Question
A rod AB of mass , length Lis lying on a horizontal frictionless surface. A particle of mass m travelling along the surface hits the end A of the rod with a velocity
in a direction perpendicular to AB. The collision is completely elastic. After the collision, the Particle comes to rest. The ratio
is
The correct answer is: ![fraction numerator omega squared straight L squared over denominator 9 straight v subscript 0 superscript 2 end fraction](data:image/png;base64,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)
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, vapour density d of the gaseous mixture was measured. If D is the theoretical value of vapour density, variation of x with D/d by the graph which is the value of D/d at point A
![](data:image/png;base64,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)
Before equilibrium is set-up for the chemical reaction,
, vapour density d of the gaseous mixture was measured. If D is the theoretical value of vapour density, variation of x with D/d by the graph which is the value of D/d at point A
![](data:image/png;base64,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)
In the Dissociation of
x varies with
according to
In the Dissociation of
x varies with
according to
A one kilowatt motor is used to pump water from a well 10 m deep. The quantity of water pumped out per second is nearly
A one kilowatt motor is used to pump water from a well 10 m deep. The quantity of water pumped out per second is nearly
Eight different letters of an alphabet are given. Words of four letters from these are formed. The number of such words with at least one letter repeated is
Eight different letters of an alphabet are given. Words of four letters from these are formed. The number of such words with at least one letter repeated is
The number of 4 letter words that can be formed using the letters of the word EXPLAIN which begin with a vowel when repetitions are allowed is
The number of 4 letter words that can be formed using the letters of the word EXPLAIN which begin with a vowel when repetitions are allowed is
Which of the following statements is wrong?
Which of the following statements is wrong?