A MAGYAR MITTEILUNGEN TUDOMANYOS AKADEMIA DER CSILLAGVIZSGALO STERNWARTE INTEZETENEK DER UNGARISCHEN AKADEMIE KOZLEMENYEI DER WISSENSCHAFTEN BUDAPEST - SZABADSAGHEGY Nr. 63 B. SZEIDL A STUDY OF SOME VARIABLE STARS IN MESSIER 3 BUDAPEST, 1973 A STUDY OF SOME VARIABLE STARS IN MESSIER 3 INTRODUCTION A comprehensive study of the RR Lyrae type variables in the globular cluster Messier 3 was carried out some years ago. (SZEIDL, 1965; In the following we refer to this work as Paper I.) In order to complete this investigation, all the known variable stars in Messier 3 which were left out of attention at the earlier study and could either be measured or be estimated on the plates of the Konkoly Observatory were investigated. Generally the results of the present study are in accordance with those of Paper I. OBSERVATIONS The detailed description of the observational material can be found in Paper I. All the available observations of the different authors were also used: B=(BAILEY, 1913), L=(LARINK, 1922), M=(MULLER, 1933), S=(SLAVENAS, 1929), G=(GREENSTEIN, 1935), Ma=(MARTIN, 1942) and RS=(ROBERTS and SANDAGE, 1955). Additional observations for some of the variables are mentioned in the remarks on individual variables. The comparison stars were selected from SANDAGE's (1953) primary photoelectric and secondary photographic sequence. The systematic errors of the magnitudes may be fairly high because most of the stars estimated are near the centre or have close companion. The following stars were estimated: Nos. 2, 3, 30, 111, 128, 130, 137, 144, 152, 166, 167, 177 and 178. The stars Nos. 95 and 141 furthermore SVS1264=v.Z.89 and SVS1276=v.Z.1221 were measured with the microphotometers of the Konkoly Observatory. The magnitudes obtained for the variables are given in Table 4. The elaboration of the observational material and the determination of the epochs were carried out in the same way as in Paper I. Most of the periods were taken from SAWYER's (1955) catalogue and were improved. For each variable (except No. 95) 20 normal points were formed from the Budapest material. The normal points are given in Table 3 and plotted against phase in Figure 2. The results obtained for the RR Lyrae type variables: the period, the maximum, minimum and medial brightness, the amplitude, epsilon=1/P(t_max-t_min), the different parameters characterizing the O - C diagram (beta, c_1, c_2 and c; see their explanation in Paper I), the indication of light curve variation or possible light curve variation and the distance of the variable from the centre of the cluster are summarized in Table 1. Table 1 No. Period M m med A epsilon 10^10beta c_1 c_2 c B_eff r 3 0.5582053 14.75 16.00 15.37 1.25 0.12 0.0 0 0 0 1.5' 30 0.5120902 15.18 15.92 15.55 0.74 0.15 - 1 1 2 i? 1.1' 111 0.5102469 15.06 16.02 15.54 0.96 0.16 - 5 3 8 i 1.5' 128 0.2922710 15.40 15.86 15.63 0.46 0.44 - 3 3 6 i 2.9' 130 0.5688172 15.27 16.00 15.63 0.73 0.23: - 4 3 7 i 1.4' 137 0.5751464 15.30 16.04 15.67 0.74 0.16 +0.3 1 - 1 0.9' 144 0.5967843 15.27 15.99 15.63 0.72 0.16 - >=2 >=3 >=5 i? 1.9' 152 0.3261217 15.42 15.76 15.59 0.34 0.34: - - - - 1.5' 167 0.6439839 15.62 16.00 15.81 0.38 0.17: - >=2 >=2 >=4 1.4' 177 0.3483438 15.52 15.90 15.71 0.38 0.32 - >=1 >=3 >=4 1.2' 178 0.2650805 15.51 15.81 15.66 0.30 0.28: - - - - i? 1.5' vZ89 0.6369126 15.74 16.51 16.12 0.77 0.21 - - - - 18' vZ1221 0.5093832 15.38 16.60 15.99 1.22 0.12 - - - - i 28' REMARKS ON INDIVIDUAL VARIABLES No.2 The star is near the centre of the cluster and has close companions. It is very difficult to estimate. No period has been found. No.3 The period given by MARTIN satisfies all the observations. The variable has larger amplitude than it is expected from its period. The period-maximum, period-epsilon and amplitude-epsilon diagrams also suggest that the star belongs to the long period branch of the RRab stars on the period-amplitude diagram. Although the O - C values are approximated by a straight line, small oscillations are real. This scatter can only be explained by supposing Blashko-effect, but the few maxima observed do not show any light curve variations. The O - C residuals have been computed with the formula: C = 2425000.491 + 0.5582053dxE Observer Year t(med.) hel. E O - C B 1895 2413372.516 -20831 0.000d 1897 14077.522: -19568 -0.008d: 1898 14456.554 -18889 +0.003d L 1921 22761.531 - 4011 +0.001d M 1925 24285.427 - 1281 -0.003d G 1926 24647.700 - 632 -0.005d Ma 1940 29770.358 + 8545 +0.003d Bp 1940 29775.390 + 8554 +0.011d 1941 30078.494 + 9097 +0.009d 1950 33420.466 +15084 +0.006d 1952 34121.563 +16340 -0.003d 1953 34487.180: +16995 -0.010d: 1955 35223.451 +18314 -0.012d 1956 35600.263: +18989 +0.012d: 1957 35933.504 +19586 +0.004d 1962 37791.183: +22914 -0.024d: No.30 The error of the observations is fairly large because of the close companions. For this reason, the light elements are distorted (for example the light amplitude observed is too small). To all probability the star has light curve variation. The O - C oscillations of LARINK's epochs are very likely the result of the Blashko-effect. The O - C diagram has been constructed by using the formula: