Powers

Numbers: Powers and roots

Powers

Exponentiation

We can repeatedly multiply a number by itself. We write this as follows:

\[\begin{array}{rclrc}\blue2^\orange0&&&=&1\\\blue2^\orange1&=&\blue2&=&2\\\blue2^\orange2&=&\blue2 \times \blue2&=&4\\\blue2^\orange3&=&\blue2 \times \blue2 \times \blue2&=&8 \\ \blue2^\orange4&=&\blue2 \times \blue2 \times \blue2 \times \blue2& =&16\end{array}\]

We call #\blue2^\orange3# a power.

Here, we call #\blue2# the #\blue{\text{base}}# of the power. This number is multiplied by itself repeatedly.

We call #\orange3# the #\orange{\text{exponent}}#. This number indicates how many times the #\blue{\text{base}}# is multiplied by itself.

Examples

\[\begin{array}{rcl}\blue5^\orange4&=&\blue5 \times \blue5 \times \blue5 \times \blue5 \\ &=& 625 \\ \\ \blue3^\orange2&=&\blue3 \times \blue3 \\ &=& 9\\ \\ \blue{10}^\orange3&=&\blue{10} \times \blue{10} \times \blue{10} \\ &=&1000 \\ \\ (\blue{-4})^\orange4&=&\blue{-4} \times \blue{-4} \times \blue{-4} \times \blue{-4} \\ &=&256\end{array}\]

Minus signs

When working with powers, we must pay attention to whether the minus signs are part of the base. We indicate this with parentheses.

\begin{array}{rcr}(\blue{-2})^\orange4&=&\blue{-2} \times \blue{-2} \times \blue{-2} \times \blue{-2}&=&16\\-\blue{2}^\orange4&=&-(\blue 2 \times \blue 2 \times \blue 2 \times \blue 2)=-(16)&=&-16\end{array}

Therefore:

\[(\blue{-2})^\orange4 \red{\ne}-\blue{2}^\orange4\]

Calculate #6^3#.

#6^3 = # # 216#

#\begin{array}{rcl}
6^3 &=&6 \cdot 6 \cdot 6\\ & &\phantom{xxx}\blue{\text{exponentiation is repeated multiplication}}\\
&=& 216\\
&&\phantom{xxx}\blue{\text{multiplied}}
\end{array}#

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