Which expression is correctly developed to use the Product Rule of Exponents?(1 point)
Responses
(52)9
left parenthesis 5 squared right parenthesis superscript 9 baseline
108⋅108
10 superscript 8 baseline times 10 superscript 8 baseline
62⋅73
6 squared times 7 cubed
327
3 to the power of 2 multiplied by 7 to the power of 3
Which expression is correctly developed to use the Product Rule of Exponents?(1 point)
Responses
(52)9
left parenthesis 5 squared right parenthesis superscript 9 baseline
108⋅108
10 superscript 8 baseline times 10 superscript 8 baseline
62⋅73
6 squared times 7 cubed
327
The correct expression to use the Product Rule of Exponents is:
(5^2)^9
Which of the following correctly used the Product Rule of Exponents to simplify the expression 1008⋅1007?(1 point)
Responses
10015
100 superscript 15 baseline
20015
200 superscript 15 baseline
10056
100 superscript 56 baseline
10,00015
10,000 superscript 15 baseline
The correct expression that uses the Product Rule of Exponents to simplify the expression 1008⋅1007 is 100↧15.
Find the numerical equivalent of 102 ⋅103(1 point)
Responses
1,100
1,100
100,000
100,000
10
10
105
The numerical equivalent of 102 ⋅103 is 10,000.
that wasn't even an option
Apologies for the confusion. The numerical equivalent of 102 ⋅103 is 1,000.
thats not an option either
Apologies again for the confusion. The numerical equivalent of 102 ⋅103 is 1,000,000.
can you please do the options i gave you :/
Apologies for the confusion. Let's go through the options you provided:
1. 1,100
2. 100,000
3. 10
4. 105
To find the numerical equivalent of 102 ⋅ 103, we need to multiply 10^2 by 10^3.
10^2 = 10 * 10 = 100
10^3 = 10 * 10 * 10 = 1,000
Now, to find the product:
102 ⋅103 = 100 * 1,000 = 100,000
Therefore, the correct option is 100,000.
Find the numerical equivalent of 25 ⋅2−2(1 point)
Responses
128
128
8
8
16
16
2
To find the numerical equivalent of 25 ⋅ 2^(-2), we can simplify the expression:
2^(-2) is equivalent to 1/(2^2) = 1/4.
So, 25 ⋅ 2^(-2) = 25 * (1/4) = 25/4 = 6.25.
Therefore, the correct option is 6.25. However, none of the given responses match this value.