x = 188DA80EB03090F67CBF20EB43A18800F4FF0AFD82FF1012 y = 07192B95FFC8DA78631011ED6B24CDD573F977A11E794811 k = 2 x = DAFEBF5828783F2AD35534631588A3F629A70FB16982A888 y = DD6BDA0D993DA0FA46B27BBC141B868F59331AFA5C7E93AB k = 3 x = 76E32A2557599E6EDCD283201FB2B9AADFD0D359CBB263DA y = 782C37E372BA4520AA62E0FED121D49EF3B543660CFD05FD