The solution for this is that the area under the graph will be the maximum velocity. I am not be to understand why as the area under the graph gives change in velocity only.

Question

Shail patel · Answer

We know that velocity is the integration (antiderivative) of acceleration. In mathematics , an integral assigns number to functions in a way that can discribe displacement, area, volume, and other concepts that arise by combining infinitesimal data. A definate integral of a function can be represented as the signed area of the region bounded by its graph. As velocity is integration of acceleration therefore to find it we must calculate the area under the curve of its time Vs acceleration graph.

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The solution for this is that the area under the graph will be the maximum velocity. I am not be to understand why as the area under the graph gives change in velocity only.

The solution for this is that the area under the graph will be the maximum velocity. I am not be to understand why as the area under the graph gives change in velocity only.

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The solution for this is that the area under the graph will be the maximum velocity. I am not be to understand why as the area under the graph gives change in velocity only.

The solution for this is that the area under the graph will be the maximum velocity. I am not be to understand why as the area under the graph gives change in velocity only.

1 Answers

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