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Byju's Answer
Standard XII
Mathematics
Second Derivative Test for Local Minimum
For the funct...
Question
For the function f(x) =
x
+
1
x
(a) x = 1 is a point of maximum
(b) x =
-
1 is a point of minimum
(c) maximum value > minimum value
(d) maximum value< minimum value
Open in App
Solution
(
d
)
maximum value < minimum value
Given
:
f
x
=
x
+
1
x
⇒
f
'
x
=
1
-
1
x
2
For
a
local
maxima
or
a
local
minima
,
we
must
have
f
'
x
=
0
⇒
1
-
1
x
2
=
0
⇒
x
2
-
1
=
0
⇒
x
2
=
1
⇒
x
=
±
1
Now
,
f
'
'
x
=
2
x
3
⇒
f
'
'
1
=
2
1
=
2
>
0
So
,
x
=
1
is
a
local
minima.
Also
,
f
'
'
-
1
=
-
2
<
0
So
,
x
=
-
1
is
a
local
maxima.
The
local
minimum
value
is
given
by
f
1
=
2
The
local
maximum
value
is
given
by
f
-
1
=
-
2
∴
Maximum value
<
Minimum
value
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0
Similar questions
Q.
For the function f(x) =
x
+
1
x
(a) x = 1 is a point of maximum
(b) x =
-
1 is a point of minimum
(c) maximum value > minimum value
(d) maximum value< minimum value
Q.
The function f(x) = 2x
3
- 3x
2
- 12x + 4, has
(a) two points of local maximum (b) two points of local minimum
(c) one maximum and one minimum (d) no maximum no minimum
Q.
The absolute maximum & minimum values of functions can be found by their monotonic & asymptotic behavior provided they exist. We may agree that finite limiting values may be regarded as absolute maximum or minimum. For example, the absolute maximum value of
1
1
+
x
2
m
(
m
ϵ
N
)
is 1. When
x
=
0
, on the other side absolute minimum value of the some function is 0, which is limiting value of the function when
x
→
−
∞
or
x
→
+
∞
. Sometime
f
′
(
x
)
=
0
&
f
′′
(
x
)
=
0
for
x
=
a
but
f
′
"
(
x
)
≠
0
for
x
=
a
, then f(x) is neither absolute maximum nor absolute minimum at
x
=
a
, then
x
=
a
is called point of inflexion.
On the basis of above information answer the following questions.
The function
x
4
−
4
x
+
1
will have
Q.
For certain curves
y
=
f
(
x
)
;
x
∈
[
0
,
2
]
satisfying
d
2
y
d
x
2
=
6
x
−
4
,
f
(
x
)
has local minimum value
5
when
x
=
1
, then
Q.
If the function
y
=
sin
(
f
(
x
)
)
is monotonic for all value of
x
(where
f
(
x
)
is continuous ), then the maximum value of the difference between the maximum and minimum value of
f
(
x
)
is
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