评估 a ² × a ³ × a ^-5

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

Given that : a² x a³ x a^-5

By using product rule

= aⁿ × a^m = a^{n + m}

= a² × a³ × a^-5

= a^{(2 +3)} × a^-5

= a⁵ × a^-5

= a^{{5+ (-5)}}                         {by product rule}

= a^5-5

= a⁰

Zero Rule ⇢ a⁰ = 1

= 1 

Here one can write above equation as,

= {(-4x²)³/ ( y³)³}

Now,

= {(-4)³ × (x²)³} / (y³)³

= {(-64) × (x^{2 × 3})} / y^{3 × 3}                    {Power Rule ⇢ (aⁿ)^m = a^{n × m}}

= -64x⁶/y⁹

Here given a⁹ divided by a³

And use {Quotient Rule ⇢ aⁿ / a^m = a^{n – m}}

So write it as a⁹ / a³

= a^{9 – 3}

= a⁶

Here when bases are different and powers are same. So as per the product rule we can write as aⁿ × bⁿ = (a × b)ⁿ

3² × 4²

= (3 × 4)²

= 12²

= 144

The product of (7x²y³) and (3x⁵y⁸)

= (7x²y³) × (3x⁵y⁸)

= (7x²y³) × (3x⁵y⁸)

= 21 x²x⁵ × y³y⁸

= 21x²⁺⁵ × y³⁺⁸                 {Product Rule ⇢ aⁿ × a^m = a^{n + m}}

= 21x⁷y¹¹