Add to ORKGWe explain what is meant by an odd function in terms of symmetry, then give a rule satisfied by the function. We show how to test for oddness then discuss the area under the graph of an even function between points an equal distance of the y axis
International audienceThe Odd Order Theorem is a landmark result in finite group theory, due to W. F...
AbstractWe show that any connected regular graph with d+1 distinct eigenvalues and odd-girth 2d+1 is...
We define and study odd analogues of classical geometric and combinatorial objects associated to pe...
We explain what is meant by an even function in terms of symmetry, then give a rule satisfied by the...
A function f(x) is even if f(x)=f(-x) and odd if f(x)=-f(-x).The graph of an even function is symme...
Shows how to check if a polynomial is even or odd, and extends this to a rational function
Demonstrates that symmetry of functions helps us to shorten the calculation of the integrals needed ...
We discuss combinations of even and odd functions involving sums, products etc and investigate their...
Let G be a simple graph and f: V (G) 7 → {1, 3, 5,...} an odd integer valued function defined on V (...
When dealing with symmetry properties of mathematical objects, one of the fundamental questions is t...
AbstractTwo vertices in a graph are called an even pair (odd pair) if all induced paths between thes...
When asked to define an even function, a student wrote: “A function f for which f(−x) = f(x).” Is th...
This work contains a collection of strange functions that, with their properties, break the school i...
In this article we present definitions, basic properties and some examples of even and odd function...
Andrews studied a function which appears in Ramanujan's identities. In Ramanujan's Lost Notebook, th...
International audienceThe Odd Order Theorem is a landmark result in finite group theory, due to W. F...
AbstractWe show that any connected regular graph with d+1 distinct eigenvalues and odd-girth 2d+1 is...
We define and study odd analogues of classical geometric and combinatorial objects associated to pe...
We explain what is meant by an even function in terms of symmetry, then give a rule satisfied by the...
A function f(x) is even if f(x)=f(-x) and odd if f(x)=-f(-x).The graph of an even function is symme...
Shows how to check if a polynomial is even or odd, and extends this to a rational function
Demonstrates that symmetry of functions helps us to shorten the calculation of the integrals needed ...
We discuss combinations of even and odd functions involving sums, products etc and investigate their...
Let G be a simple graph and f: V (G) 7 → {1, 3, 5,...} an odd integer valued function defined on V (...
When dealing with symmetry properties of mathematical objects, one of the fundamental questions is t...
AbstractTwo vertices in a graph are called an even pair (odd pair) if all induced paths between thes...
When asked to define an even function, a student wrote: “A function f for which f(−x) = f(x).” Is th...
This work contains a collection of strange functions that, with their properties, break the school i...
In this article we present definitions, basic properties and some examples of even and odd function...
Andrews studied a function which appears in Ramanujan's identities. In Ramanujan's Lost Notebook, th...
International audienceThe Odd Order Theorem is a landmark result in finite group theory, due to W. F...
AbstractWe show that any connected regular graph with d+1 distinct eigenvalues and odd-girth 2d+1 is...
We define and study odd analogues of classical geometric and combinatorial objects associated to pe...