let a, b, c be Real; :: thesis: ( c <= a & c <= b & a -' c = b -' c implies a = b )
assume that
A1: a >= c and
A2: b >= c and
A3: a -' c = b -' c ; :: thesis: a = b
a - c >= 0 by A1, Th48;
then A4: a -' c = a - c by XREAL_0:def 2;
b - c >= 0 by A2, Th48;
then a + (- c) = b + (- c) by A3, A4, XREAL_0:def 2;
hence a = b ; :: thesis: verum