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difference of vectors
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(Definition)
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Let $\vec{a}$ and $\vec{b}$ be two vectors in the plane (or in a vector space). The difference vector or difference $\vec{a}\!-\!\vec{b}$ of $\vec{a}$ and $\vec{b}$ is a vector $\vec{d}$ such that $$\vec{b}+\vec{d} = \vec{a}.$$ Thus we have
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(1) |
According to the procedure of forming the sum of vectors by setting the addends one after the other, the equation (1) tallies with the picture below; when the minuend and the subtrahend emanate from a common initial point, their difference vector can be directed from the terminal point of the subtrahend to the terminal point of the minuend.
Remark. It is easily seen that the difference $\vec{a}\!-\!\vec{b}$ is same as the sum vector $$\vec{a}\!+\!(-\vec{b})$$ where $-\vec{b}$ is the opposite vector of $\vec{b}$ : it may be represented by the directed line segment from the terminal point of $\vec{b}$ to the initial point of $\vec{b}$ .
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"difference of vectors" is owned by pahio.
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Cross-references: directed line segment, sum vector, terminal point, initial point, subtrahend, minuend, equation, sum of vectors, difference, vector space, plane, vectors
There are 5 references to this entry.
This is version 3 of difference of vectors, born on 2008-02-09, modified 2008-08-26.
Object id is 10249, canonical name is DifferenceOfVectors.
Accessed 3051 times total.
Classification:
| AMS MSC: | 53A45 (Differential geometry :: Classical differential geometry :: Vector and tensor analysis) |
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Pending Errata and Addenda
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 \psline[arrows=->,ar... ...[a](-1,0.7){$\vec{b}$} \rput[a](1.6,1.76){$\vec{a}\!-\!\vec{b}$} \end{pspicture}](http://images.planetmath.org:8080/cache/objects/10249/js/img2.png "\begin{pspicture}(0,-1)(4,2.5) \psdot[linecolor=black](0,0) \psline[arrows=->,ar... ...[a](-1,0.7){$\vec{b}$} \rput[a](1.6,1.76){$\vec{a}\!-\!\vec{b}$} \end{pspicture}")