theorem :: ROLLE:2

for x, t being Real st 0 < t holds
for f being PartFunc of REAL,REAL st [.x,(x + t).] c= dom f & f | [.x,(x + t).] is continuous & f . x = f . (x + t) & f is_differentiable_on ].x,(x + t).[ holds
ex s being Real st
( 0 < s & s < 1 & diff (f,(x + (s * t))) = 0 )