Apply the Property of Negative Integer Exponents to solve 3−^4. The answer should not contain any exponent expression or decimals
To apply the Property of Negative Integer Exponents, we can rewrite 3^-4 as 1/3^4 since a negative exponent indicates that the base is in the denominator.
Therefore, 3^-4 = 1/3^4.
The answer, without any exponent expression or decimals, is 1/81.
To apply the property of negative integer exponents, we can rewrite the expression 3^(-4) as 1/(3^4). This means that 3^(-4) is equal to the reciprocal of 3^4.
Now, let's find the value of 3^4.
3^4 = 3 * 3 * 3 * 3 = 81.
Since 3^(-4) is equal to 1/(3^4), we can substitute 3^4 as 81 and simplify:
3^(-4) = 1/(3^4) = 1/81.
Therefore, the answer is 1/81, and it does not contain any exponent expression or decimals.
To solve 3^(-4) using the property of negative integer exponents, we need to remember the following rule:
For any nonzero number "a," the expression a^(-n) is equal to 1/a^n.
Now, applying this rule to 3^(-4), we can rewrite it as 1/3^4.
Next, we can evaluate 3^4, which means multiplying 3 by itself four times: 3 * 3 * 3 * 3. This is equal to 81.
So, 3^(-4) is equivalent to 1/81.
Therefore, the answer to 3^(-4) is 1/81, which is a fraction and does not contain any exponent expression or decimals.