C = 2425000.468 + 0.5120902dxE Observer Year t(med.) hel. E O - C B 1895 2413395.481: -22662 +0.001d: 1897 14079.621: -21326 -0.011d: 1898 14456.507: -20590 -0.024d: L 1921 22733.454 - 4427 +0.009d 22761.634 - 4372 +0.024d M 1924 23858.516 - 2230 +0.009d 1925 24298.399 - 1371 +0.007d G 1926 24647.658: - 689 +0.020d: Ma 1940 29770.08 : + 9314 +0.004d: Bp 1941 30078.351: + 9916 -0.003d: 1950 33390.544 +16384 -0.010d 1951 33763.331: +17112 -0.025d: 1952 34126.430 +17821 +0.003d 1953 34487.434 +18526 -0.017d 1955 35223.332: +19963 +0.007d: 1956 35603.309: +20705 +0.013d: 1962 37791.467 +24978 +0.010d No.95 The observational material for the variable known to us can be found in the following publications: BAILEY (1913), GREENSTEIN (1935), RYBKA (1930), LARINK (1922), GUTHNICK (1933) and, RUSSEV (1971). Figure 1 Light curve of No.95. Table 2 J.D. m n J.D. m n 2428963.5 13.40 1 2434126.4 13.60 1 991.5 14.39 5 131.4 13.64 1 29346.4 13.52 2 487.4 14.18 10 719.6 14.27 2 488.5 14.28 2 720.6 14.27 2 567.4 14.17 1 774.4 13.54 2 35223.5 14.40 10 775.4 13.42 4 224.5 14.38 10 30052.5 14.21 4 227.6 14.29 4 078.5 13.51 9 598.5 14.07 3 33390.5 13.31 6 600.4 14.06 7 420.5 13.79 8 603.4 14.06 11 421.5 13.76 7 920.5 14.09 7 422.5 13.82 6 36991.5 13.81 3 763.5 14.80 10 37018.6 13.62 10 34118.5 13.69 9 057.6 13.92 3 120.5 13.46 7 058.6 13.96 2 121.5 13.54 13 757.6 13.44 1 122.4 13.49 3 791.5 14.15 10 An attempt was made to transform all the observations into the same photographic system. For the colour index of the variable the mean value CI = 1.6m was accepted. The greatest difficulty arose at BAILEY's observations. For estimating the brightness of the variable he used only the comparison stars a, c and d and, when No. 95 was near maximum light he had to extrapolate. For this reason, his observations are systematically falsified. The variable has a close, bright companion, therefore, the errors in the observations at Budapest may be considerable. Our observations can be best satisfied with the period P = 103.5d. No period could, however, be found which satisfied all the observations. LARINK's 1921 observations showed great discrepancy. Disregarding this, a slight increase of the period seems real. For each night mean magnitudes were formed from the Budapest observations (Table 2) and were plotted against phase (Figure 2). No.111 GREENSTEIN's period (0.510d) is almost certainly well determined, although it is possible that the number of epochs in a year must be increased by one. (In this case P = 0.50948d.) While the 1926 observations could be satisfied by the accepted period, LARINK's observations on J.D. 2422730 led to discrepancy. The light curve variation can clearly be seen from each observer's material. Both the height and the phase of maxima show strong variations. The O - C diagram is very complicated. During the last 30 years the period decreased by 0.0001d. The O - C's have been obtained with the formula: C = 2425000.070 + 0.5102469dxE Observer Year t(med.) hel. E O - C B 1896 2413691.538: -22163 +0.070d: 1897 14067.561: -21426 +0.041d: 1900 15160.813 -19283 -0.166d L 1921 22756.581 - 4396 -0.444d M 1924 23858.503: - 2237 -0.145d: 1925 24298.391 - 1375 -0.090d S 1926 24621.916 - 741 -0.061d 24642.823 - 700 -0.074d G 1926 24647.929 - 690 -0.071d Bp 1939 29346.231: + 8517 +0.388d: Ma 1940 29770.220 + 9348 +0.362d Bp 1940 29775.285: + 9358 +0.325d: 1941 30078.339: + 9952 +0.292d: 1950 33390.619: +16444 +0.049d: 1952 34131.435: +17896 -0.014d: 1955 35223.293: +20036 -0.084d: 1956 35603.380: +20781 -0.131d: 1960 37018.569 +23555 -0.367d 1962 37791.514 +25070 -0.446d No.128 The large deviations in BAILEY'S observations are very likely observational errors. The period is probably correct. From ROBERTS and SANDAGE's observations the light curve variation can be clearly seen, the oscillation of the phase of the medial brightness on the ascending branch amounts to 0.012d. The scatter in the Budapest material is considerable. The O - C diagram is fairly complicated. The curve drawn in seems to be the most likely although the groups of points might be shifted by P or its multiple parallel to the O - C axis. The O - C diagram is especially uncertain around J.D. 2430000. The residuals have been derived by using the formula: C = 2425000.018 + 0.2922710dXE Observer Year t(med.) hel. E O - C B 1895 2413372.518: -39784 +0.209d: 1896 13692.547: -38689 +0.202d: 1897 14071.611: -37392 +0.190d: 1900 15161.777 -33662 +0.185d L 1921 22761.575 - 7659 +0.061d M 1925 24285.427 - 2445 +0.012d G 1926 24683.786 - 1082 +0.005d Bp 1938 28991.578: +13657 +0.015d: 1939 29346.234: +14870 +0.146d 1941 30078.406 +17375 +0.179d: 1950 33420.497 +28810 +0.151d 1951 33763.350: +29983 +0.171d: 1952 34118.452 +31198 +0.163d RS 1953 34447.860 +32325 +0.182d Bp 1953 34487.296: +32460 +0.161d: 1955 35223.528 +34979 +0.163d 1956 35603.492 +36279 +0.174d 1957 35933.473 +37408 +0.181d 1962 37791.497 +43765 +0.239d No.130 BAILEY'S best observations (in 1900) are very poor, the observations of 1895 - 1899 are completely unusable. No ascending branch was observed in 1900, the epoch given for that year is very uncertain. The