1.03 Negative indices

Identify the base.

Identify the power.

a^{ - 9 }

\dfrac{1}{a^{ - n }}

\dfrac{a^{ - 9 }}{4}

\dfrac{a^{ - n }}{b^{ - m }}

p^{ - 2 }

3 x^{ - 4 }

7 x^{ - 9 }

p^{-2}q^3

8p^{-3}

2x^{-8}y^3

5 y^{9} \times 4 y^{ - 3 }

7 a^{4} \times 4 a^{-2}

5x^4\times \left(-3x^{-8}\right)

3y^{-2}\times 4y^{-3}

2h^{-4}\times 4h^{11}

3y^{-2}\times 2y^{-5}

-4y^2\times \left(-4y^{-5}\right)

\left(5mp\right)^2\times mp^{-2}

\dfrac{9 x^{2}}{3 x^{9}}

\dfrac{15x^3}{5x^7}

\left( 2 m\right)^{ - 3 }

\left(4m^{-6}\right)^4

\left(3p^{-4}\right)^{-2}

\left( 3 y^{2}\right)^{ - 2 }

\left(\dfrac{y}{4}\right)^{ - 3 }

\left(\dfrac{x^{5}}{y^{4}}\right)^{ - 1 }

\left(\dfrac{x^{7}}{y^{9}}\right)^{ - 4 }

\dfrac{20 x^{3}}{4 x^{ - 2 }}

\dfrac{10 x^{ - 7 }}{2 x^{ - 3 }}

\left(\dfrac{z}{3}\right)^{ - 4 }

\left(\dfrac{p^{3}}{q^{7}}\right)^{ - 1 }

\left(\dfrac{x^{-4}}{y^{-8}}\right)^{ - 2 }

2^{-2} \times 24

2 \times 3^{-2}

10 \div 2^{-1} +3

20 \times 2^{-2}+6

3^{-1} + 4^{-1}

3 \times 4^{-2}+5 \times 2^{-4}

10^2 \times 5^{-2}

\left(7+3^2\right)\times 2^{-2}

\dfrac{1}{25} = 5^{n}

\dfrac{1}{8} = 2^{n}

\left( x^{3} y^{ - 5 }\right)^{n} = x^{ - 12 } y^{20}

\left( a^{-5} b^{ 3 }\right)^{n} = a^{ 15 } b^{-9}

2 y^{6} \times 4 y^{7} \times 4 y^{ - 5 }

6 y^{7} \times 2 y^{ - 5 } \times 5 y^{3}

2 x^{-2} \times 5 x^{ 5 } \times 4x^{-5}

12 x^{-9} \times 2 x^{ 4} \times 3x^{-2}

4 y^{3} \times 3 y^{8} \div 2 y^{ - 1 }

8 y^{10} \div 2 y^{ - 4 } \div y^{3}

40 x^{-2} \div 5 x^{8 } \div 4x^{-9}

14 x^{-8} \div 2 x \times 3x^{6}

\left({3x^{-4}\times 2x^2}\right)^{2}

\left({10x^{3}y^{-4}}\right)^{2}

\left(4x^{3}\right)^{-1}\times\left( y^{-2}\right)^{-3}

\left(10x^3\right)^{3}\times\left( 2x^4y^{3}\right)^{-2}

\left(\dfrac{27x^{-3}y^6}{3x^2y^{-2}}\right)^{2}

\left(\dfrac{18n^3m^7}{3mn^2}\right)^{-2}

What is 0^4 equal to?

Explain why 0^{-4} is undefined.