|
The following table of values for the node factor f is intended to extend Table 14 in
Schureman(1958) beyond 1999. Values are computed for July 1 of each year using satellite
constituent definitions consistent with the IOS Tidal
Package. Although these satellites
are not identical to those used by Schureman(1958),differences between respective 1900-99
f values are generally quite small.
Reference:
| Schureman, Paul. 1959. |
Manual of harmonic analysis and prediction of tides.
U.S. Department of Commerce, Coast and Geodetic Survey,
Special Publication No.98 U.S. Government Printing Office,
Washington. 316pp. |
Node factor f for July 1 of each year, 1900 to 2050
Constituents
|
Year |
Q1 |
O1 |
P1 |
K1 |
N2 |
M2 |
S2 |
K2 |
|
1900 |
0.959 |
0.950 |
1.002 |
0.973 |
1.017 |
1.014 |
0.999 |
0.916 |
|
1901 |
0.904 |
0.891 |
1.007 |
0.934 |
1.020 |
1.025 |
0.999 |
0.835 |
|
1902 |
0.861 |
0.844 |
1.011 |
0.903 |
1.032 |
1.033 |
0.998 |
0.778 |
|
1903 |
0.829 |
0.811 |
1.012 |
0.884 |
1.040 |
1.038 |
0.998 |
0.749 |
|
1904 |
0.810 |
0.803 |
1.011 |
0.882 |
1.034 |
1.038 |
0.998 |
0.748 |
|
1905 |
0.829 |
0.830 |
1.010 |
0.898 |
1.034 |
1.034 |
0.998 |
0.775 |
|
1906 |
0.872 |
0.886 |
1.009 |
0.928 |
1.030 |
1.025 |
0.998 |
0.828 |
|
1907 |
0.922 |
0.952 |
1.006 |
0.966 |
1.013 |
1.014 |
0.999 |
0.904 |
|
1908 |
0.989 |
1.011 |
1.001 |
1.005 |
1.004 |
1.002 |
1.000 |
0.995 |
|
1909 |
1.064 |
1.061 |
0.995 |
1.042 |
0.994 |
0.991 |
1.001 |
1.091 |
|
1910 |
1.130 |
1.113 |
0.993 |
1.073 |
0.976 |
0.980 |
1.001 |
1.179 |
|
1911 |
1.190 |
1.158 |
0.993 |
1.095 |
0.970 |
0.971 |
1.002 |
1.251 |
|
1912 |
1.212 |
1.178 |
0.991 |
1.109 |
0.968 |
0.965 |
1.002 |
1.299 |
|
1913 |
1.187 |
1.176 |
0.988 |
1.113 |
0.959 |
0.964 |
1.002 |
1.316 |
|
1914 |
1.155 |
1.170 |
0.990 |
1.107 |
0.966 |
0.966 |
1.002 |
1.299 |
|
1915 |
1.122 |
1.156 |
0.994 |
1.092 |
0.976 |
0.970 |
1.001 |
1.249 |
|
1916 |
1.079 |
1.116 |
0.996 |
1.068 |
0.979 |
0.980 |
1.001 |
1.170 |
|
1917 |
1.045 |
1.053 |
0.997 |
1.036 |
0.994 |
0.993 |
1.000 |
1.073 |
|
1918 |
1.005 |
0.989 |
1.000 |
0.997 |
1.009 |
1.007 |
1.000 |
0.972 |
|
1919 |
0.947 |
0.931 |
1.005 |
0.957 |
1.014 |
1.018 |
0.999 |
0.880 |
|
1920 |
0.892 |
0.874 |
1.010 |
0.921 |
1.027 |
1.028 |
0.998 |
0.809 |
|
1921 |
0.841 |
0.824 |
1.011 |
0.894 |
1.037 |
1.035 |
0.998 |
0.764 |
|
1922 |
