Which of the following is an example of how to develop the Power of Zero Rule of Exponents?(1 point)

Responses

41=4=41=4
Start Fraction 4 over 1 End Fraction equals 4 equals 4 superscript 1 baseline equals 4

7372=73−2=71=7
Start Fraction 7 cubed over 7 squared End Fraction equals 7 superscript 3 minus 2 baseline equals 7 superscript 1 baseline equals 7

2434=24−4=20=1
Start Fraction 2 superscript 4 baseline over 3 superscript 4 baseline End Fraction equals 2 superscript 4 minus 4 baseline equals 2 superscript 0 baseline equals 1

7272=72−2=70=1

11 answers

Start Fraction 7 squared over 7 squared End Fraction equals 7 superscript 2 minus 2 baseline equals 7 superscript 0 baseline equals 1
Question
Which of the following is true?(1 point)
Responses

113113=111
Start Fraction 11 cubed over 11 cubed End Fraction equals 11 superscript 1 baseline

115÷114 =1
11 superscript 5 baseline divided by 11 superscript 4 baseline equals 1

(−11)0=1
left parenthesis negative 11 right parenthesis superscript 0 baseline equals 1

−110 =1
(−11)^0=1
why
This is because any nonzero number raised to the power of zero equals 1. In this case, (-11)^0 is equal to 1.
Apply the Power of Zero Rule of Exponents to solve (a4)(a0)(a5) .(1 point)
Responses

a0
a superscript 0 baseline

a9
a superscript 9 baseline

3a0
3 a superscript 0 baseline

3a9
a^0
What is the value of (23)0 ?(1 point)
Responses

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13
Start Fraction 1 over 3 End Fraction

1
1

0
1
Which of the following statements is false?(1 point)
Responses

−30=1
negative 3 superscript 0 baseline equals 1

3250=1
325 superscript 0 baseline equals 1

(−3)0=1
left parenthesis negative 3 right parenthesis superscript 0 baseline equals 1

0.250=1
0.250 = 1