What whole number does the following product of prime numbers with exponents represent: 2 to the second power and 3 to the third power
The product of prime numbers with exponents can be found by multiplying the base raised to the exponent.
In this case, 2 to the second power is 2^2 = 2 * 2 = 4.
3 to the third power is 3^3 = 3 * 3 * 3 = 27.
To find the product, we multiply these two results: 4 * 27 = 108.
Therefore, the whole number that the product of prime numbers with exponents represents is 108.
To find the whole number represented by the product of prime numbers with exponents, we simply multiply the prime numbers raised to their respective exponents.
In this case, we have:
2^2 * 3^3
Expanding this expression gives us:
2 * 2 * 3 * 3 * 3
Multiplying these numbers together, we get:
2 * 2 * 3 * 3 * 3 = 36 * 9 = 324
Therefore, the whole number represented by the product of 2^2 and 3^3 is 324.
To find the product of prime numbers with exponents, you need to multiply the base number raised to the corresponding exponent for each prime number.
In this case, you have 2 to the second power (2^2) and 3 to the third power (3^3). To find the product, you multiply these two terms: (2^2) * (3^3).
To simplify exponents, you can calculate 2^2 which is 4 and 3^3 which is 27. Then, multiply these values together: 4 * 27.
The product of 2 to the second power and 3 to the third power is 4 * 27, which equals 108.
Therefore, the whole number represented by the product of 2^2 and 3^3 is 108.