Question
Given graph shows relation between position (X)→ time (t) Find the correct graph of velocity→ time
The correct answer is: ![](data:image/png;base64,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)
Related Questions to study
Here are displacement → time graphs of particle A and B .if VA and VB are velocities of the particles respectively, then
=……
Here are displacement → time graphs of particle A and B .if VA and VB are velocities of the particles respectively, then
=……
Given graph shows relation between position and time. Find correct graph of acceleration → time
![](data:image/png;base64,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)
Given graph shows relation between position and time. Find correct graph of acceleration → time
![](data:image/png;base64,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)
Of the following species, the one having planar structure is
Of the following species, the one having planar structure is
Strongest bond is formed by the head on overlapping of :
Strongest bond is formed by the head on overlapping of :
Molecule which contains only sigma bonds in it is
Molecule which contains only sigma bonds in it is
Dipolemoment is not zero for
Dipolemoment is not zero for
Which of the following bond has the most polar character
Which of the following bond has the most polar character
Covalent nature of a compound increases with
Covalent nature of a compound increases with
Melting point is very high for
Melting point is very high for
The number of ways can 7 boys be seated at a round table so that 2 particular boys are separated is :
When n distinct objects are arranged in n places, then the total number of ways possible are n!. But, when n objects are to arranged in n places on a circular table, there are (n−1)!ways.
The number of ways can 7 boys be seated at a round table so that 2 particular boys are separated is :
When n distinct objects are arranged in n places, then the total number of ways possible are n!. But, when n objects are to arranged in n places on a circular table, there are (n−1)!ways.
Least ionic compound among the following is
Least ionic compound among the following is
Stability of ionic compound is influenced by
Stability of ionic compound is influenced by
The electronegativities of F,Cl,Br and I are 4.0,3.0,2.8,2.5 respectively. The hydrogen halide with a high percentage of ionic character is
The electronegativities of F,Cl,Br and I are 4.0,3.0,2.8,2.5 respectively. The hydrogen halide with a high percentage of ionic character is
The eccentricity of the hyperbola with asymptotes 3x + 4y = 2 and 4x – 3y = 2 is
The eccentricity of the hyperbola with asymptotes 3x + 4y = 2 and 4x – 3y = 2 is
The number of ways that '6' rings can be worn on the 4 - fingers of one hand is
It is important to note that we have used a basic fundamental principle of counting to find the total ways. Also, it is important to notice that each ring has 4 ways as it has not been given that each finger must have at least one ring. So, there can be 6 rings in a finger alone and remaining all the fingers empty.
The number of ways that '6' rings can be worn on the 4 - fingers of one hand is
It is important to note that we have used a basic fundamental principle of counting to find the total ways. Also, it is important to notice that each ring has 4 ways as it has not been given that each finger must have at least one ring. So, there can be 6 rings in a finger alone and remaining all the fingers empty.