0.804 |
0.801 |
1.011 |
0.881 |
1.034 |
1.038 |
0.998 |
0.747 |
|
1923 |
0.807 |
0.813 |
1.011 |
0.887 |
1.037 |
1.036 |
0.998 |
0.757 |
|
1924 |
0.840 |
0.857 |
1.011 |
0.909 |
1.035 |
1.030 |
0.998 |
0.794 |
|
1925 |
0.885 |
0.913 |
1.008 |
0.942 |
1.020 |
1.021 |
0.998 |
0.855 |
|
1926 |
0.953 |
0.968 |
1.003 |
0.981 |
1.011 |
1.010 |
0.999 |
0.936 |
|
1927 |
1.033 |
1.025 |
0.998 |
1.020 |
1.002 |
0.999 |
1.000 |
1.029 |
|
1928 |
1.105 |
1.086 |
0.996 |
1.055 |
0.982 |
0.987 |
1.001 |
1.123 |
|
1929 |
1.168 |
1.138 |
0.994 |
1.082 |
0.975 |
0.976 |
1.002 |
1.208 |
|
1930 |
1.195 |
1.164 |
0.991 |
1.102 |
0.971 |
0.969 |
1.002 |
1.274 |
|
1931 |
1.178 |
1.173 |
0.988 |
1.112 |
0.960 |
0.965 |
1.002 |
1.312 |
|
1932 |
1.158 |
1.180 |
0.990 |
1.112 |
0.964 |
0.963 |
1.002 |
1.317 |
|
1933 |
1.138 |
1.175 |
0.993 |
1.102 |
0.972 |
0.966 |
1.002 |
1.285 |
|
1934 |
1.106 |
1.139 |
0.994 |
1.084 |
0.973 |
0.974 |
1.001 |
1.221 |
|
1935 |
1.083 |
1.085 |
0.994 |
1.056 |
0.987 |
0.986 |
1.001 |
1.132 |
|
1936 |
1.049 |
1.029 |
0.998 |
1.021 |
1.001 |
0.999 |
1.000 |
1.031 |
|
1937 |
0.991 |
0.972 |
1.003 |
0.981 |
1.006 |
1.011 |
1.000 |
0.933 |
|
1938 |
0.927 |
0.908 |
1.007 |
0.942 |
1.021 |
1.022 |
0.999 |
0.850 |
|
1939 |
0.862 |
0.848 |
1.009 |
0.909 |
1.034 |
1.032 |
0.998 |
0.790 |
|
1940 |
0.809 |
0.811 |
1.011 |
0.887 |
1.033 |
1.037 |
0.998 |
0.757 |
|
1941 |
0.796 |
0.808 |
1.012 |
0.882 |
1.038 |
1.037 |
0.998 |
0.750 |
|
1942 |
0.816 |
0.834 |
1.013 |
0.894 |
1.039 |
1.033 |
0.998 |
0.770 |
|
1943 |
0.852 |
0.876 |
1.010 |
0.921 |
1.025 |
1.027 |
0.998 |
0.815 |
|
1944 |
0.918 |
0.926 |
1.004 |
0.956 |
1.019 |
1.018 |
0.999 |
0.883 |
|
1945 |
1.000 |
0.987 |
1.000 |
0.996 |
1.009 |
1.007 |
1.000 |
0.969 |
|
1946 |
1.075 |
1.055 |
0.998 |
1.034 |
0.990 |
0.994 |
1.001 |
1.064 |
|
1947 |
1.140 |
1.111 |
0.996 |
1.066 |
0.981 |
0.982 |
1.001 |
1.157 |
|
1948 |
1.171 |
1.144 |
0.991 |
1.091 |
0.975 |
0.973 |
1.002 |
1.238 |
|
1949 |
1.164 |
1.166 |
0.989 |
1.107 |
0.962 |
0.967 |
1.002 |
1.296 |
|
1950 |
1.156 |
1.185 |
0.990 |
1.113 |
0.964 |
0.962 |
1.002 |
1.321 |
|
1951 |
1.148 |
1.186 |
0.992 |
1.109 |
0.969 |
0.963 |
1.002 |
1.310 |
|
1952 |
1.129 |
1.157 |
0.992 |
1.097 |
0.967 |
0.970 |
1.002 |
1.262 |
|
1953 |
1.117 |
1.112 |
0.992 |
1.074 |
0.980 |
0.980 |
1.001 |
1.185 |
|
1954 |
1.092 |
1.067 |
