let V be torsion-free Z_Module; ( ( for v being Vector of (Z_MQ_VectSp V) holds v is Vector of (DivisibleMod V) ) & ( for v being Vector of (DivisibleMod V) holds v is Vector of (Z_MQ_VectSp V) ) & 0. (DivisibleMod V) = 0. (Z_MQ_VectSp V) )
A1:
Z_MQ_VectSp V = ModuleStr(# (Class (EQRZM V)),(addCoset V),(zeroCoset V),(lmultCoset V) #)
by ZMODUL04:def 5;
thus
for v being Vector of (Z_MQ_VectSp V) holds v is Vector of (DivisibleMod V)
by A1, defDivisibleMod; ( ( for v being Vector of (DivisibleMod V) holds v is Vector of (Z_MQ_VectSp V) ) & 0. (DivisibleMod V) = 0. (Z_MQ_VectSp V) )
thus
for v being Vector of (DivisibleMod V) holds v is Vector of (Z_MQ_VectSp V)
by A1, defDivisibleMod; 0. (DivisibleMod V) = 0. (Z_MQ_VectSp V)
thus
0. (DivisibleMod V) = 0. (Z_MQ_VectSp V)
by A1, defDivisibleMod; verum