variable has strong light curve variation. The oscillation in the height of maxima amounts to 0.5m. Unfortunately, the number of maxima well observed in the Budapest material is scarce, therefore the normal points were determined for the whole light curve. The period accepted is probably correct, but P = 0.569665d (the number of epochs in a year is decreased by one) seems almost just as good. Contradiction seems to exist between MARTIN'S epoch and the Budapest observations in the interval 1938 - 1941. The difference is about 0.03d. It would be important to measure the plates of the Perkins Observatory obtained in 1939. The O - C diagram is very complicated. On the average the period is decreasing. The scatter on the O - C diagram can probably be attributed to the Blashko-effect what we are not able to take into account. The O - C diagram is especially uncertain between BAILEY'S and LARINK's observations. For this reason, the Mount Wilson Observatory's plates obtained in 1912 and 1915 would be very important to be measured. The O - C values have been obtained with the formula: C = 2425000.370 + 0.5688172dxE Observer Year t(med.) hel. E O - C B 1900 2415161.677: -17296 -0.431d: L 1921 22729.613: - 3992 -0.039d: 22761.453 - 3936 -0.053d M 1925 24286.486: - 1255 -0.018d: 24290.450 - 1248 -0.036d 24298.418 - 1234 -0.032d 24311.509 - 1211 -0.023d G 1926 24647.685 - 620 -0.018d 24684.671: - 555 -0.005d Bp 1938 28991.252: + 7016 +0.061d: 1939 29346.201: + 7640 +0.068d: Ma 1940 29770.565 + 8386 +0.094d Bp 1941 30078.270: + 8927 +0.069d: 1950 33420.521 +14803 -0.050d 1951 33763.475 +15406 -0.093d 1952 34118.342 +16030 -0.168d 1953 34487.523 +16679 -0.149d 1955 35223.463 +17973 -0.259d 1956 35603.435 +18641 -0.256d 1957 35933.245: +19221 -0.360d: 1960 37018.471 +21129 -0.438d 1962 37791.483 +22488 -0.448d No.137 Only one epoch could be obtained from BAILEY'S material (in 1900), nevertheless, the descending branches observed in other years 1895 - 1899 clearly showed that no essential O - C residuals existed compared with the O - C value in 1900. The scatter of MULLER's observations is large, therefore the epochs deduced from his material are very uncertain. No doubt, the O - C diagram is a positive parabola, the scatter on it can be explained by the uncertain observations. The star lies very close to the centre of the cluster. The O - C diagram has been constructed by using the formula: C = 2425000.352 + 0.5751464dxE Observer Year t(med.) hel. E O - C B 1900 2415160.760 -17108 +O.013d M 1925 24289.464: - 1236 -0.007d: G 1926 24647.792 - 613 +0.005d Bp 1940 29720.578: + 8207 -0.001d: 1941 30052.440 + 8784 +0.002d 1950 33420.500 +14640 +0.005d 1951 33763.295: +15236 +0.012d: 1953 34487.406 +16495 +0.014d 1956 35600.318: +18430 +0.018d: 1960 37018.631: +20896 +0.020d: No.141 = RV CVn = 4.1921 CVn was discovered by LARINK (1921). Its type and period was determined by SCHILT (1927). The star is of W UMa type and does not belong to the cluster. Since the star lies near the edge of the photographic plates the error of the observations is fairly considerable. The following elements were deduced from the Budapest material: Min. I = 15.97m; Min. II = 15.96m and Max. = 14.98m Almost every observer who investigated the RR Lyrae type variables of the cluster also measured No.141. In addition to these observations Sc = SCHILT (1927) , Ba = BAADE (1931) and Gr = GRAFF (1931) investigated this variable. GRAFF 1931) published only some epochs of the minimum from which a mean epoch was formed. GRAFF's (1923) observations obtained in 1921 were insufficient for determining an acceptable epoch. It would be interesting to complete the O - C diagram with observations before 1921. The O - C diagram has been constructed with the formula: C = 2425000.032 + 0.2695671dxE Observer Year t(med.) hel. E O - C L 1921 2422756.427 - 8323 -0.002d Sc 1926 24642.587 - 1326 +0.001d G 1926 24683.830 - 1173 0.000d Ba 1928 25326.478 + 1211 0.000d Gr 1930 26177.770 + 4369 -0.001d Bp 1938 28991.519 +14807 +0.007d 1940 29775.422 +17715 +0.009d 1941 30078.415 +18839 +0.008d 1950 33422.400 +31244 +0.014d 1951 33763.404 +32509 +0.015d 1952 34118.421 +33826 +0.012d 1953 34487.456 +35195 +0.010d 1955 35224.451 +37929 +0.008d 1956 35600.497 +39324 +0.008d 1957 35933.410 +40559 +0.006d 1960 37018.416 +44584 +0.004d 1962 37791.531 +47452 +0.001d No.144 The errors of the observations are large because of the close companion and dense surroundings. The period seems to be good. The variable probably has light curve variation, however, the large scatter prevents us from being sure of it. The epochs given in the table below are very uncertain. The material obtained for 1957 is especially poor. The O - C diagram is fairly complicated, the period suddenly changed around J.D. 2434500. The material before 1925 would be important for constructing a more complete O - C diagram. The O - C values have been computed by the formula: C = 2425000.033 + O.5967843dxE Observer Year t(med.) hel. E O - C M 1925 2424284.503 - 1199 +0.014d G 1926 24647.940 - 590 +0.010d Ma 1940 29770.58 : + 7994 -0.147d: Bp 1940 29775.348: + 8002 -0.153d: 1941 30078.514 + 8510 -0.153d 1950 33420.496 +14110 -0.163d 1952 34120.480 +15283 -0.207d 1953 34487.493 +15898 -0.217d 1955 35224.551 +17133 -0.187d 1956 35600.506 +17763 -0.207d 1960 37057.456 +20204 -0.007d 1962 37791.523 +21434 +0.015d No.152 The error of the observations is very large because the variable cannot be separated from the object No.178 on most of the plates. GREENSTEIN's period (0.32641d) may be right but the new period satisfies the observations better. The scatter on the O - C diagram is caused by observational errors. For the year 1938 the Budapest material provides the interval -0.086d <= O-C <= -0.032d. Nothing can be said about possible light curve variation. The residuals have been derived with the formula: C = 2425000.280 + 0.3261217dxE Observer Year t(med.) hel. E O - C M 1925 2424298.469 - 2152 +0.003d G 1926 24647.728 - 1081 -0.014d Bp 1940 29720.551 +14474 -0.014d Ma 1940 29770.093: +14626 -0.043d: Bp 1941 30078.297: +15571 -0.024d: 1950 33421.397 +25822 +0.002d 1951 33763.515: +26871 +0.019d: 1952 34121.556 +27969 -0.022d 1953 34487.467 +29091 -0.019d 1955 35223.514 +31348 -0.029d 1956 35600.519 +32504 -0.021d 1957 35920.468: +33485 +0.003d: 1960 37018.490 +36852 -0.027d 1962 37791.436: +39222 +0.011d: No.166 The period is probably about 0.486d. The variable has strong light curve variation therefore the exact period could not be deduced from the poor material. No.167 According to the Budapest observations (especially J.D. 2433420 and 422) GREENSTEIN's period is wrong. The new period satisfies all the observations except one point (J.D. 2428963.487; m = 16.18:) so it may also be wrong. Series of observations taken in the same year are needed for determining the exact value of the period. The O - C diagram is fairly complicated. On possible light curve variation nothing can be said. The O - C values have been obtained with the formula: C = 2425000.288 + 0.6439839dxE Observer Year t(med.) hel. E O - C M 1925 2424312.499 - 1068 -0.014d G 1926 24684.730 - 490 -0.006d Bp 1940 29775.471 + 7415 +0.042d 1950 33420.469 +13075 +0.092d 1952 34122.401 +14165 +0.081d 1953 34487.526 +14732 +0.067d 1956 35603.506 +16465 +0.023d 1960 37018.328: +18662 +0.012d: 1962 37757.611: +19810 +0.002d: No.177 The variable has a close, bright companion therefore the light amplitude measured is systematically small. The error of epochs is considerable because of the large observational errors. According to GREENSTEIN's observations (these are the best) the light curve variation is unlikely. The O - C diagram is typical for that of an RRc type star, however, one of the cycles may not be real. The O - C residuals have been derived by using the formula: C = 2425000.068 + 0.3483438dxE Observer Year t(med.) hel. E O - C M 1925 2424289.441 - 2040 -0.006d G 1926 24647.897 - 1011 +0.005d Bp 1938 28991.380: +11458 -0.011d: 1940 29720.447: +13551 -0.028d: 1941 30078.548 +14579 -0.024d 1950 33422.328: +24178 +0.004d: 1952 34121.482 +26185 +0.032d 1953 34567.360 +27465 +0.030d 1955 35227.483: +29360 +0.042d: 1956 35600.503 +30431 -0.015d 1960 37018.610 +34502 -0.016d 1962 37791.580: +36721 -0.021d: No.178 The star is a difficult object having No.152 as its close companion. The variable is of RRc type with small amplitude. Perhaps it has light curve variation although the light amplitudes measured can also be different because of the considerable observational errors. The error of the epochs is also fairly large, it can exceed 0.01d. The period is certainly about P ~~ 0.265d. We could, however, not find a period which satisfied all the observations. The period probably decreased by 10 sec between 1941 and 1950 and suddenly increased by about 10 sec around 1956. The O - C diagram has been constructed by using the formula: C_1= 2425000.050 + 0.2651549dxE_1 for the interval 1925 - 1941 and C = 2425000.050 + 0.2650805dxE for the years 1950 - 1962. Observer Year t(med.) hel. E E_1 O - C O - C_1 M 1925 2424286.500 - 2692 - 2691 +0.047d +0.247d G 1926 24647.942 - 1329 - 1328 +0.184d +0.283d Bp 1938 28991.429: +15057 +15053 +0.062d: +0.267d: 1940 29774.426: +18010 +18006 +0.276d: +0.262d: 1941 30078.543: +19157 +19153 +0.346d: +0.246d: 1950 33422.494 +31772 +0.306d 1951 33763.558: +33059 +0.212d: 1952 34120.578 +34406 +0.168d 1953 34483.412 +35775 +0.107d 1955 35224.467 +38571 -0.003d 1956 35600.362 +39989 +0.008d 1957 35933.562: +41246 +0.002d: 1960 37018.646: +45339 +0.111d: 1962 37791.551: +48254 +0.307d: I-I-42 Its Zeipel-number is 1390. The light amplitude of this variable is smaller than the error of our photographic observations. Its brightness is around 15.8m. I-I-100 Its brightness is about 15.9m. The error of our photographic observations is larger than the amplitude of the light variation. SVS 1264 The light variation of this star was discovered by KUROCHKIN (1959) and the star's Zeipel-number (v.z.89) was given by KUKARKIN (1960). The variable is situated far from the centre of the cluster (and from the centre of the photographic plates), therefore the photometric errors are large. The star was measured with both the Rosenberg and Becker-iris photometer of the Konkoly Observatory