816 = 24 x 31 x 171
To find the exponent of 1296, we first determine its prime factorization. The prime factorization of 1296 is (2^4 \times 3^4). Therefore, the exponents in this factorization are 4 for both prime factors. The exponent of 1296 can be interpreted as the highest exponent in its prime factorization, which is 4.
No prime power exists since there are no duplicate prime numbers in the prime factorization.
To find the exponent of a number, we typically look for its prime factorization. However, the term "exponent" can also refer to the exponent in the context of a specific base. If you want to know the exponent in the context of prime factorization, you would need to factor the number first. If you meant something else by "exponent," please provide more context for a precise answer.
No prime power exists since there are no duplicate prime numbers in the prime factorization.
24
The prime factorization in exponent form of 27 is: 33 = 27
To find the exponent of 1296, we first determine its prime factorization. The prime factorization of 1296 is (2^4 \times 3^4). Therefore, the exponents in this factorization are 4 for both prime factors. The exponent of 1296 can be interpreted as the highest exponent in its prime factorization, which is 4.
Write the prime factorization with exponents. Add 1 to each exponent. (Numbers without exponents actually have the exponent 1.) Multiply them together. That will be the number of factors.
2^3 x 5
No prime power exists since there are no duplicate prime numbers in the prime factorization.
To find the exponent of a number, we typically look for its prime factorization. However, the term "exponent" can also refer to the exponent in the context of a specific base. If you want to know the exponent in the context of prime factorization, you would need to factor the number first. If you meant something else by "exponent," please provide more context for a precise answer.
It is: 21*32*51 = 90
We'd be glad to if you would tell us what the number is.
32
No prime power exists since there are no duplicate prime numbers in the prime factorization.
24
780: 2^2 * 3 * 5 * 13