Razlika između inačica stranice »Apscisa točke«
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|cite=Weisstein, Eric W. "Plane." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/Plane.html | |cite=Weisstein, Eric W. "Plane." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/Plane.html | ||
|napomena=In older texts, the abscissa is sometimes used in a more general sense as a number determining the position of a point along a line. For instance, a straight line in Euclidean three-space can be parametrized by $a+bt$, where $a,b \in R^3$ with $b\neq 0$. Here, $t$ is the abscissa of the corresponding point $a+b\,t$ on the line. | |napomena=In older texts, the abscissa is sometimes used in a more general sense as a number determining the position of a point along a line. For instance, a straight line in Euclidean three-space can be parametrized by $a+bt$, where $a,b \in R^3$ with $b\neq 0$. Here, $t$ is the abscissa of the corresponding point $a+b\,t$ on the line. | ||
− | |see_also=[[Ordinata|Ordinate]], [[Real Line|Real Line]], [[ | + | |see_also=[[Ordinata|Ordinate]], [[Real Line|Real Line]], [[os apscisa|x-Axis]], [[y-Axis|y-Axis]], [[z-Axis|z-Axis]]}} |
Inačica od 18:14, 19. listopada 2014.
Definicija: prva koordinata točke u koordinatnome sustavu
Simbol: \(x\)
Engleske istovrijednice: abscissa
Struna ID: 29845
Obrađivač: Ivica Gusić
Faza obrade: zaključaj naziv
Vrsta riječi: imenica Rod: ženski Broj: jednina
Cilj projekta "Hrvatsko nazivlje u matematici" je na jednom mjestu prikupiti i obraditi sve hrvatske nazive koji na izravan ili neizravan način imaju veze s matematikom. Ako želite na bilo koji način doprinijeti ostvarenju ciljeva ovog projekta, molim javite se voditelju projekta na adresu goran.igaly@math.hr
WMW naziv: abscissa
WMW klasifikacija: Geometry > Surfaces > Planes
WMW definicija: The \(x\)- (horizontal) coordinate of a point in a two dimensional coordinate system. Physicists and astronomers sometimes use the term to refer to the axis itself instead of the distance along it.
WMW napomena: In older texts, the abscissa is sometimes used in a more general sense as a number determining the position of a point along a line. For instance, a straight line in Euclidean three-space can be parametrized by \(a+bt\), where \(a,b \in R^3\) with \(b\neq 0\). Here, \(t\) is the abscissa of the corresponding point \(a+b\,t\) on the line.
WMW See also: Ordinate, Real Line, x-Axis, y-Axis, z-Axis
Izvor: Weisstein, Eric W. "Plane." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/Plane.html
Struna ID: 29845