and mean values were formed. The period given by KUROCHKIN seems to be right. The O - C diagram could only be constructed for the last 30 years from Ku = KUROCHKIN's (1961) observations and the material obtained at Budapest. The small oscillations in the O - C diagram appear to be real. This kind of oscillations in the O - C diagrams is generally characteristic of RRab variables with long period. The O - C values have been computed by using the formula: C = 2435000.355 + 0.6369126dxE Observer Year t(med.) hel. E O - C Bp 1941 2430078.300: - 7728 +0.006d: 1950 33421.432 - 2479 -0.017d 1951 33763.463 - 1942 -0.008d 1952 34121.407 - 1380 -0.009d Ku 1953 34454.512: - 857 -0.009d: Bp 1955 35224.553 + 352 +0.005d 1956 35600.328 + 942 +0.001d Ku 35602.244 + 945 +0.007d Bp 1957 35933.446 + 1465 +0.014d Ku 1959 36668.432 + 2619 +0.003d Bp 1960 36991.340: + 3126 -0.004d: 1962 37791.318: + 4382 +0.012d: SVS 1276 The light variation of the star was discovered by KUROCHKIN (1959) and its Zeipel-number (v.Z.1221) was given by KUKARKIN (1961). The variable is far from the centre of the cluster (and far from the centre of the plates). The star can only be measured on the 9 x 12 cm plates and is not present on the 6 x 9 cm plates at all. Fig. 2a Light curves of variables Nos. 3, 30, 111, 128, 130, 137, 141, 144, 152, 167, 177 and 178. Fig. 2b Light curves of variables SVS 1264 = v.Z.89 and SVS 1276 = v.Z.1221 Although only a few well-observed maxima are available the Blashko-effect can be taken for certain. The period given by KUKARKIN and KUROCHKIN seems to be good. The O - C diagram has been constructed with the formula: C = 2435000.317 + 0.5093832dxE Observer Year t(med.) hel. E O - C Bp 1950 2433422.234: - 3098 -0.014d: 1952 34121.147: - 1726 +0.025d: 1953 34487.387 - 1007 +0.019d 1956 35603.421 + 1184 -0.006d 1957 35933.500 + 1832 -0.007d 1960 37018.495 + 3962 +0.002d 1962 37791.234: + 5479 +0.006d: Table 3 PHASE m - 10 n PHASE m - 10 n No.3. No.30. 0.005d 0.009P 5.29 4 0.004d 0.008P 5.54 5 .020 .036 4.92 8 .022 .043 5.27 5 .038 .068 4.76 5 .046 .090 5.20 3 .054 .097 5.02 10 .065 .127 5.29 6 .092 .165 5.33 6 .084 .164 5.40 10 .125 .224 5.40 6 .110 .215 5.60 14 .155 .278 5.59 8 .135 .264 5.61 14 .182 .326 5.75 8 .163 .318 5.65 21 .218 .391 5.82 16 .190 .371 5.68 20 .250 .448 5.87 20 .220 .430 5.76 25 .285 .511 5.90 14 .248 .484 5.79 13 .314 .563 6.00 18 .278 .543 5.82 11 .350 .627 5.94 11 .304 .594 5.85 8 .380 .681 5.94 10 .332 .648 5.74 2 .412 .738 5.84 12 .370 .723 5.83 3 .441 .790 5.85 12 .392 .765 5.93 2 .480 .860 5.93 11 .426 .832 5.85 6 .513 .919 5.96 11 .447 .873 5.87 4 .535 .958 5.98 6 .471 .920 5.92 4 .548 .982 5.63 7 .497 .971 5.77 4 No.111. No.128. 0.011d 0.022P 5.49 2 0.010d 0.034P 5.45 11 .030 .059 5.21 4 .022 .075 5.44 5 .049 .096 5.05 5 .035 .120 5.41 6 .069 .135 5.33 6 .050 .171 5.44 7 .089 .174 5.36 5 .067 .229 5.40 13 .119 .233 5.59 7 .082 .281 5.41 11 .147 .288 5.67 17 .096 .328 5.43 11 .175 .343 5.76 14 .108 .370 5.50 13 .202 .396 5.79 18 .125 .428 5.56 13 .231 .453 5.86 19 .141 .482 5.62 8 .261 .512 5.89 18 .155 .530 5.68 10 .285 .559 5.88 17 .168 .575 5.76 7 .316 .619 5.94 13 .181 .619 5.75 8 .344 .674 5.96 8 .197 .674 5.82 7 .373 .731 5.97 14 .214 .732 5.76 9 .399 .782 6.08 11 .228 .780 5.88 10 .429 .841 6.02 10 .245 .838 5.84 7 .457 .896 5.96 13 .256 .876 5.81 5 .479 .939 5.98 7 .272 .931 5.73 9 .503 .986 5.76 4 .288 .985 5.66 7 Table 3 (continued) PHASE m - 10 PHASE m - 10 n No.130. No.137. 0.015d 0.026P 5.44 9 0.005d 0.009P 5.61 2 .042 .074 5.28 10 .020 .035 5.37 3 .072 .127 5.29 7 .035 .061 5.33 4 .103 .181 5.34 8 .061 .106 5.34 11 .132 .232 5.54 6 .099 .172 5.56 10 .160 .281 5.64 7 .124 .216 5.74 10 .188 .331 5.68 10 .167 .290 5.84 6 .212 .373 5.82 12 .198 .344 5.94 13 .239 .420 5.81 9 .224 .389 5.96 17 .267 .469 5.82 6 .264 .459 5.96 7 .293 .515 5.83 9 .291 .506 5.93 7 .324 .570 5.87 7 .330 .574 6.04 11 .357 .628 5.91 11 .368 .640 5.98 9 .385 .677 5.84 11 .394 .685 5.99 13 .412 .724 5.89 10 .425 .739 5.94 9 .443 .779 5.88 11 .460 .800 5.96 9 .470 .826 6.00 13 .496 .862 6.01 14 .497 .874 5.93 14 .525 .913 6.03 9 .528 .928 5.86 16 .552 .960 5.98 8 .556 .977 5.75 15 .567 .986 5.77 3 No.141. No.144. 0.001d 0.004P 5.96 16 0.014d 0.023P 5.47 8 .009 .033 5.80 4 .031 .052 5.31 8 .019 .070 5.42 9 .051 .085 5.29 4 .032 .119 5.23 16 .079 .132 5.43 12 .050 .185 5.01 14 .112 .188 5.47 8 .067 .249 4.98 15 .151 .253 5.70 7 .088 .326 5.06 14 .185 .310 5.81 5 .106 .393 5.15 13 .215 .360 5.81 7 .118 .438 5.48 11 .248 .416 5.79 7 .129 .479 5.76 8 .291 .488 5.77 5 .134 .497 5.95 5 .329 .551 5.88 4 .143 .530 5.90 4 .350 .586 5.90 8 .154 .571 5.45 6 .389 .652 5.87 12 .168 .623 5.22 15 .422 .707 5.87 13 .186 .690 5.01 13 .457 .766 5.92 19 .203 .753 5.00 17 .489 .819 5.87 18 .220 .816 5.04 15 .524 .878 5.94 20 .238 .883 5.25 11 .550 .922 5.98 7 .251 .931 5.48 5 .571 .957 5.83 6 .262 .972 5.94 8 .591 .990 5.64 14 Table 3 (continued) PHASE m - 10 n PHASE m - 10 n No.152. No.167. 