isomorph (Meaning)
isomorph (n.)
A substance which is similar to another in crystalline form and composition.
An animal, plant, or group having superficial similarity to another, although phylogenetically different.
Synonyms & Antonyms of isomorph
No Synonyms and anytonyms found
isomorph Sentence Examples
- In mathematics, two objects are isomorphs if they have the same structure, even if they look different.
- The word "isomorph" comes from the Greek words "iso," meaning "equal," and "morph," meaning "form."
- Isomorphic objects can be found in many areas of mathematics, including algebra, geometry and graph theory.
- For example, the sets of integers and rational numbers are isomorphic, because every rational number can be written as a fraction of two integers.
- The mathematical concept of isomorphism was first developed in the 19th century.
- Isomorphisms are useful because they allow mathematicians to study different objects in a unified way.
- They have also been used to solve a variety of mathematical problems, such as finding the number of solutions to an equation.
- Isomorphism is a fundamental concept in category theory, which is a branch of mathematics that studies mathematical structures.
- Isomorphisms are also used in computer science to compare different data structures and algorithms.
- In chemistry, two molecules are considered isomorphic if they have the same molecular formula and the same connectivity of atoms, even if their atoms are arranged differently in space.
FAQs About the word isomorph
A substance which is similar to another in crystalline form and composition., An animal, plant, or group having superficial similarity to another, although phyl
No synonyms found.
No antonyms found.
In mathematics, two objects are isomorphs if they have the same structure, even if they look different.
The word "isomorph" comes from the Greek words "iso," meaning "equal," and "morph," meaning "form."
Isomorphic objects can be found in many areas of mathematics, including algebra, geometry and graph theory.
For example, the sets of integers and rational numbers are isomorphic, because every rational number can be written as a fraction of two integers.
