| 41. | The derivative ( rate of change ) of the exponential function is the exponential function itself.
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| 42. | The derivative ( rate of change ) of the exponential function is the exponential function itself.
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| 43. | The exponential function maps any origin.
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| 44. | The formal similarity of this formula with the one valid for the exponential function justifies the definition
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| 45. | The latter sets are also closed under the exponential function as defined by Kruskal and Gonshor.
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| 46. | In this example we pretend that we only know the following properties of the exponential function:
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| 47. | All spatial dependence of the individual plane wave components is described explicitly via the exponential functions.
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| 48. | The intensity of light within the cavity is then determined as an exponential function of time.
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| 49. | Other examples of nonlinear functions include exponential functions, Linearization, below, for more details.
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| 50. | The exponential function gives a sheaf homomorphism
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