To apply the zero-power rule of integer exponents to solve 630, we need to rewrite 630 with an exponent of 0.
630 can be written as 630^1 since any number raised to the power of 1 is itself.
Using the zero-power rule of integer exponents, any number raised to the power of 0 is equal to 1. Therefore,
630^0 = 1.
So, 630 to the power of 0 is equal to 1.
Apply the Zero Power Rule of Integer Exponents to solve 630
16 answers
Apply the Zero Power Rule of Integer Exponents to solve 2.3+(−1.478)0
The zero power rule of integer exponents states that any non-zero number raised to the power of 0 is equal to 1.
In the expression 2.3 + (-1.478)^0, we have (-1.478)^0. Since -1.478 is non-zero, we can apply the zero power rule to simplify this expression.
(-1.478)^0 = 1
Therefore, the expression 2.3 + (-1.478)^0 simplifies to:
2.3 + 1 = 3.3
In the expression 2.3 + (-1.478)^0, we have (-1.478)^0. Since -1.478 is non-zero, we can apply the zero power rule to simplify this expression.
(-1.478)^0 = 1
Therefore, the expression 2.3 + (-1.478)^0 simplifies to:
2.3 + 1 = 3.3
Apply the Zero Power Rule of Integer Exponents to solve −40⋅15.
The zero power rule of integer exponents does not apply to the expression −40⋅15.
The zero power rule only applies when a number is raised to the power of 0. In this case, we have a multiplication expression (-40)⋅15, and there is no exponent involved.
So, there is no need to apply the zero power rule in this case.
To solve the expression −40⋅15, you simply need to perform the multiplication:
−40⋅15 = -600
The zero power rule only applies when a number is raised to the power of 0. In this case, we have a multiplication expression (-40)⋅15, and there is no exponent involved.
So, there is no need to apply the zero power rule in this case.
To solve the expression −40⋅15, you simply need to perform the multiplication:
−40⋅15 = -600
that is incorrect
I apologize for the mistake. I misunderstood your question.
To apply the zero power rule of integer exponents, we need to rewrite (-40)⋅15 as a base raised to the power of 0.
We can write (-40)⋅15 as (-40)⋅15^1 since any number raised to the power of 1 is itself.
Now, applying the zero power rule, we have:
(-40)⋅15^0 = (-40)⋅1
Any number multiplied by 1 is equal to itself. Therefore:
(-40)⋅1 = -40
So, (-40)⋅15^0 simplifies to -40.
To apply the zero power rule of integer exponents, we need to rewrite (-40)⋅15 as a base raised to the power of 0.
We can write (-40)⋅15 as (-40)⋅15^1 since any number raised to the power of 1 is itself.
Now, applying the zero power rule, we have:
(-40)⋅15^0 = (-40)⋅1
Any number multiplied by 1 is equal to itself. Therefore:
(-40)⋅1 = -40
So, (-40)⋅15^0 simplifies to -40.
Apply the Zero Power Rule to create an equivalent expression to 43(−2+10).
To apply the Zero Power Rule to create an equivalent expression to 43(−2+10), we need to raise the expression −2+10 to the power of 0.
According to the Zero Power Rule, any non-zero expression raised to the power of 0 is equal to 1.
Therefore, 43(−2+10) is equivalent to 43(1), since (−2+10)^0 equals 1.
So, the equivalent expression is 43.
According to the Zero Power Rule, any non-zero expression raised to the power of 0 is equal to 1.
Therefore, 43(−2+10) is equivalent to 43(1), since (−2+10)^0 equals 1.
So, the equivalent expression is 43.
Solve the expression 2(1.60+7)−4.9
To solve the expression 2(1.60+7)−4.9, we need to follow the order of operations (also known as PEMDAS).
1. First, we need to simplify the expression inside parentheses: 1.60 + 7 = 8.60.
2. Next, we multiply 2 by the result from step 1: 2 * 8.60 = 17.20.
3. Then, we subtract 4.9 from the result of step 2: 17.20 - 4.9 = 12.30.
So, the solution to the expression is 12.30.
1. First, we need to simplify the expression inside parentheses: 1.60 + 7 = 8.60.
2. Next, we multiply 2 by the result from step 1: 2 * 8.60 = 17.20.
3. Then, we subtract 4.9 from the result of step 2: 17.20 - 4.9 = 12.30.
So, the solution to the expression is 12.30.
Which of the following is developed to result in the answer of 1?(1 point)
Responses
3(80)
3 left parenthesis 8 superscript 0 baseline right parenthesis
50+90
5 superscript 0 baseline plus 9 superscript 0 baseline
13−(7.42)0
13 minus left parenthesis 7.42 right parenthesis superscript 0 baseline
(−2.97)0
Responses
3(80)
3 left parenthesis 8 superscript 0 baseline right parenthesis
50+90
5 superscript 0 baseline plus 9 superscript 0 baseline
13−(7.42)0
13 minus left parenthesis 7.42 right parenthesis superscript 0 baseline
(−2.97)0
The expression that is developed to result in the answer of 1 is:
(−2.97)^0
(−2.97)^0
Which of the following shows the correct process of solving −30+4.5?(1 point)
Responses
−30+4.5=(−3)0+4.5=1+4.5=5.5
negative 3 superscript 0 baseline plus 4.5 equals left parenthesis negative 3 right parenthesis superscript 0 baseline plus 4.5 equals 1 plus 4.5 equals 5.5
−30+4.5=−3+4.5=1.5
negative 3 superscript 0 baseline plus 4.5 equals negative 3 plus 4.5 equals 1.5
−30+4.5=−1⋅30+4.5=−1⋅1+4.5=−1+4.5=3.5
negative 3 superscript 0 baseline plus 4.5 equals negative 1 times 3 superscript 0 baseline plus 4.5 equals negative 1 dot 1 plus 4.5 equals negative 1 plus 4.5 equals 3.5
−30+4.5=−3⋅0+4.5=0+4.5=4.5
Responses
−30+4.5=(−3)0+4.5=1+4.5=5.5
negative 3 superscript 0 baseline plus 4.5 equals left parenthesis negative 3 right parenthesis superscript 0 baseline plus 4.5 equals 1 plus 4.5 equals 5.5
−30+4.5=−3+4.5=1.5
negative 3 superscript 0 baseline plus 4.5 equals negative 3 plus 4.5 equals 1.5
−30+4.5=−1⋅30+4.5=−1⋅1+4.5=−1+4.5=3.5
negative 3 superscript 0 baseline plus 4.5 equals negative 1 times 3 superscript 0 baseline plus 4.5 equals negative 1 dot 1 plus 4.5 equals negative 1 plus 4.5 equals 3.5
−30+4.5=−3⋅0+4.5=0+4.5=4.5
The correct process of solving −30+4.5 is:
−30+4.5=−30+4.5=−25.5
−30+4.5=−30+4.5=−25.5
Question
Apply the Zero Power Rule to create an equivalent expression to 4/3 (-2+1^0)
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problem -> An equivalent expression to 4/3 (-2+1^0 is 4/3 (-2+_ )
Apply the Zero Power Rule to create an equivalent expression to 4/3 (-2+1^0)
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problem -> An equivalent expression to 4/3 (-2+1^0 is 4/3 (-2+_ )