← 2024 Paper 2

UPSC 2024 Maths Optional Paper 2 Q1a — Step-by-Step Solution

10 marks · Section A

Cosets and Lagrange's theorem · Algebra · asked 4× in 13 yrs · Read the full method →

Question

Let GG be a finite group of order mnmn, where mm and nn are prime numbers with m>nm>n. Show that GG has at most one subgroup of order mm.

Technique

Sylow III: nm1(modm)n_m\equiv 1\pmod m and nmnn_m\mid n; the hypothesis m>nm>n forces nm=1n_m=1.

Solution

Step 1 — Sylow context.

A subgroup of order mm in GG is a Sylow mm-subgroup (since mGm\parallel |G|). Let nmn_m denote the number of Sylow mm-subgroups. By Sylow’s third theorem:

  1. nm1(modm)n_m\equiv 1\pmod m, and
  2. nmnn_m\mid n.

Step 2 — Combine the conditions.

Divisors of nn (prime) are 11 and nn. If nm=nn_m=n, then n1(modm)n\equiv 1\pmod m, i.e., m(n1)m\mid(n-1). Since m>n>0m>n>0, we have n1<mn-1<m, so m(n1)m\nmid(n-1) unless n1=0n-1=0, i.e., n=1n=1. But nn is prime, so n2n\ge 2: contradiction.

Therefore nm=1n_m=1.

Conclusion. GG has exactly one (hence at most one) subgroup of order mm.

Answer

  G has exactly one subgroup of order m.  \boxed{\;G\text{ has exactly one subgroup of order }m.\;}
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