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Byju's Answer
Standard XII
Mathematics
Particular Solution of a Differential Equation
If x log elog...
Question
If
x
log
e
(
log
e
x
)
−
x
2
+
y
2
=
4
(
y
>
0
)
, then
d
y
d
x
at
x
=
e
is equal to :
A
(
2
e
−
1
)
2
√
4
+
e
2
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B
e
√
4
+
e
2
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C
(
1
+
2
e
)
2
√
4
+
e
2
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D
(
1
+
2
e
)
√
4
+
e
2
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Solution
The correct option is
A
(
2
e
−
1
)
2
√
4
+
e
2
y
2
=
4
+
x
2
−
x
log
e
(
log
e
x
)
…
(
1
)
For
x
=
e
y
2
=
4
+
e
2
−
e
×
0
⇒
y
=
√
4
+
e
2
Differentiate equation
(
1
)
w.r.t.
x
, we get
2
y
d
y
d
x
=
2
x
−
log
e
(
log
e
x
)
−
x
×
1
log
e
x
×
1
x
⇒
d
y
d
x
=
2
x
−
log
e
(
log
e
x
)
−
1
log
e
x
2
y
⇒
d
y
d
x
∣
∣
∣
x
=
e
=
2
e
−
1
2
√
4
+
e
2
Suggest Corrections
17
Similar questions
Q.
If
x
log
e
(
log
e
x
)
−
x
2
+
y
2
=
4
(
y
>
0
)
, then
d
y
d
x
at
x
=
e
is equal to :
Q.
If
y
=
y
(
x
)
is the solution of the differential equation
d
y
d
x
=
(
tan
x
−
y
)
sec
2
x
,
x
∈
(
−
π
2
,
π
2
)
,
such that
y
(
0
)
=
0
,
then
y
(
−
π
4
)
is equal to :
Q.
If
e
y
+
x
y
=
e
,
the ordered pair
(
d
y
d
x
,
d
2
y
d
x
2
)
at
x
=
0
is equal to :
Q.
If
f
(
x
)
=
e
x
+
∫
1
0
(
e
x
+
t
e
−
x
)
f
(
t
)
d
t
, then prove that
f
(
x
)
=
2
(
e
−
1
)
4
e
−
2
e
2
.
e
x
+
e
−
1
4
−
2
e
.
e
−
x
.
Q.
If
∫
2
e
5
x
+
e
4
x
−
4
e
3
x
+
4
e
2
x
+
2
e
x
(
e
2
x
+
4
)
(
e
2
x
−
1
)
2
d
x
=
tan
−
1
(
e
x
/
2
)
−
K
248
(
e
2
x
−
1
)
+
C
then K is equal to.
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Particular Solution of a Differential Equation
Standard XII Mathematics
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