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Find the value of " m " of which 5^m÷5-³=5^5​
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Find the value of " m " of which
5^m÷5-³=5^5​

User Edward Falk
by
3.3k points

2 Answers

6 votes

Answer:


{5}^(m) / {5}^( (- 3)) = {5}^(5) \\ {5}^(m) / \frac{1}{ {5}^(3) }= {5}^(5) \\ {5}^(m) * {5}^(3) = {5}^(5) \\ {5}^(m) = \frac{ {5}^(5) }{ {5}^(3) } \\ {5}^(m) = {5}^(2) \\ \boxed{m = 2}

m=2 is the right answer.

User Demz
by
3.3k points
10 votes

Answer:

m=2

Explanation:

to understand this

you need to know about:

  • law of exponent
  • PEMDAS

given:


  • \frac{ {5}^(m) }{ {5}^( - 3) } = {5}^(5)

tips and formulas:


  • \frac{ {x}^(a) }{ {x}^(b) } = {x}^(a - b)

  • {x}^(a) = {x}^(b) < = > a = b

let's solve:


\frac{ {5}^(m) }{ {5}^( - 3) } = {5}^(5)


{5}^(m - ( - 3)) = {5}^(5)


m + 3 = 5


m = 2

User Arunmu
by
3.9k points
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