Chemistry-
General
Easy
Question
The two compounds shown in the figure below are
![](data:image/png;base64,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)
- Diastereomers
- Enantiomers
- Epimers
- Regiomers
The correct answer is: Enantiomers
Related Questions to study
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
chemistry-
The possible monochlorinated products of Methyl-cyclohexane is![](data:image/png;base64,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)
The possible monochlorinated products of Methyl-cyclohexane is![](data:image/png;base64,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)
chemistry-General
chemistry-
The binapthol (Bnp) is.–
![](data:image/png;base64,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)
The binapthol (Bnp) is.–
![](data:image/png;base64,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)
chemistry-General
chemistry-
In reaction ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485263/1/892629/Picture226.png)
X + Y Which of the following is incorrect about the reaction ?
In reaction ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485263/1/892629/Picture226.png)
X + Y Which of the following is incorrect about the reaction ?
chemistry-General
physics
The escape velocity for a body projected vertically upwards from the surface of earth is 11kms-1. If the body is projected at an angle of 456 with the vertical, the escape velocity will be
The escape velocity for a body projected vertically upwards from the surface of earth is 11kms-1. If the body is projected at an angle of 456 with the vertical, the escape velocity will be
physicsGeneral
chemistry-
Which of the following pair will not produce dihydrogen gas
Which of the following pair will not produce dihydrogen gas
chemistry-General