Answer to Question #289457 in Abstract Algebra for ramya

Let "G"  be a group of order "11^2:13^2 ."  

It follows from Third Sylow Theorem that for the number "s_{11}" of sylow "11"-subgroups we have that "s_{11}\\equiv 1\\mod 11" and "s_{11}" divides "13^2." Therefore, "s_{11}\\in\\{1,13,169\\}\\cap\\{1,12,23,34,45,56,67,78,89,100,111,122,133,144,155,166,...\\}\\\\=\\{1\\}."

We conclude that "s_{11}=1," and hence there is a unique sylow "11"-subgroup in "G".

It follows from Third Sylow Theorem that for the number "s_{13}" of sylow "13"-subgroups we have that "s_{13}\\equiv 1\\mod 13" and "s_{13}" divides "11^2." Therefore, "s_{13}\\in\\{1,11,121\\}\\cap\\{1,14,27,40,53,66,79,92,105,118,131,...\\}=\\{1\\}."

We conclude that "s_{13}=1," and hence there is a unique sylow "13"-subgroup in "G".