Simplify a67b34.(1 point)
Responses
ab33
a b superscript 33 baseline
23
23
a33
a superscript 33 baseline
a67b34
13 answers
a67b34
Simplify a67b34.(1 point)
Responses
ab33
a b superscript 33 baseline
23
23
a33
a superscript 33 baseline
a67b34
Start Fraction a superscript 67 baseline over b superscript 34 baseline End Fraction
Responses
ab33
a b superscript 33 baseline
23
23
a33
a superscript 33 baseline
a67b34
Start Fraction a superscript 67 baseline over b superscript 34 baseline End Fraction
a67b34 remains as is. It cannot be simplified further.
Apply the Quotient Rule of Integer Exponents to simplify 2365÷2332.(1 point)
Responses
97
97
2333
23 superscript 33 baseline
133
1 superscript 33 baseline
2397
Responses
97
97
2333
23 superscript 33 baseline
133
1 superscript 33 baseline
2397
To apply the quotient rule of integer exponents, we subtract the exponents when dividing with the same base.
In this case, we have 2365 ÷ 2332.
Since both numbers have the same base (2), we subtract the exponents:
65 - 32 = 33.
Therefore, the simplified form is 2^33, which is equal to 8,589,934,592.
In this case, we have 2365 ÷ 2332.
Since both numbers have the same base (2), we subtract the exponents:
65 - 32 = 33.
Therefore, the simplified form is 2^33, which is equal to 8,589,934,592.
Apply the Quotient Rule of Integer Exponents to simplify 2365÷2332.(1 point)
Responses
97
97
2333
23 superscript 33 baseline
133
1 superscript 33 baseline
23^97
Responses
97
97
2333
23 superscript 33 baseline
133
1 superscript 33 baseline
23^97
To apply the quotient rule of integer exponents, we subtract the exponents when dividing with the same base.
In this case, we have 2365 ÷ 2332.
Since both numbers have the same base (2), we subtract the exponents:
65 - 32 = 33.
Therefore, the simplified form is 23^33.
In this case, we have 2365 ÷ 2332.
Since both numbers have the same base (2), we subtract the exponents:
65 - 32 = 33.
Therefore, the simplified form is 23^33.
Question
Simplify this expression using the Quotient Rule of Integer Exponents: 1253÷753.(1 point)
Responses
12106
12 superscript 106 baseline
1253÷753
12 superscript 53 baseline divided by 7 superscript 53 baseline
553
5 superscript 53 baseline
5^106
Simplify this expression using the Quotient Rule of Integer Exponents: 1253÷753.(1 point)
Responses
12106
12 superscript 106 baseline
1253÷753
12 superscript 53 baseline divided by 7 superscript 53 baseline
553
5 superscript 53 baseline
5^106
To apply the quotient rule of integer exponents, we subtract the exponents when dividing with the same base.
In this case, we have 1253 ÷ 753.
Since both numbers have the same base (5), we subtract the exponents:
53 - 53 = 0.
Therefore, the simplified form is 5^0, which is equal to 1.
In this case, we have 1253 ÷ 753.
Since both numbers have the same base (5), we subtract the exponents:
53 - 53 = 0.
Therefore, the simplified form is 5^0, which is equal to 1.
that's not one of the choices given.
I apologize for the error. Let's try again:
To apply the quotient rule of integer exponents, we subtract the exponents when dividing with the same base.
In this case, we have 1253 ÷ 753.
Since both numbers have the same base (5), we subtract the exponents:
53 - 53 = 0.
Therefore, the simplified form is 5^0, which is equal to 1.
To apply the quotient rule of integer exponents, we subtract the exponents when dividing with the same base.
In this case, we have 1253 ÷ 753.
Since both numbers have the same base (5), we subtract the exponents:
53 - 53 = 0.
Therefore, the simplified form is 5^0, which is equal to 1.
Once again there isn't a choice like that, this are the choices:
1. 12106
12 superscript 106 baseline
2. 1253÷753
12 superscript 53 baseline divided by 7 superscript 53 baseline
3. 553
5 superscript 53 baseline
4. 5^106
1. 12106
12 superscript 106 baseline
2. 1253÷753
12 superscript 53 baseline divided by 7 superscript 53 baseline
3. 553
5 superscript 53 baseline
4. 5^106
I apologize for the confusion. Let's go through the options again.
To simplify 1253 ÷ 753 using the quotient rule of integer exponents:
We can rewrite 1253 as 5^3 * 7^2 and 753 as 3^2 * 7^2.
Using the quotient rule, we subtract the exponents of each factor with the same base:
(5^3 * 7^2) / (3^2 * 7^2)
= 5^(3-2) * 7^(2-2)
= 5^1 * 7^0
= 5 * 1
= 5.
Therefore, the simplified form using the quotient rule of integer exponents is 5.
Out of the given choices, the closest option is:
3. 553
5 superscript 53 baseline
To simplify 1253 ÷ 753 using the quotient rule of integer exponents:
We can rewrite 1253 as 5^3 * 7^2 and 753 as 3^2 * 7^2.
Using the quotient rule, we subtract the exponents of each factor with the same base:
(5^3 * 7^2) / (3^2 * 7^2)
= 5^(3-2) * 7^(2-2)
= 5^1 * 7^0
= 5 * 1
= 5.
Therefore, the simplified form using the quotient rule of integer exponents is 5.
Out of the given choices, the closest option is:
3. 553
5 superscript 53 baseline
3 answers