Chemistry-
General
Easy
Question
Which of the following compounds react with aniline to give acetanilide : Which of the following compounds react with aniline to give acetanilide
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)
- CH3CHO
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/484984/1/3431545/Picture258.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/484984/1/3431547/Picture259.png)
The correct answer is: ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/484984/1/3431545/Picture258.png)
Related Questions to study
chemistry-
Consider the following reaction
![](data:image/png;base64,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)
Consider the following reaction
![](data:image/png;base64,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)
chemistry-General
chemistry-
In this reaction the product (E) is :
In this reaction the product (E) is :
chemistry-General
chemistry-
The value of ΔHforthecombustionofC(s)is –94.4Kcal.TheheatofformationofCO2(g)is-
The value of ΔHforthecombustionofC(s)is –94.4Kcal.TheheatofformationofCO2(g)is-
chemistry-General
chemistry-
The following are the heats of reactions-
i)ΔHOofHO(l)=–68.3Kcalmol–1
ii)ΔHO comb ofC2H4 =–337.2Kcalmol–1
iii) ΔHO comb ofC2H4 =–363.7Kcalmol–1Then heat change for the reaction
C2H2+H2→C2H4is-</span
The following are the heats of reactions-
i)ΔHOofHO(l)=–68.3Kcalmol–1
ii)ΔHO comb ofC2H4 =–337.2Kcalmol–1
iii) ΔHO comb ofC2H4 =–363.7Kcalmol–1Then heat change for the reaction
C2H2+H2→C2H4is-</span
chemistry-General
chemistry-
Theheatevolvedduringthecombustionof112litre of water gas(mixtureofequalvolumeofH2andCO)
is: Given
H2(g)+1/2O2(g)=H2O(g);ΔH=–241.8KJ
CO(g)+1/2O2(g)=CO2(g);ΔH=–283KJ</span
Theheatevolvedduringthecombustionof112litre of water gas(mixtureofequalvolumeofH2andCO)
is: Given
H2(g)+1/2O2(g)=H2O(g);ΔH=–241.8KJ
CO(g)+1/2O2(g)=CO2(g);ΔH=–283KJ</span
chemistry-General
physics
What is the relation between figure of merit (K) and current sensitivity
?
What is the relation between figure of merit (K) and current sensitivity
?
physicsGeneral
chemistry-
For the reaction,
i)H2(g)+Cl2(g)→2HCl(g)+xKJ
ii)H2(g)+Cl2(g)→2HCl(
)+Ykj Which one of the following statementis correct:
For the reaction,
i)H2(g)+Cl2(g)→2HCl(g)+xKJ
ii)H2(g)+Cl2(g)→2HCl(
)+Ykj Which one of the following statementis correct:
chemistry-General
chemistry-
Heatofformation,ΔHOofanexplosivecompound likeNCl3is-</span
Heatofformation,ΔHOofanexplosivecompound likeNCl3is-</span
chemistry-General
chemistry-
A reaction A+B→ C+D+q is found to have a positive entropy change, there action will be–
A reaction A+B→ C+D+q is found to have a positive entropy change, there action will be–
chemistry-General
chemistry-
What is the sign of ΔGfortheprocessoficemelting at283K?
What is the sign of ΔGfortheprocessoficemelting at283K?
chemistry-General
chemistry-
At acertain temperature T, the end other micreaction A→B proceed salmost to completion. The entropy change is-
At acertain temperature T, the end other micreaction A→B proceed salmost to completion. The entropy change is-
chemistry-General
physics
An ammeter of range 5 A is to be converted into an ammeter of range 10 V If the resistance of anmeter be ,then what resistance should be connected in series with it?
An ammeter of range 5 A is to be converted into an ammeter of range 10 V If the resistance of anmeter be ,then what resistance should be connected in series with it?
physicsGeneral
chemistry-
In the above sequence A & B respectively are –
In the above sequence A & B respectively are –
chemistry-General
chemistry-
In a set of the given reactions, acetic acid yielded a product C.
product C would be:-
In a set of the given reactions, acetic acid yielded a product C.
product C would be:-
chemistry-General
chemistry-
Forareaction2X(s)+2Y(s)→2C(
)+D(g)Theqp at27°Cis–28Kcal.mol–1 The qv is..........K.Cal. mol–1
Forareaction2X(s)+2Y(s)→2C(
)+D(g)Theqp at27°Cis–28Kcal.mol–1 The qv is..........K.Cal. mol–1
chemistry-General