|
- coordinate systems - Abscissa, Ordinate, and Applicate -- Origins . . .
How did the terms "abscissa", "ordinate", and "applicate" (for the x x -axis, y y -axis, and z z -axis, respectively) originate? Note: I feel the need to explain this question before someone says that this is opinionated or unnecessary I think that it's very, very useful to know how certain terms originate in mathematics because it allows us to understand everything deeper It's always great
- Abscissa, Ordinate and ?? for z-axis? - Mathematics Stack Exchange
Like x-axis is abscissa, y-axis is ordinate what is z-axis called? It is one of basic doubts from my childhood
- integration - Difference between ordinate and abscissa. - Mathematics . . .
Difference between ordinate and abscissa Ask Question Asked 9 years, 8 months ago Modified 3 years, 10 months ago
- Word choice for describing a variation with the abscissa (x)
In mathematics, the abscissa (plural abscissae or abscissæ or abscissas) and the ordinate are respectively the first and second coordinates of a point in a coordinate system: Abscissa x-axis (horizontal) coordinate; ordinate y-axis (vertical) coordinate Usually these are the horizontal and vertical coordinates of a point in a two-dimensional
- Abscissa of convergence for a Dirichlet series
Abscissa of convergence for a Dirichlet series Ask Question Asked 10 years, 7 months ago Modified 1 year, 3 months ago
- calculus - Find the first coordinate of the intersection point of two . . .
Let f(x) =x2 f (x) = x 2 Find the abscissa of the intersection point of the two tangent lines of f(x) f (x) at x = −4 x = 4 and at x = 2 x = 2 I know I'm meant to find the two gradients of the two lines and use simultaneous equations to substitute the values, but I'm not sure how Any help would be greatly appreciated
- On the abscissa of convergence of a Dirichlet series.
It is clear from your expression that the first pole of this series is at s = 1 s = 1, and thus the abscissa of convergence is 1 1 A different perspective is to consider what the Dirichlet series represents
- Curvilinear abscissa = radius * angle - Circular motion
where s s is the curvilinear abscissa, r r the radius and θ θ the angle in circular motion Thank you for your time
|
|
|