0.008d 0.025P 5.58 13 0.016d 0.025P 5.66 8 .023 .071 5.44 13 .050 .078 5.63 6 .041 .126 5.41 10 .083 .129 5.63 10 .057 .175 5.48 12 .112 .174 5.66 12 .072 .221 5.46 13 .147 .228 5.64 9 .091 .279 5.48 11 .177 .275 5.67 7 .107 .328 5.59 10 .214 .332 5.69 4 .120 .368 5.58 7 .244 .379 5.73 6 .139 .426 5.67 6 .276 .429 5.87 9 .151 .463 5.63 5 .304 .472 5.87 10 .168 .515 5.75 3 .338 .525 5.91 17 .189 .580 5.61 3 .370 .575 5.98 18 .206 .632 5.70 7 .400 .621 6.01 8 .222 .681 5.74 10 .435 .675 5.99 13 .237 .727 5.76 10 .467 .725 5.99 9 .254 .779 5.73 16 .500 .776 5.93 8 .269 .825 5.75 10 .536 .832 5.97 9 .288 .883 5.73 12 .566 .879 5.95 12 .304 .932 5.72 11 .597 .927 5.97 16 .319 .978 5.67 18 .633 .983 5.87 16 No.177. No.178. 0.011d 0.032P 5.60 9 0.005d 0.019P 5.53 9 .026 .075 5.56 8 .018 .068 5.54 9 .042 .121 5.55 9 .032 .121 5.50 9 .060 .172 5.53 8 .046 .174 5.53 9 .077 .221 5.54 9 .061 .230 5.51 12 .097 .278 5.55 14 .075 .283 5.57 8 .115 .330 5.58 10 .088 .332 5.56 8 .130 .373 5.60 12 .102 .385 5.56 11 .149 .428 5.68 13 .115 .434 5.64 7 .166 .477 5.65 12 .126 .475 5.57 10 .182 .522 5.65 7 .139 .525 5.66 11 .201 .577 5.68 15 .152 .574 5.64 13 .220 .632 5.75 11 .167 .630 5.68 10 .234 .672 5.73 11 .179 .675 5.73 12 .254 .729 5.78 14 .191 .721 5.78 11 .269 .772 5.85 5 .207 .781 5.75 8 .286 .821 5.81 9 .218 .823 5.80 11 .304 .873 5.97 4 .232 .876 5.80 9 .322 .924 5.90 4 .244 .921 5.78 12 .336 .965 5.70 6 .257 .970 5.65 9 Table 3 (continued) PHASE m - 10 n PHASE m - 10 n v.Z.89. v.Z. 0.011d 0.017P 5.97 8 0.010d 0.020P 5.47 4 .030 .047 5.74 7 .023 .045 5.47 3 .053 .083 5.77 6 .040 .079 5.42 7 .074 .116 5.80 4 .061 .120 5.55 4 .096 .151 5.82 10 .077 .151 5.59 3 .126 .198 5.85 15 .100 .196 5.67 2 .172 .270 6.05 12 .135 .265 5.73 4 .214 .336 6.10 11 .175 .344 6.03 4 .251 .394 6.23 13 .203 .399 6.16 11 .296 .465 6.38 17 .241 .473 6.31 19 .338 .531 6.37 17 .272 .534 6.44 17 .382 .600 6.37 12 .301 .591 6.62 13 .425 .667 6.40 14 .341 .669 6.55 10 .464 .729 6.41 12 .370 .726 6.50 11 .510 .801 6.51 8 .408 .801 6.56 12 .542 .851 6.50 4 .434 .852 6.53 2 .561 .881 6.47 8 .446 .876 6.54 4 .580 .911 6.47 4 .464 .911 6.60 8 .605 .950 6.34 7 .483 .948 6.55 4 .624 .980 6.05 7 .500 .982 6.23 8 OBSERVATIONS OF VARIABLES.(m-10) Table 4 J.D. 24... 2 3 30 95 111 128 130 137 28963.487 6.04 6.10 6.10 3.40 6.27 5.77 5.77 6.37 28991.403 5.96 5.97 5.87 4.40 6.23 5.62 5.67 5.67 .416 6.05 6.03 5.92 4.41 6.20 5.53 5.53 5.87 .430 5.98 6.07 5.93 4.40 6.13 5.63 5.60 5.93 .522 5.98 6.12 6.03 4.36 6.20 5.87 5.93 6.13 .542 5.89 6.03 5.87 4.36 6.10 5.82 5.87 5.97 29346.376 5.69 5.70 5.97 3.58 5.63 5.68 5.67 5.87 .392 5.78 5.95 5.80 3,47 5.87 5.65 5.73 5.87 29719.549 5.82 5.95 5.77 4.26 6.07 5.60 5.87 5.90 .560 5.90 5.70 5.72 4:28 6.17 5.62 6.03 6.00 29720.546 5.84 5.68 5.63 4.34 6.00 5.65 5.62 6.07 .558 5.78 5.77 5.40 4.20 5.97 - 5.70 5.95 29774.405 5.89 5.70 5.97 3.51 5.72 5.37 6.20 6.23 .417 5.90 5.80 5.83 3.58 5.63 - 6.10 6.15 29775.403 5.76 4.97 5.80 3.46 5.63 5.43 6.00 5.93 .415 5.75 4.73 5.80 3.48 5.75 5.65 5.87 5.95 .426 5.80 4.73 5.87 3.31 5.83 - 6.03 5.97 .437 5.75 5.03 5.90 - 5.72 5.60 6.07 6.03 .447 5.82 5.15 5.75 3.43 5.73 - 6.07 6.00 30052.462 5.82 5.80 5.83 4.24 5.58 5.37 5.92 5.40 .474 5.78 5.80 5.73 4.22 5.53 5.23 5.93 5.43 .489 5.85 5.87 5.70 4.17 5.50 5.27 5.87 5.32 .501 5.75 5.93 5.75 4.22 5.67 5.40 5.80 5.40 30078.418 5.74 5.83 5.30 3.45 5.58 5.30 5.62 5.68 .434 5.70 5.97 5.43 3.42 5.63 5.30 5.63 5.63 .470 5.68 5.97 5.67 3.53 5.65 5.37 5.85 5.67 .483 5.63 5.53 5.65 3.53 5.65 5.27 5.75 - .498 5.79 5.28 5.68 3.54 5.75 5.40 5.80 5.80 .509 5.80 4.97 5.65 3.56 5.90 5.37 5.90 5.80 .521 5.81 4.68 5.63 3.53 5.87 5.53 5.90 6.03 .536 5.76 4.72 5.63 3.53 5.70 5.52 5.87 5.93 .548 5.76 4.80 5.52 3.51 5.77 5.43 5.88 5.90 33390.497 5.88 5.70 5.83 3.36 6.00 5.53 5.62 5.90 .534 5.80 5.87 5.77 3.35 6.17 5.70 5.70 6.03 .545 5.79 5.83 5.55 3.26 6.13 5.77 5.63 6.10 .558 5.75 5.80 5.20 3.33 6.07 5.80 5.70 - .570 5.82 5.97 5.27 3.30 6.00 5.70 5.77 5.93 .586 5.82 5.90 5.30 3.23 6.17 5.90 5.80 5.97 33420.424 5.85 6.13 5.65 3.74 6.07 6.00 6.17 6.05 .438 5.94 6.13 5.75 3.84 6.05 5.87 5.88 6.20 .450 5.92 5.73 5.87 3.76 6.10 5.80 5.97 6.07 .476 5.73 5.13 5.80 3.81 5.97 5.83 5.90 6.03 .487 5.76 4.98 5.80 3.71 6.07 5.67 5.75 5.90 .498 5.70 4.80 5.80 3.80 5.97 5.67 5.80 5.60 .510 5.66 5.10 5.68 3.84 5.97 5.40 5.88 5.50 .523 5.65 4.97 5.68 3.84 6.00 5.40 5.77 5.32 33421.385 5.74 5.93 5.70 - 5.72 5.53 5.80 5.85 .442 5.70 5.90 5.53 3.74 5.65 5.53 5.77 5.90 .454 5.77 6.00 5.63 3.75 5.85 5.50 5.85 5.97 .465 5.64 5.87 - 3.77 5.70 5.50 5.83 5.90 .475 5.68 5.80 - 3.88 5.73 5.50 5.77 5.90 .486 5.72 5.80 - 3.77 5.73 5.53 5.85 5.80 .497 5.69 5.90 5.60 - 5.78 5.53 5.80 6.00 .535 5.69 6.00 5.72 3.71 5.83 - 5.88 5.75 .548 5.73 - 6.00 3.69 5.80 5.90 6.00 - 33422.398 5.81 6.03 5.73 3.81 5.90 5.80 5.90 5.90 .431 5.70 5.93 5.57 3.71 5.92 5.95 5.77 5.90 .442 5.97 6.17 5.97 3.88 6.12 6.07 5.80 6.00 33422.452 5.97 6.08 5.77 - 6.03 6.00 5.90 5.97 .462 - - - - - - - - .472 5.78 6.13 5.77 3.85 6.07 6.07 5.80 6.00 .483 5.97 6.07 5.62 - 6.13 6.13 5.80 6.03 .493 5.72 6.03 5.80 3.86 5.97 6.07 5.63 6.10 .508 5.71 5.97 5.67 3.83 6.00 5.73 5.80 5.78 .520 5.65 6.07 5.72 - 5.90 5.70 5.75 6.10 33763.406 5.80 5.90 5.43 4.75 6.17 5.10 6.03 5.70 .420 5.80 5.65 5.43 4.73 5.90 5.40 6.07 5.60 .442 5.75 5.80 5.57 4.81 6.03 5.47 5.92 5.65 .455 5.84 6.03 5.80 