Chemistry-
General
Easy
Question
How many stereo isomers are there in this compound ?
![](data:image/png;base64,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)
- 4
- 6
- 9
- 8
The correct answer is: 8
Related Questions to study
chemistry-
Which of the following structures are chiral ?
![](data:image/png;base64,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)
Which of the following structures are chiral ?
![](data:image/png;base64,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)
chemistry-General
chemistry-
can show
can show
chemistry-General
chemistry-
The structures given below are
![](data:image/png;base64,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)
The structures given below are
![](data:image/png;base64,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)
chemistry-General
chemistry-
How many stereoisomers can be obtained by catalytic hydrogenation of both double bonds in the following compound
![](data:image/png;base64,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)
How many stereoisomers can be obtained by catalytic hydrogenation of both double bonds in the following compound
![](data:image/png;base64,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)
chemistry-General
chemistry-
The two compounds shown in the figure below are
![](data:image/png;base64,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)
The two compounds shown in the figure below are
![](data:image/png;base64,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)
chemistry-General
physics
The mass of a space ship is 1000 kg It is to be lauched from earth's surface out into free space the value of g and R (radius of earth) are 10ms-2 and 6400km respectively the required energy for this work will be
The mass of a space ship is 1000 kg It is to be lauched from earth's surface out into free space the value of g and R (radius of earth) are 10ms-2 and 6400km respectively the required energy for this work will be
physicsGeneral
chemistry-
The pair of structures given below represent
![](data:image/png;base64,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)
The pair of structures given below represent
![](data:image/png;base64,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)
chemistry-General
physics
The mass and radius of the sun are 1.99
kg and R=6.96
m . The escape velocity of rocket from the sun is=...km/sec
The mass and radius of the sun are 1.99
kg and R=6.96
m . The escape velocity of rocket from the sun is=...km/sec
physicsGeneral
chemistry-
Which of the following is the enantiomer of the structure ?
![](data:image/png;base64,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)
Which of the following is the enantiomer of the structure ?
![](data:image/png;base64,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)
chemistry-General
physics
A particle of mass M is situated at the center of a spherical shell of same mass and radius a the magnitude of gravitational potential at a point situated at a / 2 distance from the center will be
A particle of mass M is situated at the center of a spherical shell of same mass and radius a the magnitude of gravitational potential at a point situated at a / 2 distance from the center will be
physicsGeneral
physics
A particle of mass 10g is kept on the surface of a uniform sphere of mass 100 kg and radius 10 cm Find the work to be done aginst the gravitational force between them to take the particle is away from the sphere (G=6.67
SI unit)
A particle of mass 10g is kept on the surface of a uniform sphere of mass 100 kg and radius 10 cm Find the work to be done aginst the gravitational force between them to take the particle is away from the sphere (G=6.67
SI unit)
physicsGeneral
maths-
If, in a right angled triangle
, the hypo AB=P then ![stack A B with minus on top times stack A C with minus on top plus stack B C with minus on top times stack B A with minus on top plus stack C A with minus on top times stack C B with minus on top equals](data:image/png;base64,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)
If, in a right angled triangle
, the hypo AB=P then ![stack A B with minus on top times stack A C with minus on top plus stack B C with minus on top times stack B A with minus on top plus stack C A with minus on top times stack C B with minus on top equals](data:image/png;base64,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)
maths-General
chemistry-
given
given
chemistry-General
chemistry-
The molecule represented by Newmann projection "![](data:image/png;base64,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)
The molecule represented by Newmann projection "![](data:image/png;base64,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)
chemistry-General
physics
The acceleration due to gravity on a plant is same as that on earth and its radius is four times that of earth. What will be the value of escape velocity on that planet if it is Ve on the earth
The acceleration due to gravity on a plant is same as that on earth and its radius is four times that of earth. What will be the value of escape velocity on that planet if it is Ve on the earth
physicsGeneral