0.996 |
1.043 |
0.993 |
0.991 |
1.001 |
1.090 |
|
1955 |
1.034 |
1.013 |
1.001 |
1.006 |
0.999 |
1.003 |
1.000 |
0.990 |
|
1956 |
0.964 |
0.945 |
1.005 |
0.966 |
1.015 |
1.016 |
0.999 |
0.899 |
|
1957 |
0.890 |
0.878 |
1.007 |
0.929 |
1.028 |
1.026 |
0.999 |
0.826 |
|
1958 |
0.824 |
0.832 |
1.010 |
0.899 |
1.030 |
1.033 |
0.998 |
0.776 |
|
1959 |
0.797 |
0.814 |
1.013 |
0.884 |
1.038 |
1.036 |
0.998 |
0.753 |
|
1960 |
0.801 |
0.819 |
1.014 |
0.885 |
1.041 |
1.036 |
0.998 |
0.755 |
|
1961 |
0.825 |
0.844 |
1.011 |
0.903 |
1.030 |
1.032 |
0.998 |
0.783 |
|
1962 |
0.885 |
0.887 |
1.006 |
0.933 |
1.025 |
1.025 |
0.999 |
0.836 |
|
1963 |
0.965 |
0.949 |
1.003 |
0.971 |
1.017 |
1.014 |
0.999 |
0.911 |
|
1964 |
1.040 |
1.020 |
1.001 |
1.011 |
0.997 |
1.002 |
1.000 |
1.003 |
|
1965 |
1.105 |
1.079 |
0.997 |
1.047 |
0.988 |
0.989 |
1.001 |
1.101 |
|
1966 |
1.141 |
1.119 |
0.992 |
1.077 |
0.981 |
0.979 |
1.001 |
1.193 |
|
1967 |
1.144 |
1.153 |
0.990 |
1.099 |
0.966 |
0.970 |
1.002 |
1.267 |
|
1968 |
1.150 |
1.184 |
0.991 |
1.110 |
0.965 |
0.963 |
1.002 |
1.313 |
|
1969 |
1.154 |
1.191 |
0.992 |
1.113 |
0.967 |
0.962 |
1.002 |
1.322 |
|
1970 |
1.147 |
1.169 |
0.990 |
1.106 |
0.964 |
0.966 |
1.002 |
1.293 |
|
1971 |
1.148 |
1.136 |
0.991 |
1.089 |
0.974 |
0.974 |
1.002 |
1.232 |
|
1972 |
1.130 |
1.101 |
0.995 |
1.063 |
0.986 |
0.984 |
1.001 |
1.147 |
|
1973 |
1.073 |
1.051 |
0.999 |
1.029 |
0.991 |
0.996 |
1.000 |
1.050 |
|
1974 |
1.001 |
0.983 |
1.002 |
0.991 |
1.007 |
1.008 |
1.000 |
0.955 |
|
1975 |
0.922 |
0.915 |
1.004 |
0.951 |
1.022 |
1.020 |
0.999 |
0.871 |
|
1976 |
0.848 |
0.863 |
1.009 |
0.916 |
1.026 |
1.029 |
0.998 |
0.806 |
|
1977 |
0.809 |
0.830 |
1.013 |
0.892 |
1.036 |
1.034 |
0.998 |
0.766 |
|
1978 |
0.797 |
0.814 |
1.014 |
0.882 |
1.042 |
1.037 |
0.998 |
0.751 |
|
1979 |
0.806 |
0.819 |
1.011 |
0.890 |
1.033 |
1.035 |
0.998 |
0.762 |
|
1980 |
0.856 |
0.852 |
1.008 |
0.913 |
1.030 |
1.030 |
0.998 |
0.798 |
|
1981 |
0.930 |
0.912 |
1.006 |
0.947 |
1.023 |
1.021 |
0.999 |
0.860 |
|
1982 |
1.000 |
0.982 |
1.003 |
0.987 |
1.005 |
1.009 |
1.000 |
0.944 |
|
1983 |
1.065 |
1.042 |
0.999 |
1.025 |
0.996 |
0.997 |
1.000 |
1.041 |
|
1984 |
1.107 |
1.090 |
0.994 |
1.060 |
0.987 |
0.985 |
1.001 |
1.141 |
|
1985 |
1.120 |
1.136 |
0.992 |
1.087 |
0.971 |
0.974 |
1.001 |
1.228 |
|
1986 |
1.138 |
1.176 |
0.993 |
1.104 |
