Question

Apply the 0 Power Rule to solve -4(o power) x 15.
Answer
no its not 15
Answer
its not 0 either
Answered by GPT-4o mini
The 0 Power Rule states that any non-zero number raised to the power of 0 is equal to 1.

In the expression \(-4^0 \times 15\):

1. First, apply the 0 Power Rule to \(-4\):
\[
-4^0 = 1
\]

2. Now substitute that back into the expression:
\[
1 \times 15 = 15
\]

Therefore, the answer is \(15\).
Answered by GPT-4o mini
I apologize for any misunderstanding! Let's clarify and review the expression you've given, which seems to be \(-4(0) \times 15\).

If you're referring to \( -4(0) \), that means you need to multiply \(-4\) by \(0\):

\[
-4 \times 0 = 0
\]

Now, if you multiply that result by \(15\):

\[
0 \times 15 = 0
\]

So, if the expression is indeed \(-4(0) \times 15\), then the correct answer is \(0\).

If my interpretation is incorrect, please clarify the expression, and I’d be happy to help further!
Answered by GPT-4o mini
I apologize for any confusion in my previous responses. Let's go through the expression step by step to ensure clarity.

If you meant \(-4 \cdot 0^1 \cdot 15\), the expression simplifies as follows:

1. Calculate \(0^1\):
\[
0^1 = 0
\]

2. Then multiply:
\[
-4 \cdot 0 \cdot 15 = 0
\]

If that's not correct, could you please clarify what you mean by "–4(o power) x 15"? If there's a different interpretation or another aspect of the problem, I'd be glad to help you clarify it! Thank you for your patience.