Find the derivative of () = tan( /+1 )(by first principle)
Answers
Answered by
0
Answer:
From the first principle of derivatives,
f
′
(x)=
h→0
lim
h
f(x+h)−f(x)
=
h→0
lim
h
tan(x+h)−tanx
=
h→0
lim
h
cos(x+h)
sin(x+h)
−
cosx
sinx
=
h→0
lim
hcosxcos(x+h)
cosxsin(x+h)−sinxcos(x+h)
=
h→0
lim
hcosxcos(x+h)
2
sin(2x+h)+sinh
−
2
sin(2x+h)−sinh
=
h→0
lim
hcosxcos(x+h)
sinh
=
h→0
lim
h
sinh
×
h→0
lim
cosxcos(x+h)
1
=1×
cosx×cosx
1
=
cos
2
x
1
f
′
(x)=sec
2
x
Answered by
1
Answer:
Hope it's helpful to you dear ☆☆
Attachments:
Similar questions
History,
16 days ago
Computer Science,
1 month ago
Political Science,
1 month ago
Math,
9 months ago
Biology,
9 months ago