Chemistry-
General
Easy
Question
Forareaction25°Centhalpychange(ΔH)and entropy change(ΔS)are–11.7×103Jmol–1and –105JMol–1K–1 respectively. There action is-
- Spontaneous
- Nonspontaneous
- Atequilibrium
- Can’tsayanything
The correct answer is: Nonspontaneous
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Agasis allowed to expand under reversible adiababatic conditions what is zerofor such a process-
Agasis allowed to expand under reversible adiababatic conditions what is zerofor such a process-
chemistry-General
physics
A wire is in the form of a tetrahedron shown in figure. The resistance of each wire is r. What is the resistance of he frame between the comers A and B.
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)
A wire is in the form of a tetrahedron shown in figure. The resistance of each wire is r. What is the resistance of he frame between the comers A and B.
![](data:image/png;base64,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)
physicsGeneral
chemistry-
Calculate enthalpy of vapourization per mole of ethanol. Given ΔS=109.8JK–1mol–1andB.pt.of
ethanolis78.5°C.
Calculate enthalpy of vapourization per mole of ethanol. Given ΔS=109.8JK–1mol–1andB.pt.of
ethanolis78.5°C.
chemistry-General
chemistry-
The enthalpy of vaporisation of per mole of ethanol (b.p.=79.5°CandS=109.8JK–1mol–1)is-
The enthalpy of vaporisation of per mole of ethanol (b.p.=79.5°CandS=109.8JK–1mol–1)is-
chemistry-General
physics
In the above question, after appropriate conditions are made, it is found that no deflection takes places in the galvanometer where the sliding jockey touches the wire at a distance of from . What is the value of the resistance X?
In the above question, after appropriate conditions are made, it is found that no deflection takes places in the galvanometer where the sliding jockey touches the wire at a distance of from . What is the value of the resistance X?
physicsGeneral
physics
A thin uniform wire AB of length 1 m, an unknown resistance X and a resistance of
are connected, by thick conducting strips as shown in figure. A battery and a galvanometer (with a sliding jockey connected to it) are also available. Connections are to be measure the unknown resistance using the principle of Wheatstone bridge. The appropriate connections are.
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)
(E is the balance point for whetstone bridge)
A thin uniform wire AB of length 1 m, an unknown resistance X and a resistance of
are connected, by thick conducting strips as shown in figure. A battery and a galvanometer (with a sliding jockey connected to it) are also available. Connections are to be measure the unknown resistance using the principle of Wheatstone bridge. The appropriate connections are.
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)
(E is the balance point for whetstone bridge)
physicsGeneral
physics
Two liquids of equal volume are thoroughly mixed. If their specific heat are
, temperatures
and densities
respectively. What is the final temperature of the rrixture?
Two liquids of equal volume are thoroughly mixed. If their specific heat are
, temperatures
and densities
respectively. What is the final temperature of the rrixture?
physicsGeneral
chemistry-
For which reaction from the following,ΔSwill be maximum?
For which reaction from the following,ΔSwill be maximum?
chemistry-General
chemistry-
Onheating128gofoxygengasfrom0°Cto100°C,CV and CP on an average are 5 and7calmol degree the value of ΔE and ΔH are respectively-
Onheating128gofoxygengasfrom0°Cto100°C,CV and CP on an average are 5 and7calmol degree the value of ΔE and ΔH are respectively-
chemistry-General
chemistry-
Forareaction2X(s)+2Y(s)→2C(
)+D(g) The q at27°Cis–28KCal.mol–1. The qv is.......... K. Cal. mol–1
Forareaction2X(s)+2Y(s)→2C(
)+D(g) The q at27°Cis–28KCal.mol–1. The qv is.......... K. Cal. mol–1
chemistry-General
chemistry-
For which of the following reactions ΔH is less than ΔE-
For which of the following reactions ΔH is less than ΔE-
chemistry-General
chemistry-
For which change ΔH≠ΔE–
For which change ΔH≠ΔE–
chemistry-General
chemistry-
Which is true for the combustion of sucrose (C12H22O11)at25°C-
Which is true for the combustion of sucrose (C12H22O11)at25°C-
chemistry-General
physics
The temperature of equal mases of three different liquids X,Y, zare
and
respectively The temperature when X and Y aremixed is
and when Y and Z are mixed is
what is the temperature when X and Z are mixed?
The temperature of equal mases of three different liquids X,Y, zare
and
respectively The temperature when X and Y aremixed is
and when Y and Z are mixed is
what is the temperature when X and Z are mixed?
physicsGeneral
physics
For which value of the temperature will the values of Fahrenheit scale and Kelvin scale be equal?
For which value of the temperature will the values of Fahrenheit scale and Kelvin scale be equal?
physicsGeneral