Physics-
General
Easy
Question
Two forces, each numerically equal to 5 N, are acting as shown in the Fig. Then the resultant is–
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)
- 2. 5 N
- 5 N
N
- 10 N.
The correct answer is: 5 N
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Physics
The Figure shows the Position-time (x-1) graph of one dimensional motion of a body of mass 0.4 kg. The magnitude of each impulse is
![](data:image/png;base64,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)
The Figure shows the Position-time (x-1) graph of one dimensional motion of a body of mass 0.4 kg. The magnitude of each impulse is
![](data:image/png;base64,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)
PhysicsGeneral
physics
A Wagon weighing 1000 kg is moving with a velocity 50 km h1 on smooth horizental rails. A mass of 250 kg is copped into il. The velocity with which it moves now is
A Wagon weighing 1000 kg is moving with a velocity 50 km h1 on smooth horizental rails. A mass of 250 kg is copped into il. The velocity with which it moves now is
physicsGeneral
physics
Swimming is possible on account of
Swimming is possible on account of
physicsGeneral
physics
A cold soft drink is kept on the balance. When the cap is open, then the weight
A cold soft drink is kept on the balance. When the cap is open, then the weight
physicsGeneral
physics
A body of mass 5 kg s arts from the arigin with an initial velocity
. If a constant Force
acts on the body. the lime in which the y-component of the velocity becomes nero is
A body of mass 5 kg s arts from the arigin with an initial velocity
. If a constant Force
acts on the body. the lime in which the y-component of the velocity becomes nero is
physicsGeneral