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If g=z4×z2 and h=(2,0) then g/h is isomorphic to?
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If g=z4×z2 and h=(2,0) then g/h is isomorphic to?
Isomorphism in Group Theory
In mathematics, specifically in group theory, isomorphism is a concept that relates two groups. An isomorphism between two groups means that the two groups have the same structure and can be considered essentially the same. In this case, we are given two groups g and h, and we need to determine if g/h is isomorphic to any other group.
The Given Groups
Let's start by understanding the given groups:
- Group g: g = Z4 × Z2
- Z4 is the cyclic group of integers modulo 4, denoted as {0, 1, 2, 3} with addition modulo 4.
- Z2 is the cyclic group of integers modulo 2, denoted as {0, 1} with addition modulo 2.
- Z4 × Z2 is the direct product of Z4 and Z2, which consists of ordered pairs (a, b) where a belongs to Z4 and b belongs to Z2. The group operation is defined component-wise, i.e., (a, b) + (c, d) = (a + c, b + d).
- Group h: h = (2, 0)
- h is a single element in the group, which represents an ordered pair (2, 0) in Z4 × Z2.
Isomorphism to Another Group
To determine if g/h is isomorphic to another group, we need to understand the quotient group g/h and its properties.
- Quotient Group g/h: g/h is the set of all left cosets of h in g. Each left coset is formed by taking an element g' from g and multiplying it on the left by the inverse of h. Mathematically, g/h = {g' * h | g' belongs to g}.
Since h = (2, 0), we can calculate the left cosets of h in g as follows:
- (0, 0) + h = {(0, 0) + (2, 0)} = {(2, 0)}
- (1, 0) + h = {(1, 0) + (2, 0)} = {(3, 0)}
- (2, 0) + h = {(2, 0) + (2, 0)} = {(0, 0)}
- (3, 0) + h = {(3, 0) + (2, 0)} = {(1, 0)}
Therefore, the quotient group g/h = {(2, 0), (3, 0), (0, 0), (1, 0)}.
Isomorphism Analysis
To determine if g/h is isomorphic to any other group, we need to consider the structure and properties of g/h.
- Size of g/h: The size of g/h is equal to the number of left cosets, which in this case is 4.
- Structure of g/h: The elements of g/h are (2, 0), (3, 0), (0, 0), (1, 0). We can observe that g/h is a cyclic group of order 4, as it contains all possible powers of (2, 0) in its
In mathematics, specifically in group theory, isomorphism is a concept that relates two groups. An isomorphism between two groups means that the two groups have the same structure and can be considered essentially the same. In this case, we are given two groups g and h, and we need to determine if g/h is isomorphic to any other group.
The Given Groups
Let's start by understanding the given groups:
- Group g: g = Z4 × Z2
- Z4 is the cyclic group of integers modulo 4, denoted as {0, 1, 2, 3} with addition modulo 4.
- Z2 is the cyclic group of integers modulo 2, denoted as {0, 1} with addition modulo 2.
- Z4 × Z2 is the direct product of Z4 and Z2, which consists of ordered pairs (a, b) where a belongs to Z4 and b belongs to Z2. The group operation is defined component-wise, i.e., (a, b) + (c, d) = (a + c, b + d).
- Group h: h = (2, 0)
- h is a single element in the group, which represents an ordered pair (2, 0) in Z4 × Z2.
Isomorphism to Another Group
To determine if g/h is isomorphic to another group, we need to understand the quotient group g/h and its properties.
- Quotient Group g/h: g/h is the set of all left cosets of h in g. Each left coset is formed by taking an element g' from g and multiplying it on the left by the inverse of h. Mathematically, g/h = {g' * h | g' belongs to g}.
Since h = (2, 0), we can calculate the left cosets of h in g as follows:
- (0, 0) + h = {(0, 0) + (2, 0)} = {(2, 0)}
- (1, 0) + h = {(1, 0) + (2, 0)} = {(3, 0)}
- (2, 0) + h = {(2, 0) + (2, 0)} = {(0, 0)}
- (3, 0) + h = {(3, 0) + (2, 0)} = {(1, 0)}
Therefore, the quotient group g/h = {(2, 0), (3, 0), (0, 0), (1, 0)}.
Isomorphism Analysis
To determine if g/h is isomorphic to any other group, we need to consider the structure and properties of g/h.
- Size of g/h: The size of g/h is equal to the number of left cosets, which in this case is 4.
- Structure of g/h: The elements of g/h are (2, 0), (3, 0), (0, 0), (1, 0). We can observe that g/h is a cyclic group of order 4, as it contains all possible powers of (2, 0) in its
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If g=z4×z2 and h=(2,0) then g/h is isomorphic to?
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If g=z4×z2 and h=(2,0) then g/h is isomorphic to? for Mathematics 2024 is part of Mathematics preparation. The Question and answers have been prepared according to the Mathematics exam syllabus. Information about If g=z4×z2 and h=(2,0) then g/h is isomorphic to? covers all topics & solutions for Mathematics 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for If g=z4×z2 and h=(2,0) then g/h is isomorphic to?.
If g=z4×z2 and h=(2,0) then g/h is isomorphic to? for Mathematics 2024 is part of Mathematics preparation. The Question and answers have been prepared according to the Mathematics exam syllabus. Information about If g=z4×z2 and h=(2,0) then g/h is isomorphic to? covers all topics & solutions for Mathematics 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for If g=z4×z2 and h=(2,0) then g/h is isomorphic to?.
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