0.968 |
0.965 |
1.002 |
1.291 |
|
1987 |
1.155 |
1.189 |
0.992 |
1.112 |
0.967 |
0.962 |
1.002 |
1.320 |
|
1988 |
1.160 |
1.175 |
0.989 |
1.111 |
0.961 |
0.964 |
1.002 |
1.313 |
|
1989 |
1.173 |
1.155 |
0.990 |
1.100 |
0.969 |
0.970 |
1.002 |
1.270 |
|
1990 |
1.163 |
1.130 |
0.994 |
1.079 |
0.979 |
0.977 |
1.002 |
1.199 |
|
1991 |
1.108 |
1.085 |
0.997 |
1.051 |
0.983 |
0.988 |
1.001 |
1.110 |
|
1992 |
1.036 |
1.019 |
0.999 |
1.015 |
1.000 |
1.001 |
1.000 |
1.014 |
|
1993 |
0.956 |
0.955 |
1.002 |
0.976 |
1.015 |
1.013 |
0.999 |
0.923 |
|
1994 |
0.879 |
0.900 |
1.007 |
0.937 |
1.020 |
1.023 |
0.999 |
0.845 |
|
1995 |
0.831 |
0.854 |
1.012 |
0.906 |
1.033 |
1.031 |
0.998 |
0.789 |
|
1996 |
0.804 |
0.817 |
1.013 |
0.886 |
1.041 |
1.036 |
0.998 |
0.756 |
|
1997 |
0.798 |
0.805 |
1.011 |
0.882 |
1.034 |
1.038 |
0.998 |
0.750 |
|
1998 |
0.834 |
0.826 |
1.010 |
0.896 |
1.034 |
1.035 |
0.998 |
0.770 |
|
1999 |
0.897 |
0.877 |
1.009 |
0.925 |
1.029 |
1.027 |
0.999 |
0.817 |
|
2000 |
0.959 |
0.942 |
1.006 |
0.962 |
1.012 |
1.017 |
0.999 |
0.890 |
|
2001 |
1.022 |
1.002 |
1.000 |
1.002 |
1.004 |
1.005 |
1.000 |
0.982 |
|
2002 |
1.068 |
1.057 |
0.996 |
1.040 |
0.995 |
0.993 |
1.001 |
1.083 |
|
2003 |
1.092 |
1.114 |
0.994 |
1.072 |
0.977 |
0.980 |
1.001 |
1.180 |
|
2004 |
1.122 |
1.162 |
0.994 |
1.095 |
0.972 |
0.969 |
1.001 |
1.258 |
|
2005 |
1.151 |
1.180 |
0.991 |
1.109 |
0.969 |
0.964 |
1.002 |
1.306 |
|
2006 |
1.169 |
1.176 |
0.988 |
1.113 |
0.960 |
0.964 |
1.002 |
1.319 |
|
2007 |
1.193 |
1.170 |
0.989 |
1.108 |
0.966 |
0.966 |
1.002 |
1.296 |
|
2008 |
1.189 |
1.154 |
0.993 |
1.093 |
0.974 |
0.972 |
1.002 |
1.243 |
|
2009 |
1.137 |
1.114 |
0.995 |
1.069 |
0.976 |
0.981 |
1.001 |
1.167 |
|
2010 |
1.068 |
1.054 |
0.996 |
1.038 |
0.993 |
0.993 |
1.001 |
1.076 |
|
2011 |
0.991 |
0.996 |
1.000 |
1.000 |
1.008 |
1.005 |
1.000 |
0.981 |
|
2012 |
0.914 |
0.941 |
1.006 |
0.961 |
1.014 |
1.016 |
0.999 |
0.893 |
|
2013 |
0.861 |
0.884 |
1.010 |
0.924 |
1.029 |
1.026 |
0.998 |
0.821 |
|
2014 |
0.822 |
0.831 |
1.011 |
0.896 |
1.038 |
1.034 |
0.998 |
0.772 |
|
2015 |
0.801 |
0.802 |
1.011 |
0.882 |
1.034 |
1.038 |
0.998 |
0.749 |
|
2016 |
0.821 |
0.809 |
1.011 |
0.886 |
1.037 |
1.037 |
0.998 |
0.752 |
|
2017 |
0.868 |
0.848 |
1.011 |
0.906 |
1.034 |
1.032 |
0.998 |
0.783 |
|
2018 |
0.918 |
0.902 |
1.008 |
0.939 |
1.019 |
1.024 |
