Schwere, Elektricität und Magnetismus:382

Vorlage:Bernhard Riemann - Schwere, Elektricität und Magnetismus Vorlage:PageDef2

VECTOR ANALYSIS.

By substitution of these values, we obtain the identical equation,

(Compare No. 31.) If we wish the four vectors to appear symmetrically in the equation we may write

Vorlage:Idt2If we wish to express $ρ$ as a sum of vectors having directions perpendicular to the planes of $α$ and $β$ , of $β$ and $γ$ , and of $γ$ and $α$ , we may write

Vorlage:MathForm2

To obtain the valnes of $e, f, g$ , we multiply directly by $α$ , by $β$ , and by $γ$ . This gives

Vorlage:MathForm2

Substituting these values we obtain the identical equation

Vorlage:MathForm2

(Compare No. 32.)

Vorlage:Idt238. Reciprocal systems of vectors.—The results of the preceding section may be more compactly expressed if we use the abbreviations

Vorlage:MathForm2

The identical equations (4) and (8) of the preceding number thus become

Vorlage:MathForm2

We may infer from the similarity of these equations that the relations of $α, β, γ$ , and $α^{'}, β^{'}, γ^{'}$ are reciprocal; a proposition which is easily proved directly. For the equations

Vorlage:MathForm2

are satisfied identically by the substitution of the values of $α^{'}, β^{'},$ and $γ^{'}$ given in equations (1). (See Nos. 31 and 34.)

Vorlage:Idt2Def.—It will be convenient to use the term reciprocal to designate these relations, i. e., we shall say that three vectors are reciprocals of three others, when they satisfy relations similar to those expressed in equations (1) or (4).<section end=t1 />

Schwere, Elektricität und Magnetismus:382

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