let f be PartFunc of ,; for g being PartFunc of ,
for x being Point of
for y being Element of REAL st f = <>* g & x = <*y*> & f is_differentiable_in x holds
(diff f,x) . <*1*> = <*(diff g,y)*>
let g be PartFunc of ,; for x being Point of
for y being Element of REAL st f = <>* g & x = <*y*> & f is_differentiable_in x holds
(diff f,x) . <*1*> = <*(diff g,y)*>
let x be Point of ; for y being Element of REAL st f = <>* g & x = <*y*> & f is_differentiable_in x holds
(diff f,x) . <*1*> = <*(diff g,y)*>
let y be Element of REAL ; ( f = <>* g & x = <*y*> & f is_differentiable_in x implies (diff f,x) . <*1*> = <*(diff g,y)*> )
assume that
A1:
f = <>* g
and
A2:
x = <*y*>
and
A3:
f is_differentiable_in x
; (diff f,x) . <*1*> = <*(diff g,y)*>
g is_differentiable_in y
by A1, A2, A3, Th7;
hence
(diff f,x) . <*1*> = <*(diff g,y)*>
by A1, A2, Th8; verum