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Table:
Definitions - Certainty, risk, and uncertainty Introduction: These definitions are consistent with those commonly used, e.g. Taha [1987, page 428]. |
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Certainty |
Risk |
Uncertainty |
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Implies perfect information. All relevant information to
the problem is known. |
Implies partial information. Some of all the relevant
information to the problem is stochastic. |
Implies incomplete information. Some of all the relevant
information to the problem is missing. |
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Variables (x) are known with certainty:
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Variables
may include certainty variables but at least one variable is random and
represented by a probability density function (PDF):
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Variables may include risk variables but now at least one
is either unknown or cannot be determined: Xu is unknown. Something is influencing the
problem but we do not know what it is. In statistical tests this compares to
the influence of the residuals. Xi is known but its value is indeterminate. It
can’t be reasonably approximated with a PDF. |
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- Copyright 1997-2008, ViamInvest. Reproduced with permission of the copyright owner. Further reproduction prohibited without permission. Legal notice. |
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if qualitative it may either be present with certainty or
not be present.
or it may not occur, with probability (1-p).