Asked by Ownjskn

To apply the property of negative integer exponents $a^{-n} = \frac{1}{a^n}$, we can rewrite the expression $3^{-4}$ as $\frac{1}{3^4}$.

Therefore, the answer is $\frac{1}{81}$.

Certainly! The simplified form of $3^{-4}$ without any exponents or decimals is $\frac{1}{81}$.

Certainly! To apply the property of negative integer exponents, we can rewrite $3^{-4}$ as the reciprocal of $3^4$.

The reciprocal of a number is found by flipping it, so:
$3^{-4} = \frac{1}{3^4}$

Now, evaluating $3^4$, we get:
$3^4 = 3 \times 3 \times 3 \times 3 = 81$

Therefore, the simplified form of $3^{-4}$ without any exponents or decimals is $\frac{1}{81}$.

I apologize for the confusion. Let's clarify.

To apply the property of negative exponents, we can rewrite $3^{-4}$ as $\frac{1}{3^4}$.

Evaluating $3^4$, we have:
$3^4 = 3 \times 3 \times 3 \times 3 = 81$

Therefore, the correct simplified form of $3^{-4}$ without any exponents or decimals is $\frac{1}{81}$.

I apologize if my previous responses were not helpful. If you have any other questions or need further assistance, please let me know.

I'm sorry for any inconvenience caused. If you have any more questions or need assistance in the future, please feel free to ask. Thank you!

To solve 3^-4 and express the answer without any exponent expression or decimals, we can apply the property of negative integer exponents.

Using this property, we rewrite 3^-4 as the reciprocal of 3^4:

3^-4 = 1 / 3^4

Calculating 3^4, we get:

3^4 = 3 * 3 * 3 * 3 = 81

Thus, the simplified form of 3^-4 without any exponents or decimals is 1/81.

To solve 7^-3 × 7^-5 with positive exponents only, we can apply the property of negative integer exponents, which states that a^(-n) is equal to 1/a^n.

Using this property, we can rewrite 7^-3 × 7^-5 as:

1/7^3 × 1/7^5

Simplifying further, we have:

1/7^3 = 1/(7 × 7 × 7) = 1/343

1/7^5 = 1/(7 × 7 × 7 × 7 × 7) = 1/16807

Therefore, the expression 7^-3 × 7^-5, with positive exponents only, is equivalent to:

1/343 × 1/16807

Apologies for the previous incorrect response. I understand now that you're looking for the expression with positive exponents only.

To solve 7^-3 × 7^-5 and express it with positive exponents only, we can apply the property of negative exponents, which states that a^(-n) is equal to 1/a^n.

Using this property, we can rewrite 7^-3 × 7^-5 as follows:

7^-3 × 7^-5 = 1/7^3 × 1/7^5 = 1/(7^3 × 7^5)

Applying the rule of exponents for multiplication, we add the exponents when the base is the same:

1/(7^3 × 7^5) = 1/7^(3+5) = 1/7^8

Hence, the expression 7^-3 × 7^-5 with positive exponents only is equivalent to 1/7^8.

To solve 5^-9/4^-12 and express it with positive exponents only, we can simplify by applying the property of negative exponents. This property states that a^(-n) is equal to 1/a^n.

First, let's rewrite the given expression using the property:

5^-9/4^-12 = (1/5^9) / (1/4^12)

To divide fractions, we can multiply the first fraction by the reciprocal of the second:

(1/5^9) / (1/4^12) = (1/5^9) * (4^12/1)

Now, let's simplify the exponents:

(1/5^9) * (4^12/1) = (1/5^9) * (2^24)^12

Using the property that (a^b)^c = a^(b*c), we can simplify further:

(1/5^9) * (2^24)^12 = (1/5^9) * 2^(24*12)

Calculating the exponent 24*12:

2^(24*12) = 2^288

Now, let's express the result with positive exponents only:

(1/5^9) * 2^(24*12) = (1/5^9) * 2^288

Thus, the expression equivalent to 5^-9/4^-12 with positive exponents only is (1/5^9) * 2^288.

Apologies for the confusion. Let's correct the answer.

