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Byju's Answer
Standard XI
Mathematics
Logarithmic Inequalities
The solution ...
Question
The solution set of the inequality
log
3
(
(
x
+
2
)
(
x
+
4
)
)
+
log
1
/
3
(
x
+
2
)
<
1
2
log
√
3
7
is
A
(
−
2
,
−
1
)
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B
(
−
2
,
3
)
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C
(
−
1
,
3
)
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D
(
3
,
∞
)
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Solution
The correct option is
B
(
−
2
,
3
)
log
3
[
(
x
+
2
)
(
x
+
4
)
]
+
log
1
/
3
(
x
+
2
)
<
1
2
log
√
3
7
⇒
log
3
(
x
+
2
)
(
x
+
4
)
−
log
3
(
x
+
2
)
<
log
3
7
⇒
log
3
(
x
+
4
)
<
log
3
7
⇒
x
+
4
<
7
⇒
x
<
3
⋯
(
1
)
For domain
→
(
x
+
2
)
(
x
+
4
)
>
0
⇒
x
∈
(
−
∞
,
−
4
)
∪
(
−
2
,
∞
)
⋯
(
2
)
and
x
+
2
>
0
⋯
(
3
)
From
(
1
)
,
(
2
)
and
(
3
)
,
x
∈
(
−
2
,
3
)
Suggest Corrections
0
Similar questions
Q.
Solution set of the inequality
log
3
(
x
+
2
)
(
x
+
4
)
+
log
1
3
(
x
+
2
)
<
1
2
log
√
3
7
is -
Q.
Solve the inequality:
log
3
(
x
+
2
)
(
x
+
4
)
+
log
1
/
3
(
x
+
2
)
<
1
2
log
√
3
7
Q.
The complete solution set of the inequality
log
3
(
x
+
2
)
(
x
+
4
)
+
log
1
/
3
(
x
+
2
)
<
1
2
log
√
3
7
is equal to
Q.
The solution set of the inequality
log
3
(
x
+
2
)
(
x
+
4
)
+
log
1
/
3
(
x
+
2
)
<
1
2
log
√
3
7
is
Q.
Solve the following inequality:
log
3
x
+
log
√
3
x
+
log
1
/
3
x
<
6
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