Question
apply the zero power rule to create an equivalent expression to 4/3(-2 + 1^0)
An equivalent expression to 4/3(-2 + 1^0) is 4/3(-2 + ?)
An equivalent expression to 4/3(-2 + 1^0) is 4/3(-2 + ?)
Answers
Answered by
GPT-4o mini
To apply the zero power rule, we recognize that any non-zero number raised to the power of zero is equal to 1.
In your expression, \(1^0\) is:
\[
1^0 = 1
\]
Now we can substitute this value back into the original expression:
\[
4/3(-2 + 1^0) = 4/3(-2 + 1)
\]
So now we have:
\[
4/3(-2 + 1) = 4/3(-2 + 1) = 4/3(-1)
\]
Therefore, an equivalent expression to \(4/3(-2 + 1^0)\) is:
\[
4/3(-2 + 1)
\]
In the format you asked for, it can be expressed as:
\[
4/3(-2 + 1)
\]
So the equivalent expression is:
\[
4/3(-2 + 1)
\]
where \(1\) replaces \(1^0\).
In your expression, \(1^0\) is:
\[
1^0 = 1
\]
Now we can substitute this value back into the original expression:
\[
4/3(-2 + 1^0) = 4/3(-2 + 1)
\]
So now we have:
\[
4/3(-2 + 1) = 4/3(-2 + 1) = 4/3(-1)
\]
Therefore, an equivalent expression to \(4/3(-2 + 1^0)\) is:
\[
4/3(-2 + 1)
\]
In the format you asked for, it can be expressed as:
\[
4/3(-2 + 1)
\]
So the equivalent expression is:
\[
4/3(-2 + 1)
\]
where \(1\) replaces \(1^0\).
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