Question
Apply the Zero Power Rule of Integer Exponents to solve 63^0
.(1 point)
63^0=
Remaining Attempts : 3
.(1 point)
63^0=
Remaining Attempts : 3
Answers
Answer
Apply the Zero Power Rule of Integer Exponents to solve 2.3+(−1.478)^0
.(1 point)
2.3+(−1.478)^0=
.(1 point)
2.3+(−1.478)^0=
Answer
Apply the Zero Power Rule of Integer Exponents to solve −4^0⋅15
.(1 point)
−4^0⋅15=
.(1 point)
−4^0⋅15=
Answer
wrong
Answered by
GPT-4o mini
According to the Zero Power Rule of Integer Exponents, any non-zero number raised to the power of zero is equal to one. Therefore:
\[ 63^0 = 1 \]
So, the answer is \( 1 \).
\[ 63^0 = 1 \]
So, the answer is \( 1 \).
Answered by
GPT-4o mini
Using the Zero Power Rule, we know that any non-zero number raised to the power of zero equals one. Since \(-1.478\) is non-zero, we have:
\[
(-1.478)^0 = 1
\]
Now, substituting that back into the expression:
\[
2.3 + (-1.478)^0 = 2.3 + 1 = 3.3
\]
So, the final answer is:
\[
2.3 + (-1.478)^0 = 3.3
\]
\[
(-1.478)^0 = 1
\]
Now, substituting that back into the expression:
\[
2.3 + (-1.478)^0 = 2.3 + 1 = 3.3
\]
So, the final answer is:
\[
2.3 + (-1.478)^0 = 3.3
\]
Answered by
GPT-4o mini
Using the Zero Power Rule, we know that any non-zero number raised to the power of zero equals one. Therefore:
\[
-4^0 = 1
\]
Now, substituting that into the expression:
\[
-4^0 \cdot 15 = 1 \cdot 15 = 15
\]
So, the final answer is:
\[
-4^0 \cdot 15 = 15
\]
\[
-4^0 = 1
\]
Now, substituting that into the expression:
\[
-4^0 \cdot 15 = 1 \cdot 15 = 15
\]
So, the final answer is:
\[
-4^0 \cdot 15 = 15
\]
Answered by
GPT-4o mini
I apologize for the misunderstanding. Let’s clarify:
The expression \(-4^0\) is evaluated as \( - (4^0) \). According to the Zero Power Rule, any non-zero number raised to the power of zero is equal to one, so:
\[
4^0 = 1
\]
Thus:
\[
-4^0 = -1
\]
Now we can substitute this back into the expression:
\[
-4^0 \cdot 15 = -1 \cdot 15 = -15
\]
The correct evaluation is:
\[
-4^0 \cdot 15 = -15
\]
Thank you for your patience!
The expression \(-4^0\) is evaluated as \( - (4^0) \). According to the Zero Power Rule, any non-zero number raised to the power of zero is equal to one, so:
\[
4^0 = 1
\]
Thus:
\[
-4^0 = -1
\]
Now we can substitute this back into the expression:
\[
-4^0 \cdot 15 = -1 \cdot 15 = -15
\]
The correct evaluation is:
\[
-4^0 \cdot 15 = -15
\]
Thank you for your patience!