Physics
General
Easy
Question
Assuming earth to be a sphere of a uniform density, what is value of gravitational acceleration. in mine 100 km below the earth surface .... ms-2
- 9.66
- 7.64
- 5.00
- 3.1
The correct answer is: 9.66
Related Questions to study
chemistry-
The two optical isomers given below are
![](data:image/png;base64,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)
The two optical isomers given below are
![](data:image/png;base64,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)
chemistry-General
chemistry-
Number of stereoisomers of the given compound
is -
Number of stereoisomers of the given compound
is -
chemistry-General
chemistry-
The given pair is
![](data:image/png;base64,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)
The given pair is
![](data:image/png;base64,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)
chemistry-General
physics
If the mass of earth is 80 times of that of a planet and diameter is double that of planet and 'g' on the earth is 9.8 ms2, then the value of ' g ' on that planet is ….
If the mass of earth is 80 times of that of a planet and diameter is double that of planet and 'g' on the earth is 9.8 ms2, then the value of ' g ' on that planet is ….
physicsGeneral
Maths-
If the relation between subnormal 'SN' and subtangent 'ST' at any point on the curve by is
then
For such questions, we should know the formulas of subnormal and subtangent.
If the relation between subnormal 'SN' and subtangent 'ST' at any point on the curve by is
then
Maths-General
For such questions, we should know the formulas of subnormal and subtangent.
physics
If the radius of earth is R then height 'h ' at which value of ' g' becomes one - fourth is
If the radius of earth is R then height 'h ' at which value of ' g' becomes one - fourth is
physicsGeneral
physics
An object weights 72 N on the earth. Its weight at a height R/2 from earth is ……N
An object weights 72 N on the earth. Its weight at a height R/2 from earth is ……N
physicsGeneral
physics
If mass of a body is M on the earth surface, than the mass of the same body on the moont surfae is
If mass of a body is M on the earth surface, than the mass of the same body on the moont surfae is
physicsGeneral
physics
If the density of small planet is that of the same as that of the earth while the radius of the planet is 0.2 times that of lhe earth, the gravitational acceleration on the surface of the planet is……
If the density of small planet is that of the same as that of the earth while the radius of the planet is 0.2 times that of lhe earth, the gravitational acceleration on the surface of the planet is……
physicsGeneral
physics
The depth of at which the value of acceleration due to gravity becomes 1/n the time the value of at the surface is (R= radius of earth)
The depth of at which the value of acceleration due to gravity becomes 1/n the time the value of at the surface is (R= radius of earth)
physicsGeneral
physics
The moon's radius is 1/4 that of earth and its mass is 1/80 times that of the earth. If g represents the acceleration due to gravity on the surface of earth, that on the surface of the moon is
The moon's radius is 1/4 that of earth and its mass is 1/80 times that of the earth. If g represents the acceleration due to gravity on the surface of earth, that on the surface of the moon is
physicsGeneral
Maths-
The length of the tangent of the curves
is
For such questions, we should know the properties of trignometric functions and their different formulas.
The length of the tangent of the curves
is
Maths-General
For such questions, we should know the properties of trignometric functions and their different formulas.
physics
If earth rotates faster than its present speed the weight of an object will.
If earth rotates faster than its present speed the weight of an object will.
physicsGeneral
physics
The value of g on be earth surface is 980 cm/
. Its value at a height of 64 km from the earth surface is....cm5-2
The value of g on be earth surface is 980 cm/
. Its value at a height of 64 km from the earth surface is....cm5-2
physicsGeneral
physics
A body weights 700 g wt on the surface of earth How much it weight on the surface of planet whose mass is 1/7 and radius is half that of the earth
A body weights 700 g wt on the surface of earth How much it weight on the surface of planet whose mass is 1/7 and radius is half that of the earth
physicsGeneral