0.999 |
0.842 |
|
2019 |
0.976 |
0.960 |
1.002 |
0.978 |
1.012 |
1.013 |
0.999 |
0.926 |
|
2020 |
1.026 |
1.022 |
0.998 |
1.018 |
1.002 |
1.000 |
1.000 |
1.024 |
|
2021 |
1.060 |
1.088 |
0.997 |
1.053 |
0.984 |
0.986 |
1.001 |
1.125 |
|
2022 |
1.102 |
1.140 |
0.995 |
1.081 |
0.978 |
0.975 |
1.001 |
1.214 |
|
2023 |
1.142 |
1.165 |
0.991 |
1.101 |
0.972 |
0.968 |
1.002 |
1.279 |
|
2024 |
1.173 |
1.173 |
0.988 |
1.112 |
0.960 |
0.965 |
1.002 |
1.312 |
|
2025 |
1.206 |
1.179 |
0.990 |
1.112 |
0.964 |
0.964 |
1.002 |
1.311 |
|
2026 |
1.208 |
1.172 |
0.992 |
1.103 |
0.970 |
0.968 |
1.002 |
1.278 |
|
2027 |
1.159 |
1.137 |
0.993 |
1.085 |
0.970 |
0.975 |
1.002 |
1.217 |
|
2028 |
1.095 |
1.086 |
0.994 |
1.058 |
0.985 |
0.986 |
1.001 |
1.135 |
|
2029 |
1.024 |
1.037 |
0.998 |
1.024 |
1.000 |
0.997 |
1.000 |
1.042 |
|
2030 |
0.951 |
0.983 |
1.004 |
0.985 |
1.007 |
1.008 |
0.999 |
0.947 |
|
2031 |
0.896 |
0.918 |
1.008 |
0.946 |
1.023 |
1.020 |
0.998 |
0.863 |
|
2032 |
0.849 |
0.853 |
1.009 |
0.911 |
1.034 |
1.030 |
0.998 |
0.797 |
|
2033 |
0.815 |
0.812 |
1.011 |
0.888 |
1.033 |
1.037 |
0.998 |
0.757 |
|
2034 |
0.818 |
0.804 |
1.012 |
0.881 |
1.038 |
1.038 |
0.998 |
0.744 |
|
2035 |
0.844 |
0.825 |
1.012 |
0.892 |
1.038 |
1.036 |
0.998 |
0.760 |
|
2036 |
0.879 |
0.866 |
1.009 |
0.917 |
1.024 |
1.029 |
0.998 |
0.804 |
|
2037 |
0.931 |
0.919 |
1.004 |
0.953 |
1.019 |
1.020 |
0.999 |
0.874 |
|
2038 |
0.983 |
0.985 |
1.001 |
0.994 |
1.010 |
1.007 |
1.000 |
0.966 |
|
2039 |
1.026 |
1.057 |
0.999 |
1.032 |
0.992 |
0.993 |
1.000 |
1.066 |
|
2040 |
1.077 |
1.113 |
0.996 |
1.065 |
0.984 |
0.981 |
1.001 |
1.162 |
|
2041 |
1.128 |
1.144 |
0.992 |
1.090 |
0.976 |
0.973 |
1.002 |
1.240 |
|
2042 |
1.170 |
1.164 |
0.989 |
1.106 |
0.963 |
0.967 |
1.002 |
1.292 |
|
2043 |
1.213 |
1.183 |
0.990 |
1.113 |
0.963 |
0.964 |
1.002 |
1.313 |
|
2044 |
1.219 |
1.183 |
0.992 |
1.110 |
0.967 |
0.965 |
1.002 |
1.301 |
|
2045 |
1.174 |
1.154 |
0.991 |
1.097 |
0.965 |
0.971 |
1.002 |
1.259 |
|
2046 |
1.117 |
1.115 |
0.992 |
1.076 |
0.979 |
0.979 |
1.001 |
1.191 |
|
2047 |
1.055 |
1.075 |
0.997 |
1.046 |
0.993 |
0.989 |
1.001 |
1.103 |
|
2048 |
0.988 |
1.023 |
1.002 |
1.009 |
0.999 |
1.000 |
1.000 |
1.006 |
|
2049 |
0.935 |
0.954 |
1.005 |
0.970 |
1.016 |
1.013 |
0.999 |
0.912 |
|
2050 |
0.885 |
0.883 |
1.007 |
0.931 |
1.029 |
1.025 |
0.999 |
0.832 |
|
