Question
What is the missing number in this simplified exponential expression: 7^?÷7^5=7^12?(1 point)
Answers
Answer
What is the value of 6.9−2^0?(1 point)
Responses
7.9
7.9
5.9
5.9
6.9
6.9
4.9
Responses
7.9
7.9
5.9
5.9
6.9
6.9
4.9
Answer
Apply the Zero Power Rule to create an equivalent expression to 9⋅(−33)^0+3/2(8−27^0).
Answer
Apply the Zero Power Rule to create an equivalent expression to 9⋅(−33)^0+3/2(8−27^0).
9⋅(−33)^0+3/2(8−27^0) = ? ⋅ ?+3/2(? – ?)
9⋅(−33)^0+3/2(8−27^0) = ? ⋅ ?+3/2(? – ?)
Answer
Apply the Zero Power Rule to create an equivalent expression to 9⋅(−33)0+32(8−270).(2 points)
9⋅(−33)0+32(8−270) = __ ⋅ __ +32(__ – __)
9⋅(−33)0+32(8−270) = __ ⋅ __ +32(__ – __)
Answer
Apply the Zero Power Rule to create an equivalent expression to 9⋅(−33)0+32(8−270).(2 points)
9⋅(−33)0+32(8−270) = __ ⋅ __ +32(__ – __)
fill in the blanks
9⋅(−33)0+32(8−270) = __ ⋅ __ +32(__ – __)
fill in the blanks
Answered by
GPT 3.5
The missing number in this simplified exponential expression is 7.
Answered by
GPT 3.5
The value of 6.9 - 2^0 is 6.9.
Answered by
GPT 3.5
The Zero Power Rule states that any number (except zero) raised to the power of zero is equal to 1.
Using this rule, we can simplify the expression:
9⋅(−33)^0 + 3/2(8−27^0)
Since anything raised to the power of zero is equal to 1, we can simplify (−33)^0 to 1.
So the expression becomes:
9⋅1 + 3/2(8−1)
Simplifying further,
9 + 3/2(8−1)
8−1 is equal to 7:
9 + 3/2(7)
Now we can solve for the final value:
9 + 3/2 * 7
7 multiplied by 3/2 is 10.5:
9 + 10.5
Adding 9 and 10.5 gives us the final value:
19.5
Using this rule, we can simplify the expression:
9⋅(−33)^0 + 3/2(8−27^0)
Since anything raised to the power of zero is equal to 1, we can simplify (−33)^0 to 1.
So the expression becomes:
9⋅1 + 3/2(8−1)
Simplifying further,
9 + 3/2(8−1)
8−1 is equal to 7:
9 + 3/2(7)
Now we can solve for the final value:
9 + 3/2 * 7
7 multiplied by 3/2 is 10.5:
9 + 10.5
Adding 9 and 10.5 gives us the final value:
19.5
Answered by
GPT 3.5
Applying the Zero Power Rule, we know that any number (except zero) raised to the power of zero is equal to 1.
Therefore, (-33)^0 is equal to 1.
Now, we can simplify the expression:
9⋅1 + 3/2(8−1)
Simplifying further:
9 + 3/2(7)
Now, let's simplify the expression within the parentheses:
9 + 3/2 * 7
7 multiplied by 3/2 is equal to 10.5:
9 + 10.5
Finally, adding 9 and 10.5 gives us the final value:
19.5
So, the equivalent expression is:
9⋅(−33)^0 + 3/2(8−27^0) = 19.5
Therefore, (-33)^0 is equal to 1.
Now, we can simplify the expression:
9⋅1 + 3/2(8−1)
Simplifying further:
9 + 3/2(7)
Now, let's simplify the expression within the parentheses:
9 + 3/2 * 7
7 multiplied by 3/2 is equal to 10.5:
9 + 10.5
Finally, adding 9 and 10.5 gives us the final value:
19.5
So, the equivalent expression is:
9⋅(−33)^0 + 3/2(8−27^0) = 19.5
Answered by
GPT 3.5
Applying the Zero Power Rule, we know that any number (except zero) raised to the power of zero is equal to 1.
Therefore, (-33)^0 is equal to 1.
Now let's simplify the expression:
9⋅1 + 3/2(8−1)
Simplifying within the parentheses:
9 + 3/2(7)
Now let's simplify the expression within the parentheses:
9 + 3/2 * 7
7 multiplied by 3/2 is equal to 10.5:
9 + 10.5
Finally, adding 9 and 10.5 gives us the final value:
19.5
So, the equivalent expression is:
9⋅(−33)^0 + 3/2(8−27^0) = 19.5
Therefore, (-33)^0 is equal to 1.
Now let's simplify the expression:
9⋅1 + 3/2(8−1)
Simplifying within the parentheses:
9 + 3/2(7)
Now let's simplify the expression within the parentheses:
9 + 3/2 * 7
7 multiplied by 3/2 is equal to 10.5:
9 + 10.5
Finally, adding 9 and 10.5 gives us the final value:
19.5
So, the equivalent expression is:
9⋅(−33)^0 + 3/2(8−27^0) = 19.5
Answered by
GPT 3.5
Applying the Zero Power Rule to the expression 9⋅(-33)^0 + 3/2(8−27^0), we get:
(-33)^0 is equal to 1.
So the expression becomes:
9⋅1 + 3/2(8−1)
When we simplify further:
9 + 3/2(7)
Now, let's simplify the expression within the parentheses:
9 + 3/2 * 7
7 multiplied by 3/2 is equal to 10.5:
9 + 10.5
Finally, adding 9 and 10.5 gives us the final value:
19.5
Therefore, the equivalent expression is:
9⋅(-33)^0 + 3/2(8−27^0) = 9 * 1 + 3/2 * (8 - 1) + 32 (8 - 270)
(-33)^0 is equal to 1.
So the expression becomes:
9⋅1 + 3/2(8−1)
When we simplify further:
9 + 3/2(7)
Now, let's simplify the expression within the parentheses:
9 + 3/2 * 7
7 multiplied by 3/2 is equal to 10.5:
9 + 10.5
Finally, adding 9 and 10.5 gives us the final value:
19.5
Therefore, the equivalent expression is:
9⋅(-33)^0 + 3/2(8−27^0) = 9 * 1 + 3/2 * (8 - 1) + 32 (8 - 270)
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