By applying the zero power rule of integer exponents, any non-zero base raised to the power of 0 is equal to 1. So, we have:
-4^0 = 1
Now, we can multiply 1 by 15:
1 * 15 = 15
Therefore, -4^0 * 15 = 15.
-4^0 = 1
Now, we can multiply 1 by 15:
1 * 15 = 15
Therefore, -4^0 * 15 = 15.
-4^0 = 1
Now, let's multiply the result by 15:
1 * 15 = 15
Therefore, the solution to -4^0 * 15 is 15.
Now let's solve the expression -4^0 * 15 using the zero power rule of integer exponents step by step:
Step 1: Examine the expression -4^0. According to the order of operations (PEMDAS/BODMAS), we need to calculate the exponentiation before multiplying.
Step 2: Apply the zero power rule to -4^0. Since -4 is a non-zero number, we know that (-4)^0 = 1.
Step 3: Replace -4^0 with 1 in the expression, resulting in 1 * 15.
Step 4: Finally, multiply 1 by 15. The product of 1 and any number is that number itself, so 1 * 15 equals 15.
Therefore, -4^0 * 15 = 15.