How did the terms "abscissa", "ordinate", and "applicate" (for the $x$ -axis, $y$ -axis, and $z$ -axis, respectively) originate? Note: I feel the need to explain this question before someone says that this is opinionated or unnecessary.
Difference between ordinate and abscissa. Ask Question Asked 10 years, 4 months ago Modified 4 years, 6 months ago
Like x-axis is abscissa, y-axis is ordinate what is z-axis called? It is one of basic doubts from my childhood.
Abscissa of convergence for a Dirichlet series Ask Question Asked 11 years, 4 months ago Modified 1 year, 11 months ago
Ordinate and Abscissa of line parallel to tangent of parabola Ask Question Asked 1 year, 11 months ago Modified 1 year, 11 months ago
In the lecture note our instructor claimed that the abscissa of convergence of the above series is $0.$ It is a well-known fact that the abscissa of convergence of the zeta function is $1$ and hence the abscissa of absolute convergence of the alternating zeta function is also equal to $1.$ But I don't have any idea about it's abscissa of ...
What is the abscissa of convergence of the series $\sum\limits_ {n=1 ...
Also, the claim is obviously true if instead of considering the spectral abscissa, we fix a positive definite matrix $P$ and look at all matrices $A$ such that the largest eigenvalue of $PA + A^T P$ is sufficiently negative.
matrix exponential and Spectral abscissa Ask Question Asked 12 years, 1 month ago Modified 12 years, 1 month ago