Question
The reaction given is
Aldol condensation
Knovengel reaction
Cannizaro reaction
None of these
Aldol condensation
Knovengel reaction
Cannizaro reaction
None of these
The correct answer is: Cannizaro reaction
Related Questions to study
Two identical metal plates are given positive charges Q1 and Q2 (< Q1 ) respectively. If they are now brought close together to form a parallel plate capacitor with capacitance C, the potential difference between them is
Two identical metal plates are given positive charges Q1 and Q2 (< Q1 ) respectively. If they are now brought close together to form a parallel plate capacitor with capacitance C, the potential difference between them is
The reactant (X) in the reaction, (X) Cinnamic acid is
The reactant (X) in the reaction, (X) Cinnamic acid is
Z is identified as
Z is identified as
Consider the following reaction
, What is Y ?
Consider the following reaction
, What is Y ?
When does the current flow through the following circuit
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)
When does the current flow through the following circuit
![](data:image/png;base64,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)
Four plates of equal area A are separated by equal distance d and are arranged as shown in the figure. The equivalent capacity is
Four plates of equal area A are separated by equal distance d and are arranged as shown in the figure. The equivalent capacity is
'D' is :
'D' is :
![](data:image/png;base64,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)
The products of above sequence of reactions are
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The products of above sequence of reactions are
The correct set of the products obtained in the following reactions is
a)
b)
c)
d)
The correct set of the products obtained in the following reactions is
a)
b)
c)
d)
A sphere of radius r is charged to a potential V. The outward pull per unit area of its surface is given by
A sphere of radius r is charged to a potential V. The outward pull per unit area of its surface is given by
Aniline is not the major product in one of the following reactions. Identify that reaction.
Aniline is not the major product in one of the following reactions. Identify that reaction.
The reaction, is called:
The reaction, is called:
If area of each plate is A and the successive separations are d, 2d and 3d then the equivalent capacitance across A and B is
If area of each plate is A and the successive separations are d, 2d and 3d then the equivalent capacitance across A and B is
Two plates, each of area A, are placed parallel to each other at a distance d. One plate is connected to a battery of e.m.f. E and its negative is earthed. The other plate is also earthed.
The charge drawn by plate is
Two plates, each of area A, are placed parallel to each other at a distance d. One plate is connected to a battery of e.m.f. E and its negative is earthed. The other plate is also earthed.
The charge drawn by plate is
Two identical capacitors have the same capacitance C. One of them is charged to potential and the other to
. The negative ends of the capacitors are connected together. When the positive ends are also connected, the decrease in energy of the system is
Two identical capacitors have the same capacitance C. One of them is charged to potential and the other to
. The negative ends of the capacitors are connected together. When the positive ends are also connected, the decrease in energy of the system is