The GCF is 3s.
To find the greatest common factor (GCF) of 9s and 63s to the third power, we first need to factor out the common factors of the two numbers. The prime factorization of 9s is 3 * 3 * s, and the prime factorization of 63s^3 is 3 * 3 * 7 * s * s * s. The common factors between the two numbers are 3 * 3 * s, which simplifies to 9s. Therefore, the GCF of 9s and 63s^3 is 9s.
The GCF of 9s and 63s^3 is 9s.
3r(16s + 27)
6b^2-13bs-63s^2 is factorised to (2b-9s)(3b+7s)
1s^22s^22p^63s^23p^3
The question seems unclear as "63s" could refer to various contexts such as numbers, items, or something else. If you mean how many occurrences of the number 63 exist in a specific dataset or context, please provide more details for a precise answer. Otherwise, without additional context, it's impossible to determine an exact count.
The ground state symbol for manganese is 1s^22s^22p^63s^23p^63d^54s^2.
The GCF is 6.
The GCF is 9.
The GCF is 4.
The GCF is 30.
50