DP Further Mathematics HL Questionbank
Subgroups, proper subgroups.
Description
[N/A]Directly related questions
- 11M.2.hl.TZ0.6a: (i) Draw the Cayley table for the set \(S = \left\{ {0,1,2,3,4,\left. 5 \right\}} \right.\)...
- 10M.2.hl.TZ0.1b: The domain of \( * \) is now reduced to \(S = \left\{ {0,2,3,4,5,\left. 6 \right\}} \right.\) and...
- 08M.1.hl.TZ0.2b: (i) Determine the order of each element of \(\left\{ {G,\left. * \right\}} \right.\)...
- 08M.2.hl.TZ0.4B: Consider the group \(\left\{ {G, * } \right\}\) and let \(H\) be a subset of \(G\) defined...
- 12M.2.hl.TZ0.4B.c: Suppose now that \(m = ab\) where \(a\) , \(b\) are unequal prime numbers. Show that...
- SPNone.2.hl.TZ0.4d: (i) Find the order of all the elements of \(G\) . (ii) Write down all the proper...
- 14M.1.hl.TZ0.16: \(\{ G,{\text{ }} * \} \) is a group of order \(N\) and \(\{ H,{\text{ }} * \} \) is a proper...
- 15M.2.hl.TZ0.9d: Show that if \(S\) is a subgroup of \(G\), then \(f(S)\) is a subgroup of \(H\).