Chemistry-
General
Easy
Question
The work done by a weightless piston in causing an expansion ΔV(at constant temperature),when the opposing pressure P is variable, is given by
- W=–ΔPΔV
- W=0
- W=–PΔV
- None
The correct answer is: W=–ΔPΔV
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Foranadiabaticprocesswhichofthefollowing relationsiscorrect-
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chemistry-General
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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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)
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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)
physicsGeneral
physics
Amount of heat required to raise the temperature of a body through 1K is called its
Amount of heat required to raise the temperature of a body through 1K is called its
physicsGeneral
physics
In a resonance tube experiment, the first resonance is obtained for 10 cm of air column and the second for 32 cm The end correction for this apparatus is equal to
In a resonance tube experiment, the first resonance is obtained for 10 cm of air column and the second for 32 cm The end correction for this apparatus is equal to
physicsGeneral
physics
An air column in a pipe, which is closed at one end will be in resonance with a vibrating tuning fork of frequency 264 Hz, What is the length of the column if it is in cm ? (speed of sound in air =330m/s)
An air column in a pipe, which is closed at one end will be in resonance with a vibrating tuning fork of frequency 264 Hz, What is the length of the column if it is in cm ? (speed of sound in air =330m/s)
physicsGeneral
physics
A hollow pipe of length 0.8 m is closed at one cad At its open and a 0 5 m long uniform string is vibrating in its second harmonic and it rosonates with the fundamentals frequency of the pipe if the tension in the wire is 50 N and the speed of sound is
, what is the mass of the string
A hollow pipe of length 0.8 m is closed at one cad At its open and a 0 5 m long uniform string is vibrating in its second harmonic and it rosonates with the fundamentals frequency of the pipe if the tension in the wire is 50 N and the speed of sound is
, what is the mass of the string
physicsGeneral
physics
A tuning fork of 512 Hz is used to produce resonance in a resonance tube experiment The level of water at first resonance is 307 cm and at second resonance is 63 2 cm What is the error in calculating velocity of sound ? Asume the speed of sound 330 m/s
A tuning fork of 512 Hz is used to produce resonance in a resonance tube experiment The level of water at first resonance is 307 cm and at second resonance is 63 2 cm What is the error in calculating velocity of sound ? Asume the speed of sound 330 m/s
physicsGeneral
physics
An open pipe is in resonance in
harmonic with frequency
Now one end of the tube is closed and frequency is increased to
such that the resonance again occurs in harmonic Choose the correct option
An open pipe is in resonance in
harmonic with frequency
Now one end of the tube is closed and frequency is increased to
such that the resonance again occurs in harmonic Choose the correct option
physicsGeneral
physics
A closed organ pipe of length L and an open organ pipe contain gases of densities
and
respectively The compressibility of gases are equal in both the pipes Both the pipes are vibrating in their first overtone with same frequency What is the length of the open organ pipe?
A closed organ pipe of length L and an open organ pipe contain gases of densities
and
respectively The compressibility of gases are equal in both the pipes Both the pipes are vibrating in their first overtone with same frequency What is the length of the open organ pipe?
physicsGeneral
physics
Two vibrating strings of the same material but of lengths Land 2L have radii 2r and r respectively They arestretched under the sarme tension Both the string vibrate in their fundamental modes Theone of length L with frequency
and the other with frequency
what is the ratio
?
Two vibrating strings of the same material but of lengths Land 2L have radii 2r and r respectively They arestretched under the sarme tension Both the string vibrate in their fundamental modes Theone of length L with frequency
and the other with frequency
what is the ratio
?
physicsGeneral
physics
An open pipe is suddenly closed at one end with the result that the frequency of third harmonic of the closed pipe is found to be higher by 100 Hz than the fundamental frequency of the open pipe What is the fundamental frequency of the open pipe?
An open pipe is suddenly closed at one end with the result that the frequency of third harmonic of the closed pipe is found to be higher by 100 Hz than the fundamental frequency of the open pipe What is the fundamental frequency of the open pipe?
physicsGeneral
physics
A tube, closed at one end and containing air, produces, when excited, the fundamental note of frequency 512Hz If the tube is opened at both ends what is the fundamental freuency that can be excited (in Hz )?
A tube, closed at one end and containing air, produces, when excited, the fundamental note of frequency 512Hz If the tube is opened at both ends what is the fundamental freuency that can be excited (in Hz )?
physicsGeneral
physics
A sphere, a cube and a thin circular plate are all made of the same material, have the same mass and are initially heated to a temperature of
Arrange then in the ascending order of rate of cooling
A sphere, a cube and a thin circular plate are all made of the same material, have the same mass and are initially heated to a temperature of
Arrange then in the ascending order of rate of cooling
physicsGeneral
physics
t is the units of emissive power in Stefan’s law ?
t is the units of emissive power in Stefan’s law ?
physicsGeneral
physics
A body cools in 5 minute from
to
. The termperature of the surroundings is
. What is its temperature after the next 5 minute?
A body cools in 5 minute from
to
. The termperature of the surroundings is
. What is its temperature after the next 5 minute?
physicsGeneral