Physics
General
Easy
Question
Which of the following graphs is the magnifications of a real image against the distance from the focus of a concave mirror?
The correct answer is: ![](data:image/png;base64,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)
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are shown below :What is its resistance across
?
![](data:image/png;base64,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)
The dimensions of a conductor of specific resistance
are shown below :What is its resistance across
?
![](data:image/png;base64,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)
physics-General
physics-
For the electrical circuit shown in the figure, the potential difference across the resistor of 400
as will be measured by the voltmeter
of resistance 400 is…..
![](data:image/png;base64,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)
For the electrical circuit shown in the figure, the potential difference across the resistor of 400
as will be measured by the voltmeter
of resistance 400 is…..
![](data:image/png;base64,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)
physics-General
physics
A convex lens of focal length f produces a real image x times the size of an object, Then what is the, distance of the object fromthe lens?
A convex lens of focal length f produces a real image x times the size of an object, Then what is the, distance of the object fromthe lens?
physicsGeneral
physics-
Which the substances A,B or
has the highest specific heat in The temperature Vs time graph is shown.
![](data:image/png;base64,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)
Which the substances A,B or
has the highest specific heat in The temperature Vs time graph is shown.
![](data:image/png;base64,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)
physics-General
physics-
The graph shows the variation of temperature (T) of one kilogram of a material with the heat (H) supplied to it, At O, the substance is in the solid state. From the graph, we can conclude that...
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)
The graph shows the variation of temperature (T) of one kilogram of a material with the heat (H) supplied to it, At O, the substance is in the solid state. From the graph, we can conclude that...
![](data:image/png;base64,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)
physics-General
Physics-
The graph AB shown in figure is a plot of temperature of body in degree Celsius and degree Fahrenheit, Then.
![](data:image/png;base64,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)
The graph AB shown in figure is a plot of temperature of body in degree Celsius and degree Fahrenheit, Then.
![](data:image/png;base64,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)
Physics-General
physics
A convex kens of focal length f is placed somewhere in between an object and a screen. The distance between the object and the screen is x. If the numerical value of the magnification product by the lens is m , What is the focal length of the lens?
A convex kens of focal length f is placed somewhere in between an object and a screen. The distance between the object and the screen is x. If the numerical value of the magnification product by the lens is m , What is the focal length of the lens?
physicsGeneral
physics
A concave lens of focal length f forms an image which is times the size of the object What is the distance of the object from the lents?
A concave lens of focal length f forms an image which is times the size of the object What is the distance of the object from the lents?
physicsGeneral
chemistry-
ΔH for the reaction,
will be -
ΔH for the reaction,
will be -
chemistry-General
physics
One microammeter has a resistance of 100Ω and a full scale range of 50
It can be used as a woltmeter or as a higher range ammeter provided a resistance is added to it Pick the correct range and resistance combinations (s)
One microammeter has a resistance of 100Ω and a full scale range of 50
It can be used as a woltmeter or as a higher range ammeter provided a resistance is added to it Pick the correct range and resistance combinations (s)
physicsGeneral
chemistry-
If ΔG°>0forareactionthen-
If ΔG°>0forareactionthen-
chemistry-General
chemistry-
Statement-I : Benzoic acid on nitration will give m– Nitro benzoic acid
Statement-II : –COOH group will increase e— density on meta position
Statement-I : Benzoic acid on nitration will give m– Nitro benzoic acid
Statement-II : –COOH group will increase e— density on meta position
chemistry-General
chemistry-
Which of the following reagents are involved in the following transformation?
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)
Which of the following reagents are involved in the following transformation?
![](data:image/png;base64,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)
chemistry-General