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Byju's Answer
Standard XII
Mathematics
General Solution of Trigonometric Equation
The number of...
Question
The number of solutions of
sin
(
π
x
2
√
3
)
=
x
2
−
2
√
3
x
+
4
is
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Solution
sin
(
π
x
2
√
3
)
=
x
2
−
2
√
3
x
+
4
⇒
sin
(
π
x
2
√
3
)
=
x
2
−
2
√
3
x
+
(
√
3
)
2
+
1
⇒
sin
(
π
x
2
√
3
)
=
(
x
−
√
3
)
2
+
1
L.H.S.
≤
1
and
R.H.S.
≥
1
So, solution exist only when
L.H.S.
=
R.H.S.
=
1
⇒
R.H.S.
=
1
⇒
(
x
−
√
3
)
2
+
1
=
1
⇒
x
=
√
3
At
x
=
√
3
,
L.H.S.
=
sin
(
π
√
3
2
√
3
)
=
1
Therefore,
x
=
√
3
is the only solution.
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0
Similar questions
Q.
The number of solutions of
sin
(
π
x
2
√
3
)
=
x
2
−
2
√
3
x
+
4
is
Q.
The number of solutions of the equation
sin
(
π
x
2
√
3
)
=
x
2
−
2
√
3
x
+
4
Q.
The number of solutions of the equation
sin
(
π
x
2
√
3
)
=
x
2
−
2
√
3
x
+
4
Q.
The number of solutions of the equation
(
π
x
2
√
3
)
=
x
2
−
2
√
3
x
+
4
is
Q.
Assertion :
s
i
n
(
π
x
2
√
3
)
=
x
2
−
2
√
3
x
+
4
has only one solution Reason: The smallest positive value of x in degrees, for which
t
a
n
(
x
+
100
o
)
=
t
a
n
(
x
+
50
o
)
t
a
n
x
t
a
n
(
x
−
50
o
)
is
30
o
.
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General Solution of Trigonometric Equation
Standard XII Mathematics
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