4.78 6.07 5.52 5.90 5.93 .464 5.82 5.93 5.75 4.82 6.13 5.58 5.80 6.03 .483 5.80 5.97 5.73 4.89 6.17 5.55 5.35 5.97 .494 5.80 5.97 5.72 4.82 5.97 5.60 5.17 5.93 .504 5.85 6.10 5.90 4.79 6.07 5.75 5.38 6.07 .514 5.90 5.97 5.92 4.85 6.03 5.65 5.50 6.00 .525 5.92 6.13 5.80 4.78 6.13 5.68 5.57 - 34118.355 5.68 5.62 5.63 3.69 5.85 5.60 5.43 6.05 .372 5.76 5.50 5.73 3.69 5.70 5.70 5.22 5.95 .388 5.66 5.53 5.65 - 5.72 5.67 4.97 - .428 5.82 5.90 5.87 3.79 5.90 5.80 5.23 6.03 .443 5.78 5.93 5.87 3.65 5.83 5.87 5.47 6.03 .470 5.74 5.60 5.80 3.72 5.85 5.50 5.45 - .485 5.78 6.03 6.00 3.68 6.03 5.63 5.58 6.00 .499 5.80 5.80 5.80 3.60 5.90 - 5.68 6.10 .513 5.88 5.83 6.10 3.73 5.93 - 5.70 6.17 .526 5.66 5.80 5.90 - 6.00 5.53 5.72 - .540 5.82 5.97 5.93 3.71 5.97 5.47 5.87 6.00 34120.471 5.76 4.80 - 3.47 5.83 - 5.73 - .484 5.83 4.80 5.50 3.48 5.80 5.47 5.97 - .497 5.70 5.03 5.57 3.38 5.83 5.62 5.80 - .510 5.79 5.30 5.80 - 5.90 5.53 6.07 5.43 .523 5.73 5.35 5.60 3.42 6.07 5.45 5.90 5.60 .536 5.70 5.20 5.73 3.46 5.97 5.30 6.00 5.70 .551 5.82 5.63 5.93 3.43 6.00 5.40 5.97 5.80 .564 5.81 5.30 5.65 - 5.90 5.33 5.93 5.67 .579 5.82 5.30 5.80 3.55 5.93 5.20 5.87 5.65 34121.401 5.75 5.80 5.60 3.52 5.70 5.40 5.80 - .412 5.66 5.80 5.60 3.49 5.67 5.45 5.72 6.00 .422 5.72 5.73 5.73 3.50 5.67 5.47 5.72 6.00 .431 5.68 5.70 5.50 3.51 5.73 5.37 5.77 6.10 .441 5.66 5.80 5.63 3.58 5.68 5.47 5.82 6.05 .484 5.71 5.93 5.75 3.54 5.88 5.73 5.87 6.07 .495 5.81 6.03 5.70 3.47 5.93 5.58 5.83 6.03 .505 5.70 5.90 5.77 3.57 5.77 5.68 5.90 5.97 .517 5.82 6.03 5.90 3.49 5.87 5.70 5.93 6.00 .528 5.77 5.93 5.70 - 5.85 5.63 5.93 6.00 .539 5.80 5.93 5.80 3.60 5.95 5.75 5.95 6.10 .552 5.77 5.60 5.77 3.61 5.83 - 5.93 - .562 5.84 5.45 - 3.60 5.70 - 5.93 - .594 5.80 - 5.75 3.55 5.83 5.97 5.78 - .605 5.85 4.80 5.97 - 6.03 5.90 6.10 - 34122.404 5.66 5.60 - 3.50 5.63 5.80 5.30 - .416 5.70 5.80 5.50 3.53 5.68 5.60 5.40 6.00 .431 5.72 5.73 - 3.44 5.77 5.77 5.50 - 34126.433 5.68 5.82 5.50 3.60 5.57 5.57 5.58 5.87 34131.415 5.64 5.73 5.97 3.64 5.85 5.63 5.60 - 34487.347 5.73 5.65 5.85 4.15 6.00 5.47 5.75 6.00 34487.367 5.76 - 6.00 4.17 6.13 5.37 6.00 6.03 .385 5.84 5.63 6.00 4.15 6.20 5.52 6.00 6.10 .397 5.75 5.80 5.93 - 6.13 5.40 5.88 5.75 .410 5.66 5.73 6.00 - 6.00 5.58 6.03 5.72 .428 5.77 5.87 5.43 - 6.17 5.57 5.97 5.38 .438 5.72 6.00 5.50 4.23 6.03 5.65 6.02 5.33 .449 5.70 5.80 5.33 4.20 6.13 5.77 5.92 5.35 .460 5.69 5.83 5.07 4.13 6.13 5.70 6.03 5.18 .474 5.70 5.90 5.12 4.15 6.17 - 6.07 5.33 .483 5.60 5.93 5.18 4.24 6.00 5.80 5.83 5.30 .494 5.61 6.00 5.08 4.18 5.93 5.65 5.87 5.17 .508 5.66 6.10 5.17 - 6.00 5.65 5.78 5.45 .518 5.71 5.90 5.18 4.19 6.07 5.72 5.78 5.40 34488.530 5.75 5.90 5.30 4.30 5.90 5.43 5.83 5.95 .540 5.79 6.00 5.37 4.25 5.90 5.43 5.93 6.00 34567.388 5.60 5.93 5.12 4.17 5.77 5.40 5.72 5.23 35223.415 5.59 5.90 5.45 4.33 5.60 5.75 5.90 6.00 .428 5.61 5.87 5.45 4.33 5.63 - 5.90 5.95 .441 5.66 5.53 5.53 4.36 5.73 5.63 5.68 5.95 .467 5.69 5.10 5.43 4.47 5.63 5.90 5.57 5.93 .490 5.65 4.77 - 4.38 5.77 5.70 5.55 6.00 .503 5.66 5.03 - 4.42 5.82 5.85 5.37 5.95 .517 5.67 4.97 - 4.41 5.72 5.67 5.33 5.90 .530 5.67 5.13 - 4.40 5.77 5.60 5.20 6.00 .546 5.58 5.15 - 4.46 5.75 5.50 5.42 - .573 5.65 5.23 - 4.40 5.87 5.37 5.37 - 35224.454 5.58 5.80 5.58 4.36 5.80 5.52 5.68 5.87 .472 5.64 5.93 5.43 4.41 5.72 5.40 5.78 6.00 .485 5.65 6.00 5.65 4.45 5.73 5.60 5.90 6.00 .499 5.69 6.00 5.52 4.39 5.73 5.17 5.82 5.93 .512 5.58 6.00 5.57 4.39 5.77 5.37 5.87 6.03 .524 5.53 5.90 5.58 4.46 5.78 - 5.73 5.83 .542 5.62 6.00 5.58 4.34 5.73 - 5.80 5.75 .556 5.61 5.60 5.72 4.31 6.00 - 5.78 6.05 .569 5.69 5.27 - 4.37 5.68 - 5.62 - .583 5.65 5.10 5.78 4.34 5.83 - - - 35227.534 5.53 5.87 - 4.33 5.70 5.90 5.32 6.00 .547 5.56 5.80 - 4.25 5.95 5.72 5.07 - .560 5.58 5.77 - 4.33 5.80 5.80 5.43 5.97 .573 5.55 5.83 - 4.25 5.93 5.77 5.37 - .586 5.69 5.67 - - 5.90 5.90 5.70 6.00 35598.507 5.68 6.00 5.67 4.10 6.00 5.87 5.60 6.00 .524 5.69 6.00 5.80 4.02 5.82 5.62 5.73 6.00 .537 5.63 6.00 5.72 4.10 5.97 5.47 5.83 6.00 35600.363 5.69 5.52 5.37 4.08 5.03 5.43 5.83 5.03 .378 5.58 5.43 5.53 - 5.12 5.42 5.92 5.17 .391 5.68 5.43 5.52 4.09 5.33 5.47 5.80 5.33 .405 5.60 5.55 5.70 4.09 5.28 5.65 5.73 5.40 .421 5.60 5.55 5.58 4.04 5.57 5.63 5.75 5.62 .434 5.74 5.60 5.72 - 5.50 5.60 5.90 5.58 .446 5.63 5.62 5.83 4.08 5.53 - 5.90 5.50 .501 5.61 5.60 5.93 4.03 5.68 5.70 5.83 - .525 5.60 5.90 5.62 3.98 5.88 5.83 5.77 - 35603.369 5.70 5.97 5.33 4.13 5.68 5.70 5.90 5.75 .381 5.80 6.00 5.37 4.02 5.55 - 5.93 - .397 5.69 5.87 5.37 4.01 5.12 - 5.83 5.80 .408 5.70 5.85 5.50 4.05 5.00 5.60 5.68 6.00 .419 5.71 6.00 5.50 4.05 5.03 5.85 5.80 5.77 35603.431 5.76 6.00 5.68 4.13 5.23 - 5.85 5.93 .446 5.70 5.90 5.53 4.06 5.30 5.80 5.52 5.85 .457 5.70 5.80 5.53 4.11 5.20 - 5.60 5.90 .468 5.74 5.93 5.50 4.03 5.35 5.72 5.50 5.90 .491 5.64 5.90 5.57 4.03 5.45 5.62 5.43 5.87 .507 5.72 5.93 5.72 4.09 5.52 5.47 5.43 6.00 35920.444 5.82 6.03 - 4.05 5.82 5.43 - 6.00 .467 5.82 - - 4.13 5.75 - 6.00 - .487 5.58 5.68 5.50 4.15 5.90 5.43 5.90 5.87 .504 - 6.00 - 4.00 5.60 - 5.97 - .547 - 6.00 - 4.07 5.93 - 5.93 6.00 .562 - 5.97 - 4.12 5.90 - 5.97 - .585 - 5.93 - 4.14 - - 5.78 - 35933.415 5.76 5.70 