Maths-
General
Easy
Question
If f(x) is a differentiable function satisfying f(x+ y)= f(x)f(y)
x, y
R and f'(0)=2 then f(x)=
- e2x
- 2ex
- –e2x
- –2ex
The correct answer is: e2x
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![](data:image/png;base64,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)
Water and turpentine oil (specific heat less than that of water) are both heated to same temperature. Equal amounts of these placed in identical calorimeters are then left in air
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physics-General
physics-
Variation of radiant energy emitted by sun, filament of tungsten lamp and welding are as a function of its wavelength is shown in figure. Which of the following option is the correct match?
![](data:image/png;base64,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)
Variation of radiant energy emitted by sun, filament of tungsten lamp and welding are as a function of its wavelength is shown in figure. Which of the following option is the correct match?
![](data:image/png;base64,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)
physics-General
physics-
Six identical metallic rods are joined together in a pattern as shown in the figure. Points A and D are maintained at temperature
and
. The temperature of the junction
will be
![](data:image/png;base64,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)
Six identical metallic rods are joined together in a pattern as shown in the figure. Points A and D are maintained at temperature
and
. The temperature of the junction
will be
![](data:image/png;base64,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)
physics-General
physics-
Which curve shows the rise of temperature with the amount of heat supplied, for a piece of ice?
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)
Which curve shows the rise of temperature with the amount of heat supplied, for a piece of ice?
![](data:image/png;base64,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)
physics-General