Approximation error

Given some value a and an approximation b of a, the absolute error is

${\displaystyle \epsilon =|a-b|\,}$ 

the relative error is

${\displaystyle \eta ={\frac {|a-b|}{|a|}}}$ 

if ${\displaystyle |a|\neq 0}$  and the percent error is

${\displaystyle \delta ={\frac {|a-b|}{|a|}}\times {}100\%}$ 

where the vertical bars denote the absolute value, a represents the true value, and b represents the approximation to a.

Where ${\displaystyle \left\|a\right\|_{p}}$  is the p-norm of vertex a, and ${\displaystyle {\hat {x}}}$  is an approximation of vertex x where ${\displaystyle x\in \mathbb {R} ^{n}}$ .

• ${\displaystyle \epsilon =\left\|{\hat {x}}-x\right\|_{2}}$ 
• ${\displaystyle \eta ={\frac {\left\|{\hat {x}}-x\right\|_{2}}{\left\|x\right\|_{2}}}}$ 
• ${\displaystyle \left\lceil -\operatorname {log} _{10}\left({\frac {\left\|{\hat {x}}-x\right\|_{\infty }}{\left\|x\right\|_{\infty }}}\right)\right\rceil }$  is the number of Significant figures of the largest magnitude entry of x.^[1]

When calculating using approximate values it is important to be able to calculate the errors involved.

For measured values X & Y with absolute errors ${\displaystyle \epsilon x\,}$  & ${\displaystyle \epsilon y\,}$  and relative errors ${\displaystyle \eta x\,}$  & ${\displaystyle \eta y\,}$  respectively, we can use:

• For ${\displaystyle Z=X+Y\,}$ :

${\displaystyle \epsilon z=\epsilon x+\epsilon y\,}$ 

• For ${\displaystyle Z=X-Y\,}$ ::

${\displaystyle \epsilon z=|\epsilon x-\epsilon y|\,}$ 

• For ${\displaystyle Z=X\times Y\,}$ :

${\displaystyle \eta z=\eta x+\eta y\,}$ 

• For ${\displaystyle Z=X/Y\,}$ :

${\displaystyle \eta z=|\eta x-\eta y|\,}$