The fundamental group of a space is a mathematical concept used in algebraic topology to study the properties of that space. It is a group formed by the equivalence classes of loops in the space, where two loops are considered equivalent if they can be continuously deformed into each other.
The question of what is the fundamental group for amide is not well-defined, as it is not specified whether "amide" refers to a specific space or molecule. In general, the concept of the fundamental group is applied to topological spaces, not specific chemical compounds.
If, however, "amide" is referring to the functional group in organic chemistry, it is not a space itself but rather a part of a larger molecule. In this case, the concept of the fundamental group does not directly apply. The fundamental group is typically used to study and classify properties of spaces, not specific chemical structures.
What is the fundamental group for amide
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