以指数形式化简 25/2 ^-6

Power is a value or an expression that represents repeated multiplication of the same number or factor. Number of times the base is multiplied to itself is the value of the exponent.

2 × 2 × 2 × 2 × …..n times = 2ⁿ

b^p =  {b × b × b × b × ….  × b} p times

b^p1 × b^p2 = b^(p1+p2)

b^p1 ÷ b^p2 = b^p1/ b^p2 = b^(p1-p2)

b^-p = 1/b^p

Product Rule ⇢ aⁿ × a^m = a^{n + m}

Quotient Rule ⇢ aⁿ / a^m = a^{n – m}

Power Rule ⇢ (aⁿ)^m = a^{n × m} or ^m√aⁿ = a^n/m

Negative Exponent Rule ⇢ a^-m = 1/a^m

Zero Rule ⇢ a⁰ = 1

One Rule ⇢ a¹ = a

25 / 2^-6 = 25 * (1/2^-6) {Negative Exponent Rule ⇢ a^-m = 1/a^m}

             = 5² * (2⁶)
Here bases are different and powers are same

So as per the product rule we can write as aⁿ × bⁿ = (a × b)ⁿ

            = 5² * 2² * 2² * 2²

                = 40²

 27 * 3² = 3³ × 3²

             = 3⁽³⁺²⁾   (Product Rule ⇢ aⁿ × a^m = a^{n + m})

             = 3⁵

5⁸ × (8/5)⁵= 5⁸ * (8⁵ / 5⁵)

                 = 5^8-5 * 8⁵  [Quotient Rule ⇢ aⁿ / a^m = a^{n – m}]

                        = 5³*2^3*5

                 = 5³ * 32³

                 = 160³

Here when bases are different and powers are same

So as per the product rule we can write as aⁿ × bⁿ = (a × b)ⁿ

4² × 36 = (4 × 6)² = 24²