theorem
for
n being non
zero Nat for
i being
Nat for
g1,
g2 being
PartFunc of
(REAL n),
REAL for
y being
Element of
REAL n st
g1 is_partial_differentiable_in y,
i &
g2 is_partial_differentiable_in y,
i holds
(
g1 - g2 is_partial_differentiable_in y,
i &
partdiff (
(g1 - g2),
y,
i)
= (partdiff (g1,y,i)) - (partdiff (g2,y,i)) )