A damped harmonic vibration function f can be visualized by drawing its graph in a (two-dimensional) coordinate system. The function graph of a damped harmonic vibration function f can be defined mathematically as the set of all pairs of elements ( x | y ) for which y = f (x). The graph of the continuous damped harmonic vibration function on a continuous interval forms a continuous curve.

f(x) = a⋅e^{( -b⋅x )}⋅sin( c⋅x + d )

The function plotter draws the function graphs of the real damped harmonic vibration function. The derivative can be drawn with (d/dx) as dotted line in the graph. The integral can be started with select ∫. The integration range can adjusted with variation of the points at the function graph.

Print or save the image via right mouse click.

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