If
m =
a2
b3, then every prime in the
prime factorization of
a appears in the prime factorization of
m with an exponent of at least two, and every prime in the prime factorization of
b appears in the prime factorization of
m with an exponent of at least three; therefore,
m is powerful. In the other direction, suppose that
m is powerful, with prime factorization :m = \prod p_i^{\alpha_i}, where each
αi ≥ 2. Define
γi to be three if
αi is odd, and zero otherwise, and define
βi =
αi −
γi. Then, all values
βi are nonnegative even integers, and all values γi are either zero or three, so :m = \left(\prod p_i^{\beta_i}\right)\left(\prod p_i^{\gamma_i}\right) = \left(\prod p_i^{\beta_i/2} \right)^2 \left( \prod p_i^{\gamma_i/3}\right)^3 supplies the desired representation of
m as a product of a square and a cube. Informally, given the prime factorization of
m, take
b to be the product of the prime factors of
m that have an odd exponent (if there are none, then take
b to be 1). Because
m is powerful, each prime factor with an odd exponent has an exponent that is at least 3, so
m/
b3 is an integer. In addition, each prime factor of
m/
b3 has an even exponent, so
m/
b3 is a perfect square, so call this
a2; then
m =
a2
b3. For example: :m = 21600 = 2^5 \times 3^3 \times 5^2 \, , :b = 2 \times 3 = 6 \, , :a = \sqrt{\frac{m}{b^3}} = \sqrt{2^2 \times 5^2} = 10 \, , :m = a^2b^3 = 10^2 \times 6^3 \, . The representation
m =
a2
b3 calculated in this way has the property that
b is
squarefree, and is uniquely defined by this property. == Mathematical properties ==