For each of these sequences find a recurrence relation satisfied by this sequence. (The answers are not unique because there are infinitely many different recurrence relations satisfied by any sequence.) a n = 3 a n = 2 n a n = 2 n + 3 a n = 5 n a n = n 2 a n = n 2 + n a n = n + ( − 1 ) n a n = n !
For each of these sequences find a recurrence relation satisfied by this sequence. (The answers are not unique because there are infinitely many different recurrence relations satisfied by any sequence.) a n = 3 a n = 2 n a n = 2 n + 3 a n = 5 n a n = n 2 a n = n 2 + n a n = n + ( − 1 ) n a n = n !
For each of these sequences find a recurrence relation satisfied by this sequence. (The answers are not unique because there are infinitely many different recurrence relations satisfied by any sequence.)
Question 2: Let A(G) be the set of all automorphisms of a group G. Prove that if
G is a group having only two elements, then A(G) consists only of I.
JL
Q
Let E be a subset of a spacex thens - prove that:
i) E≤ E
2) Eclosed iff E'SE
3
E = EVE' = E° Ud (E).
Question 4: Let G be a finite abelian group of order o(G) and suppose the integer
n is relatively prime to o(G). Consider the mapping : G→G defined by (y) = y".
Prove that this mapping is an automorphism.
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RELATIONS-DOMAIN, RANGE AND CO-DOMAIN (RELATIONS AND FUNCTIONS CBSE/ ISC MATHS); Author: Neha Agrawal Mathematically Inclined;https://www.youtube.com/watch?v=u4IQh46VoU4;License: Standard YouTube License, CC-BY