# >This is a nearest-neighbor analysis of the Bodmin Tors in B&G. Notes d"""""""""" "6 d BC:CCeC?PL(u^ # nn-dist  c*Distance to nearest neighbor for each tree;3Notes("Distance to nearest neighbor for each tree")  ?`A7?`A7?1&x?O;dZ@KƧ?7KƧ?`A7?`A7?vȴ?$/?$/?7KƧ?7KƧ?7KƧ?7KƧ?/w?`A7?`A7?땁$/?땁$/? =p?1&x?I^5?}? =p?-? =p?-?1&x?"`?QR?vȴ?7KƧ?7KƧ?tj~?`A7log-dist cLog of nn-distBFormula(Log( :Name("nn-dist")))Notes("Log of nn-dist")  ?,b?,b??(?fB|:?D{>)ƟRҐƟRҐ⿝y-WArtLrtL####?eʎȿƟRҐƟRҐ [{ [{?x?Q%? F!2? K2? K??TpgK ?G#ry-WAss?KֵW?,barea c*Area of Redwood Plot (computed in INFOMAP)MFormula(206.6)3Notes("Area of Redwood Plot (computed in INFOMAP)")  @i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333@i33333lam cIntensity parameter@Formula(NRow() / :area)Notes("Intensity parameter")  ?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?q?ů5?qmu cEstimated mean under HoJFormula(1 / (2 * Sqrt( :lam))) Notes("Estimated mean under Ho")  ?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?op?opsig c&Standard Deviation of nn-dist under Hov;Formula(Sqrt((4 - Pi()) / (((4 * :lam) * Pi()) * NRow())))/Notes("Standard Deviation of nn-dist under Ho")  ?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDA?zDAs-mean cSample Mean of nn-distO$Formula(Col Mean( :Name("nn-dist")))Notes("Sample Mean of nn-dist")  ?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{?{Z c,Standardized Sample Mean of nn-dist under Hok*Formula(( :Name("s-mean") - :mu) / :sig)5Notes("Standardized Sample Mean of nn-dist under Ho")  O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O<O< P-value(2) ccvP-value for a two-tailed test of Ho, i.e. the probability of getting a value at least this far from the mean under Ho.0Formula(2 * (1 - Normal Distribution(Abs( :Z))))Notes("P-value for a two-tailed test of Ho, i.e. the probability of getting a value at least this far from the mean under Ho.")  ?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX?-ԑX P-value(1) c0dP-value for a one-tailed test of Ho, i.e. the probability of getting a value of Z this low under Ho.!Formula(Normal Distribution( :Z))mNotes("P-value for a one-tailed test of Ho, i.e. the probability of getting a value of Z this low under Ho.")  ?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV?-ԑV