Schwere, Elektricität und Magnetismus:387

Bernhard Riemann: Schwere, Elektricität und Magnetismus
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VECTOR ANALYSIS.


     If we suppose the quantities occurring in the six equations of the last section to be functions of a scalar , we may substitute for in those equations since this is only to divide all terms by the scalar .

     47. Successive differentiations.—The differential coefficient of a vector with respect to a scalar is of course a finite vector, of which we may take the differential, or the differential coefficient with respect to the same or any other scalar. We thus obtain differential coefficients of the higher orders, which are indicated as in the scalar calculus.

     A few examples will serve for illustration.

     If is the vector drawn from a fixed origin to a moving point at any time , will be the vector representing the velocity of the point, and the vector representing its acceleration.

     If is the vector drawn from a fixed origin to any point on a curve, and the distance of that point measured on the curve from any fixed point, is a unit vector, tangent to the curve and having the direction in which increases: is a vector directed from a point on the curve to the center of curvature, and equal to the curvature: is the normal to the osculating plane, directed to the side on which the curve appears described counter-clock-wise about the center of curvature, and equal to the curvature. The tortuosity (or rate of rotation of the osculating plane, considered as positive when the rotation appears counter-clock-wise as seen from the direction in which increases,) is represented by


[1]


     48. Integration of an equation between differentials.—If and are two single-valued continuous scalar functions of any number of scalar or vector variables, and



then


where is a scalar constant.



  1. WS: Handschriftliche Korrektur: Im Nenner wurden jeweils durch ergänzt.