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Find the quotient. (5^6)/(5^5)

Find the quotient. (5^6)/(5^5)
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2 votes
Find the quotient.


(5^6)/(5^5)

User Geekt
by
7.9k points

2 Answers

3 votes
to the risk of sounding redundant.


\bf a^(-n) \implies \cfrac{1}{a^n} \qquad \qquad \cfrac{1}{a^n}\implies a^(-n) \qquad \qquad a^n\implies \cfrac{1}{a^(-n)} \\\\ -------------------------------\\\\ \cfrac{5^6}{5^5}\implies 5^6\cdot 5^(-5)\implies 5^(6-5)\implies 5^1\implies 5
User Remi Lemarchand
by
8.2k points
1 vote
We can solve this problem by using the laws of exponents. The laws of exponents state:


(x^(n) )/(x^(y) ) =
x^(n-y)

We can use this law in our situation. The answer here, using the laws of exponents, is
5^(6-5) or 5.
User Nazrul Islam
by
8.5k points
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