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Tardigrade
Question
Mathematics
The function f(x)=esin x + cos x ∀ x∈ [0 , 2 π ] attains local extrema at x=α and x=β , then α +β is equal to
Q. The function
f
(
x
)
=
e
s
in
x
+
cos
x
∀
x
∈
[
0
,
2
π
]
attains local extrema at
x
=
α
and
x
=
β
,
then
α
+
β
is equal to
1300
219
NTA Abhyas
NTA Abhyas 2020
Application of Derivatives
Report Error
A
π
0%
B
2
π
100%
C
2
3
π
0%
D
2
π
0%
Solution:
f
′
(
x
)
=
e
s
in
x
+
cos
x
⋅
(
cos
x
−
s
in
x
)
∴
f
(
x
)
attains local extrema at
x
=
4
π
,
4
5
π
i.e.
α
+
β
=
4
6
π
=
2
3
π
