zad8.pdf

f 0 >@?

f F

f ( x )=

3 x 4 2 x 3 +7 M

x 3

x 2 4

x ln x x 3 cos x

x 2 +1

x 4 +1 P

L ln x

L sin x cos x

sin x

2 e x 1

x ln( x 2 +1) T L

sin(ln(1+ x 4 ))

x +1

L xe x 2

x 3 1

x 1 W

ln( x 2 )

f ( x )= x 3 +3 x 2 12 x 7 x 2 IR M

f ( x )= x 4 +4 x 3 8 x 2 2 x 2 IR

f ( x )= x 3 + x 2

x 2 IR

f ( x )= x 3 3 x 2 +3 x 1 x 2 IR

f ( x )= e x 2

x 2 2

x 2 IR Q

x 2 +1

x 2 IR

A F

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f ( x ) p 4

x 0

f ( x )=ln(1+ x ) x 0 =0 M

f ( x )= e x 2

x 0 =0

f ( x )= e x

x 0 =ln2

f ( x )=sin x x 0 = 4

f ( x )= 1

x + p

x 0 =1

f ( x )=( x +1)ln(1+ x ) x 0 =0

f ( x )=sin( x 2 ) x 0 =

f ( x )= e 1 x ln x x 0 =2

S L

j"%$’&)(+*-,/.10325tf} ‹ ]b: *-G/; “ ~

f ( x;y;z )= x ln y + y ln z + z ln x ( x;y;z )=(1 ; 2 ; 3)

f ( x;y )=(cos( xy )+ x ) 2

( x;y )=

1 ; 2

f ( x;y;z )= e xy ln( yz ) ( x;y;z )=(0 ; 1 ; 2)

f ( x;y;z )= xz ( x + y + z ) 2

( x;y;z )=(1 ; 2 ; 1)

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