The distance covered by a body is found to be directly proportional to the square of time. Is the body moving with uniform velocity or uniform acceleration ? If the distance travelled be directly proportionalto time.
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Answer:
By the second equation of motion,
By the second equation of motion, s = ut + 1/2 at^2
By the second equation of motion, s = ut + 1/2 at^2S is directly proportional to the time only when there is no external force acting on it.
By the second equation of motion, s = ut + 1/2 at^2S is directly proportional to the time only when there is no external force acting on it. In the absence of external force, acceleration ‘a’ of the object becomes zero and the equation of motion becomes
By the second equation of motion, s = ut + 1/2 at^2S is directly proportional to the time only when there is no external force acting on it. In the absence of external force, acceleration ‘a’ of the object becomes zero and the equation of motion becomes s= ut
By the second equation of motion, s = ut + 1/2 at^2S is directly proportional to the time only when there is no external force acting on it. In the absence of external force, acceleration ‘a’ of the object becomes zero and the equation of motion becomes s= utSince acceleration is zero so speed ‘u’ of the object remains constant.
By the second equation of motion, s = ut + 1/2 at^2S is directly proportional to the time only when there is no external force acting on it. In the absence of external force, acceleration ‘a’ of the object becomes zero and the equation of motion becomes s= utSince acceleration is zero so speed ‘u’ of the object remains constant.Hence, it can be concluded that S is directly proportional to t.
Explanation:
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