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Calculate geodesic distance (in meters) between two points specified by latitude/longitude using Vincenty inverse formula for ellipsoids.
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| <?php | |
| /** | |
| * Calculate geodesic distance (in meters) between two points specified by | |
| * latitude/longitude using Vincenty inverse formula for ellipsoids | |
| * | |
| * from: Vincenty inverse formula - T Vincenty, "Direct and Inverse | |
| * Solutions of Geodesics on the Ellipsoid with application of nested | |
| * equations", Survey Review, vol XXII no 176, 1975 | |
| * http://www.ngs.noaa.gov/PUBS_LIB/inverse.pdf | |
| * | |
| * Ported from JavaScript to PHP Martin Milesich - http://milesich.com | |
| * | |
| * Original JavaScript version | |
| * http://www.movable-type.co.uk/scripts/latlong-vincenty.html | |
| * | |
| * @param float $lat1 in form 52.2166667 | |
| * @param float $lat2 in form 52.35 | |
| * @param float $lon1 in form 5.9666667 | |
| * @param float $lon2 in form 4.9166667 | |
| * @return float in form 73.174873 (meters) | |
| */ | |
| function distVincenty($lat1, $lon1, $lat2, $lon2) | |
| { | |
| $lat1 = deg2rad($lat1); | |
| $lat2 = deg2rad($lat2); | |
| $lon1 = deg2rad($lon1); | |
| $lon2 = deg2rad($lon2); | |
| $a = 6378137; $b = 6356752.3142; $f = 1/298.257223563; // WGS-84 ellipsoid | |
| $L = $lon2 - $lon1; | |
| $U1 = atan((1-$f) * tan($lat1)); | |
| $U2 = atan((1-$f) * tan($lat2)); | |
| $sinU1 = sin($U1); $cosU1 = cos($U1); | |
| $sinU2 = sin($U2); $cosU2 = cos($U2); | |
| $lambda = $L; $lambdaP = 2 * M_PI; | |
| $iterLimit = 20; | |
| while (abs($lambda - $lambdaP) > 1e-12 && --$iterLimit > 0) | |
| { | |
| $sinLambda = sin($lambda); | |
| $cosLambda = cos($lambda); | |
| $sinSigma = sqrt(($cosU2 * $sinLambda) * ($cosU2 * $sinLambda) + | |
| ($cosU1 * $sinU2 - $sinU1 * $cosU2 * $cosLambda) * | |
| ($cosU1 * $sinU2 - $sinU1 * $cosU2 * $cosLambda)); | |
| if ($sinSigma == 0) return 0; // co-incident points | |
| $cosSigma = $sinU1 * $sinU2 + $cosU1 * $cosU2 * $cosLambda; | |
| $sigma = atan2($sinSigma, $cosSigma); // was atan2 | |
| $alpha = asin($cosU1 * $cosU2 * $sinLambda / $sinSigma); | |
| $cosSqAlpha = cos($alpha) * cos($alpha); | |
| $cos2SigmaM = $cosSigma - 2 * $sinU1 * $sinU2 / $cosSqAlpha; | |
| $C = $f / 16 * $cosSqAlpha * (4 + $f * (4 - 3 * $cosSqAlpha)); | |
| $lambdaP = $lambda; | |
| $lambda = $L + (1 - $C) * $f * sin($alpha) * | |
| ($sigma + $C * $sinSigma * ($cos2SigmaM + $C * $cosSigma * | |
| (-1 + 2 * $cos2SigmaM * $cos2SigmaM))); | |
| } | |
| if ($iterLimit == 0) return false; // formula failed to converge | |
| $uSq = $cosSqAlpha * ($a * $a - $b * $b) / ($b * $b); | |
| $A = 1 + $uSq / 16384 * (4096 + $uSq * (-768 + $uSq * (320 - 175 * $uSq))); | |
| $B = $uSq / 1024 * (256 + $uSq * (-128 + $uSq * (74 - 47 * $uSq))); | |
| $deltaSigma = $B * $sinSigma * ($cos2SigmaM + $B / 4 * ($cosSigma * (-1 + 2 * $cos2SigmaM * $cos2SigmaM) - | |
| $B / 6 * $cos2SigmaM * (-3 + 4 * $sinSigma * $sinSigma) * (-3 + 4 * $cos2SigmaM * $cos2SigmaM))); | |
| $s = $b * $A * ($sigma - $deltaSigma); | |
| $s = round($s, 3); // round to 1mm precision | |
| return $s; | |
| } |
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