Physics
General
Easy
Question
Which of the following graphs represents the motion of a planet moving about the sun.
The correct answer is: ![](data:image/png;base64,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)
Related Questions to study
chemistry-
The configuration of 1 and 2 carbon atom in the following compounds is –
![](data:image/png;base64,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)
The configuration of 1 and 2 carbon atom in the following compounds is –
![](data:image/png;base64,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)
chemistry-General
physics
Which one of the following graphs represents correctly the variation of the gravitational field with the distance (r) from the center of spherical shell of mass and radius
Which one of the following graphs represents correctly the variation of the gravitational field with the distance (r) from the center of spherical shell of mass and radius
physicsGeneral
chemistry-
Which of the following is the enantiomer of the structure ?
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)
Which of the following is the enantiomer of the structure ?
![](data:image/png;base64,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)
chemistry-General
Chemistry-
The compound whose stereo- chemical formula is written below exhibits ‘x’ geometrical isomers and ‘y’ optical isomers :
The value of x and y are :
The compound whose stereo- chemical formula is written below exhibits ‘x’ geometrical isomers and ‘y’ optical isomers :
The value of x and y are :
Chemistry-General
chemistry-
The correct statements about the compounds a, b and c is/are
![](data:image/png;base64,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)
The correct statements about the compounds a, b and c is/are
![](data:image/png;base64,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)
chemistry-General
physics
A sphere of mass M and Radius R2 has a concentric cavity of Radius R1 as shown in figure. The force F exerted by the shpere on a particle of mass located at a distance r from the center of shhere varies as ![left parenthesis O less or equal than r less or equal than x right parenthesis](data:image/png;base64,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)
![](data:image/png;base64,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)
A sphere of mass M and Radius R2 has a concentric cavity of Radius R1 as shown in figure. The force F exerted by the shpere on a particle of mass located at a distance r from the center of shhere varies as ![left parenthesis O less or equal than r less or equal than x right parenthesis](data:image/png;base64,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)
![](data:image/png;base64,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)
physicsGeneral
physics
Assuming the earth to have a constant density, point out which of following curves show the variation acceleration due to gravity from center of earth to points far away from the surface of earth……
Assuming the earth to have a constant density, point out which of following curves show the variation acceleration due to gravity from center of earth to points far away from the surface of earth……
physicsGeneral
physics
The diagram showing the variation of gravitational potential of earth with distance from the center of earth is.
The diagram showing the variation of gravitational potential of earth with distance from the center of earth is.
physicsGeneral
chemistry-
Which of the following intermediate species is/are formed in the reaction of
(Acrylic acid) with HBr to give 3-bromo propanoic acid ?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485238/1/892778/Picture434.png)
Which of the following intermediate species is/are formed in the reaction of
(Acrylic acid) with HBr to give 3-bromo propanoic acid ?
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485238/1/892778/Picture434.png)
chemistry-General
chemistry-
The following compound can exhibits :
![](data:image/png;base64,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)
The following compound can exhibits :
![](data:image/png;base64,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)
chemistry-General
chemistry-
In the given conformation
is rotated about
bond anticlockwise by an angle of
then the conformation obtained is:
![](data:image/png;base64,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)
In the given conformation
is rotated about
bond anticlockwise by an angle of
then the conformation obtained is:
![](data:image/png;base64,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)
chemistry-General
chemistry-
How many stereo isomers are there in this compound ?
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)
How many stereo isomers are there in this compound ?
![](data:image/png;base64,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)
chemistry-General
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