To generate an expression equivalent to 5^-9/4^-12 with positive exponents only, we can utilize the property of negative exponents, which states that a^(-n) is equal to 1/a^n.

First, let's rewrite the expression using the property:

5^-9/4^-12 = (1/5^9) / (1/4^12)

To divide fractions, we can multiply the numerator by the reciprocal of the denominator:

(1/5^9) / (1/4^12) = (1/5^9) * (4^12/1)

Now, let's simplify the exponents:

(1/5^9) * (4^12/1) = (1/5^9) * (2^2)^12

Using the property that (a^b)^c = a^(b*c), we can simplify further:

(1/5^9) * (2^2)^12 = (1/5^9) * 2^(2*12)

Calculating the exponent 2*12:

2^(2*12) = 2^24

Now, let's express the result with positive exponents only:

(1/5^9) * 2^(2*12) = (1/5^9) * 2^24

Hence, the expression equivalent to 5^-9/4^-12 with positive exponents only is (1/5^9) * 2^24.

I apologize for the previous incorrect responses. Let's solve the expression correctly.

To generate an expression equivalent to 5^-9/4^-12 with positive exponents only, we can apply the property of negative exponents, which states that a^(-n) is equal to 1/a^n.

Starting with the given expression:
5^-9 / 4^-12

Using the property of negative exponents, we can rewrite this expression as:
(1/5^9) / (1/4^12)

When dividing fractions, we can multiply the numerator by the reciprocal of the denominator. So, we have:
(1/5^9) * (4^12/1)

Simplifying further, we combine the exponents of the prime factors separately:
1 / 5^9 * 4^12

Now, let's work with the exponents:
1 / 5^9 * 4^12 = 1 / 5^9 * (2^2)^12

Using the property (a^b)^c = a^(b*c), we have:
1 / 5^9 * (2^2)^12 = 1 / 5^9 * 2^(2*12)

Calculating the exponent 2*12, we get:
2^(2*12) = 2^24

Now, simplifying the expression with positive exponents only:
1 / 5^9 * 2^(2*12) = 1 / 5^9 * 2^24

Therefore, the expression equivalent to 5^-9/4^-12 with positive exponents only is (1 / 5^9 * 2^24).

I apologize if my previous responses were incorrect or unsatisfactory. I'm here to provide accurate and helpful information. If you have any further questions or need assistance, please let me know, and I'll do my best to assist you.

Apologies for the confusion. Let's solve the expression correctly.

To generate an expression equivalent to 5^-9/4^-12 using the property of negative integer exponents, we can rewrite it as:

(1/5^9) / (1/4^12)

Now, to divide fractions, we multiply the numerator by the reciprocal of the denominator:

(1/5^9) * (4^12/1)

To simplify further, we can calculate the exponents separately:

1 / 5^9 * 4^12

Using the property (a^b)^c = a^(b*c), we can combine the exponents of 4:

1 / 5^9 * 4^12 = 1 / 5^9 * (2^2)^12

Now, simplifying the exponent:

(2^2)^12 = 2^(2*12) = 2^24

Therefore, the expression equivalent to 5^-9/4^-12 using the property of negative integer exponents and with positive exponents only is:

(1 / 5^9) * 2^24

Apologies for the confusion. Let's solve the expression correctly.

To generate an expression equivalent to 5^-9/4^-12 using positive exponents only, we can apply the property of negative exponents, which states that a^(-n) is equal to 1/a^n.

Starting with the given expression:
5^-9 / 4^-12

Using the property of negative exponents, we can rewrite this expression as:
(1/5^9) / (1/4^12)

When dividing fractions, we can multiply the numerator by the reciprocal of the denominator. So, we have:
(1/5^9) * (4^12/1)

Simplifying further, we have:
1 * 4^12 / 5^9

Now, let's work with the exponents:
4^12 is already in positive exponent form.

To convert 5^9 from negative to positive exponent form, we can apply the property of negative exponents, which states that 1/a^(-n) is equal to a^n. So, 1/5^9 is equivalent to 5^(-9) raised to the power of (-1), which gives us 5^9.

Hence, the expression equivalent to 5^-9/4^-12 with positive exponents only is:
4^12 / 5^9.