Exponent: Difference between revisions

An exponent is one of those tiny numbers at the upper right that means you have to multiply something that number of times: for example, ${\displaystyle 5^{3}}$ means 5 multiplied by itself 3 times or ${\displaystyle 5\times 5\times 5;}$ the number 3 is called the exponent.

Extension of exponents to fractional and negative values

Originally, exponents were natural numbers: it's easy to see the meaning of an expression such as ${\displaystyle 10^{3}=10\times 10\times 10.}$ Rules for adding and multiplying exponents were noticed, and to extend the idea to fractions and negative numbers it was assumed that the same rules would apply. To define a meaning for a fractional value such as ${\displaystyle 10^{\frac {1}{2}},}$ consider that, using a rule for multiplying exponents,

${\displaystyle (10^{\frac {1}{2}})^{2}=10^{{\frac {1}{2}}\times 2}=10^{1}=10}$

Therefore ${\displaystyle 10^{\frac {1}{2}}}$ must be ${\displaystyle {\sqrt {10}}.}$ Values for many other numbers can be worked out similarly using cube roots and so on, and values for all real numbers can then be defined using limits.

To assign meaning to negative values of exponents, note the rule that

${\displaystyle b^{x}b^{y}=b^{x+y}.}$

So, for example, to find the meaning of ${\displaystyle 10^{-3},}$ consider

${\displaystyle 10^{-3}\times 10^{4}=10^{-3+4}=10^{1}=10}$

Therefore,

${\displaystyle 10^{-3}={\frac {10}{10^{4}}}=0.001}$

By a similar argument it can be established that ${\displaystyle b^{0}=1}$ for any base ${\displaystyle b>1.}$

See also

• Logarithm