Chemistry-
General
Easy
Question
Which statement is incorrrect?
- Salol is used as antiseptic
- Tincture of iodine is 2-3% solution of iodoform in alcohol-water
- Thiourea and benzenethiol can be separated by water
- Aspartame is used as sweetening agent in cold drinks
The correct answer is: Tincture of iodine is 2-3% solution of iodoform in alcohol-water
Related Questions to study
chemistry-
Decreasing order of boiling point of I to IV follow:
![](data:image/png;base64,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)
Decreasing order of boiling point of I to IV follow:
![](data:image/png;base64,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)
chemistry-General
chemistry-
Azulene
has dipole moment 0.8 D because
Azulene
has dipole moment 0.8 D because
chemistry-General
chemistry-
can be differentiated by
can be differentiated by
chemistry-General
chemistry-
The order in which the reagent must be used to separate the compound I - IV is
![](data:image/png;base64,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)
The order in which the reagent must be used to separate the compound I - IV is
![](data:image/png;base64,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)
chemistry-General
chemistry-
can be differentiated by:
can be differentiated by:
chemistry-General
physics-
Find the size of image formed in the situation shown in figure.
![](data:image/png;base64,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)
Find the size of image formed in the situation shown in figure.
![](data:image/png;base64,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)
physics-General
physics-
Locate the image of the point object O in the situation shown in figure. The point C denotes the centre of curvature of the separating surface
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)
Locate the image of the point object O in the situation shown in figure. The point C denotes the centre of curvature of the separating surface
![](data:image/png;base64,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)
physics-General
Maths-
An ellipse has the point
and
as its foci and
as one of its tangent then the coordinate of the point where this line touches the ellipse are
So, the point of contact of tangent to ellipse is .
An ellipse has the point
and
as its foci and
as one of its tangent then the coordinate of the point where this line touches the ellipse are
Maths-General
So, the point of contact of tangent to ellipse is .
maths-
The arrangement of the ellipses in ascending order of their eccentricities when
is given, Where S &
are foci&
is one end of the minor axis A)
B)
C)
D) ![open floor S B S to the power of 1 end exponent close equals 9 0 to the power of 0 end exponent](data:image/png;base64,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)
The arrangement of the ellipses in ascending order of their eccentricities when
is given, Where S &
are foci&
is one end of the minor axis A)
B)
C)
D) ![open floor S B S to the power of 1 end exponent close equals 9 0 to the power of 0 end exponent](data:image/png;base64,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)
maths-General
maths-
oints o
llipse 3
where the normals to it are perpendicular to
are
oints o
llipse 3
where the normals to it are perpendicular to
are
maths-General
maths-
is a greatest circle incribed in
and Greatest Ellipse
is incribed in c = 0 If the eccentricities of
are equal then the minor axis of
is
is a greatest circle incribed in
and Greatest Ellipse
is incribed in c = 0 If the eccentricities of
are equal then the minor axis of
is
maths-General
physics-
Two thin lenses of focal lengths 1 f and 2 f are in contact and coaxial. The combination is equivalent to a single lens of power
Two thin lenses of focal lengths 1 f and 2 f are in contact and coaxial. The combination is equivalent to a single lens of power
physics-General
chemistry-
Methanol and acetone can be separated by:
Methanol and acetone can be separated by:
chemistry-General
chemistry-
Decreasing order of solubility of following compounds is:
![](data:image/png;base64,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)
Decreasing order of solubility of following compounds is:
![](data:image/png;base64,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)
chemistry-General
chemistry-
Which of the following statement is correct about tropolone?
![](data:image/png;base64,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)
Which of the following statement is correct about tropolone?
![](data:image/png;base64,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)
chemistry-General