# Pages that link to "Number of conjugacy classes in a subgroup may be more than in the whole group"

The following pages link to **Number of conjugacy classes in a subgroup may be more than in the whole group**:

- Number of conjugacy classes (← links)
- Commuting fraction in subgroup is at least as much as in whole group (← links)
- Number of conjugacy classes in a quotient is less than or equal to number of conjugacy classes of group (← links)
- Commuting fraction in quotient group is at least as much as in whole group (← links)
- Number of conjugacy classes in a direct product is the product of the number of conjugacy classes in each factor (← links)
- Number of conjugacy classes in a subgroup of finite index is bounded by index times number of conjugacy classes in the whole group (← links)