Use the Negative Exponent Rule to generate an equivalent expression to 3−14
The negative exponent rule states that for any nonzero number "a", a^-n = 1/a^n.
Using this rule, we can rewrite 3^(-14) as 1/3^14.
Therefore, an equivalent expression to 3^(-14) is 1/3^14.
use the negative exxponent rule to generate an equivalent expression to 3 -1/2
To use the Negative Exponent Rule to generate an equivalent expression to 3^(-14), we can rewrite it as the reciprocal of the positive exponent.
The Negative Exponent Rule states that a^(-n) = 1 / a^n, where "a" is the base and "n" is the exponent.
Applying this rule to 3^(-14), we have:
3^(-14) = 1 / 3^14
So, an equivalent expression to 3^(-14) using the Negative Exponent Rule is 1 / 3^14.
To generate an equivalent expression using the negative exponent rule for 3^(-14), we need to apply the following rule:
a^(-n) = 1 / a^n
Using this rule, we can rewrite 3^(-14) as:
1 / 3^14
Therefore, the equivalent expression to 3^(-14) using the negative exponent rule is 1 / 3^14.