So the rule with multiplying exponents of the same base is [tex] x^m*x^n=x^{m+n} [/tex] . Apply this rule here:
[tex] 7^{-\frac{5}{6}}*7^{-\frac{7}{6}}=7^{-\frac{5}{6}+{-\frac{7}{6}}}=7^{-\frac{12}{6}}=7^{-2} [/tex]
Next, the rule with converting negative exponents into positive ones is [tex] x^{-m}=\frac{1}{x^m} [/tex] . Apply this rule here:
[tex] 7^{-2}=\frac{1}{7^2}=\frac{1}{49} [/tex]
Your final answer is 1/49.
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So an additional rule when it comes to exponents is [tex] x^{\frac{m}{n}}=\sqrt[n]{x^m} [/tex]
In this case, your fractional exponent, x^9/7, would be converted to [tex] \sqrt[7]{x^9} [/tex] . However, I had just realized you can further expand this.
Remember the rule I had mentioned earlier about multiplying exponents of the same base? Well, you can apply it here:
[tex] \sqrt[7]{x^9}=\sqrt[7]{x^7*x^2}=x\sqrt[7]{x^2} [/tex]
Your final answer would be [tex] x\sqrt[7]{x^2} [/tex]