5.62 - 5.43 5.85 5.68 5.60 .443 5.70 6.00 - - 5.53 6.00 5.80 - .479 5.84 6.10 5.80 - 5.70 5.57 5.73 5.65 .503 - - - - - - - - .515 - 5.00 - - - - 6.00 - .530 - 4.77 - - 5.20 - 5.85 - .543 - - - - - - - - .573 - 5.30 - - 5.25 - 5.80 - .588 - - - - - - - - .602 - - - - - - - - 36991.457 5.53 5.45 5.90 3.81 - - 5.68 5.80 .470 - - - 3.81 5.80 - 5.90 - .485 5.60 - - 3.82 - - 5.70 - 37018.470 - 5.80 5.80 3.62 5.77 5.40 5.65 5.90 .483 5.58 5.78 - 3.69 5.83 5.37 5.43 5.93 .496 5.67 5.87 5.60 3.64 5.80 5.27 5.10 5.95 .510 5.63 - - - 5.65 5.30 5.03 - .523 5.60 5.77 - 3.53 5.80 5.33 4.97 - .537 5.66 5.77 - 3.66 5.83 5.35 5.20 - .550 5.60 5.70 - 3.65 - - 5.13 - .563 - - - - - - - - .577 5.69 5.83 - 3.54 5.43 - 5.27 - .609 5.68 5.80 - 3.60 4.93 - 5.50 5.97 .623 - - - 3.62 - - - - .637 - 5.70 - 3.65 5.30 - 5.60 - 37057.539 5.65 5.97 5.65 3.84 5.73 - 5.77 5.80 .552 5.69 5.97 5.77 3.99 5.77 - 6.00 5.93 .578 5.70 5.97 5.68 3.92 5.63 5.30 5.97 5.90 37058.529 5.70 5.90 5.97 3.96 5.93 5.57 5.97 5.97 .580 5.85 5.93 5.93 3.97 5.93 5.68 5.90 5.93 37757.598 - - - 3.44 5.65 - - - 37791.365 5.82 5.85 5.83 4.23 5.90 5.72 5.97 6.03 .380 5.90 5.75 5.87 4.11 5.87 5.80 5.97 6.00 .394 5.97 5.87 5.87 4.13 6.07 5.72 6.07 6.00 .424 5.93 5.90 5.93 - 5.93 - 6.00 6.00 .439 5.80 5.83 5.67 - 5.97 5.90 5.87 6.13 .454 5.78 5.90 5.63 4.10 5.87 - 5.83 6.03 .469 5.95 6.00 5.73 - 6.00 5.93 5.75 6.03 .483 5.83 5.97 5.50 4.15 5.70 5.63 5.53 6.03 .497 5.85 6.00 - 4.12 5.80 5.65 5.68 6.03 .519 5.79 5.97 - 4.23 5.50 5.47 5.30 5.97 .533 5.79 6.00 5.40 4.18 5.23 5.40 5.43 6.00 .549 5.73 6.00 5.50 4.19 5.23 5.47 5.55 6.03 .563 5.65 5.97 5.57 4.10 5.47 5.47 5.40 5.97 Table 4 (continued) J.D. 24... 141 144 152 166 167 177 178 v.Z. v.Z. 89 1221 28963.487 5.78 6.07 5.97 5.98 6.18 - 5.78 6.47 6.59 28991.403 5.60 5.68 5.62 6.12 6.07 5.73 5.80 6.48 6.67 .416 5.11 5.93 5.67 6.07 6.08 5.70 5.80 6.31 6.33 .430 4.92 5.90 5.67 6.00 6.13 5.97 5.65 6.32 6.51 .522 5.66 6.10 5.83 5.63 6.17 - 5.65 6.50 6.62 .542 5.10 5.87 5.87 5.50 6.03 5.77 5.60 6.43 6.66 29346.376 5.05 5.32 5.73 5.97 5.95 5.50 5.70 6.33 6.66 .392 5.47 5.27 5.80 5.93 5.95 5.47 5.80 6.55 6.70 29719.549 4.98 5.80 5.80 5.57 5.77 5.77 5.78 6.20 6.52 .560 4.91 5.70 5.77 5.50 5.77 5.83 5.90 - 6.36 29720.546 5.33 5.57 5.58 5.63 6.00 5.77 5.70 - 6.42 .558 5.64 5.35 5.60 5.48 6.00 5.75 5.68 - 6.34 29774.405 4.80 5.67 5.68 5.68 5.83 6.10 5.83 6.35 6.35 .417 4.93 5.63 5.53 5.77 5.75 6.10 5.70 6.13 - 29775.403 5.26 5.20 5.50 5.93 5.87 5.93 5.82 6.13 6.06 .415 5.68 5.50 5.57 5.97 6.03 5.97 5.83 6.39 6.07 .426 5.72 5.40 - 6.03 6.10 5.87 5.90 6.10 6.35 .437 5.59 5.43 5.63 6.10 6.00 5.93 5.87 6.42 6.43 .447 5.12 5.47 5.55 6.03 6.00 5.97 5.85 6.12 6.25 30052.462 4.99 5.62 5.65 6.13 5.77 5.65 5.52 6.37 6.12 .474 4.97 - 5.80 6.13 5.67 5.55 5.65 6.34 6.13 .489 4.83 - 5.75 6.20 5.67 5.57 5.65 6.45 6.48 .501 5.13 5.55 5.77 6.10 5.70 5.55 5.73 6.46 6.37 30078.418 5.94 5.70 5.60 5.45 5.93 5.80 5.70 5.75 6.04 .434 5.46 - 5.60 5.42 6.00 5.77 5.77 5.98 6.17 .470 4.96 - 5.75 5.67 5.87 5.83 5.75 5.95 6.37 .483 5.08 - 5.67 5.70 5.90 5.80 5.68 5.91 6.52 .498 5.10 - 5.78 5.85 5.83 5.83 5.78 6.02 6.26 .509 4.95 5.65 5.73 5.78 6.00 5.70 5.68 6.06 6.44 .521 5.09 5.60 5.83 5.90 6.10 5.97 5.70 6.07 6.42 .536 5.50 5.37 5.73 6.17 6.03 5.80 5.63 6.24 6.48 .548 5.75 5.23 5.70 5.90 6.03 5.70 5.65 6.14 6.39 33390.497 5.16 5.97 5.65 5.83 5.93 5.90 5.62 6.21 6.70 .534 4.93 5.97 5.68 6.07 5.83 5.97 5.68 6.45 6.72 .545 5.05 5.97 5.65 6.10 5.93 5.90 5.65 6.42 6.50 .558 5.23 6.00 5.68 6.13 5.93 5.80 5.58 6.50 6.50 .570 5.30 5.88 5.87 6.00 5.83 5.90 5.87 6.45 6.61 .586 5.86 6.00 5.72 6.03 6.00 - 5.68 6.58 6.55 33420.424 5.06 6.10 5.72 5.73 6.07 5.77 5.68 6.41 6.53 .438 5.00 6.03 5.50 5.68 5.93 5.73 5.60 6.38 6.35 .450 4.83 5.90 5.57 5.58 5.93 5.78 5.60 6.35 6.51 .476 5.00 5.70 5.47 5.62 5.73 5.82 5.60 6.47 6.44 .487 5.28 5.68 5.47 5.68 5.62 5.77 5.60 6.51 6.61 .498 5.56 5.65 5.47 5.55 5.60 5.62 5.70 - 6.75 .510 6.12 5.53 5.53 5.53 5.57 5.77 5.73 6.52 6.70 .523 - 5.43 5.60 5.83 5.50 5.73 5.73 6.78 - 33421.385 5.10 5.80 5.53 5.77 5.93 5.70 5.80 - 6.03 .442 5.54 5.93 5.37 5.87 5.78 5.52 5.37 6.04 6.18 .454 5.97 5.90 5.47 5.85 5.97 5.73 5.47 6.01 6.17 .465 5.80 5.73 5.37 5.90 5.87 5.62 5.37 5.88 - .475 5.58 5.97 5.33 5.73 5.83 - 5.33 5.90 6.29 .486 - 5.83 5.40 5.77 5.93 5.65 5.40 5.62 6.57 .497 5.12 5.90 5.43 5.80 6.00 5.50 5.43 5.61 - .535 4.98 5.90 5.60 5.68 5.83 5.80 5.60 5.74 6.47 .548 4.96 5.87 5.63 5.65 6.02 5.90 5.63 5.71 - 33422.398 6.04 5.77 5.63 5.87 5.87 5.63 5.92 6.59 6.13 .431 5.22 - 5.53 5.92 - 5.57 5.87 - 6.25 .442 4.91 5.87 5.73 6.03 5.60 - 6.00 6.60 6.18 33422.452 4.86 5.97 5.72 5.90 5.68 5.70 6.13 - - .462 4.89 - - - - - - - - .472 5.00 5.93 5.70 6.10 5.67 5.58 6.07 6.63 6.65 .483 5.12 6.03 5.72 6.07 5.70 5.80 5.75 6.55 6.57 .493 4.99 6.03 5.53 6.13 5.40 5.57 5.50 6.45 6.69 .508 5.16 5.97 5.73 5.97 5.47 5.60 5.62 6.56 6.70 .520 5.50 5.77 5.73 6.03 5.60 5.68 5.55 6.64 6.75 33763.406 5.96 5.80 5.73 5.93 5.93 5.67 5.67 6.46 6.66 .420 5.61 5.73 5.63 5.93 6.00 5.60 5.58 6.45 6.44 .442 5.19 5.80 5.60 5.87 6.00 5.60 5.53 6.52 6.44 .455 5.05 6.00 5.77 6.03 6.17 5.75 5.73 6.19 6.47 .464 5.05 5.83 5.73 6.10 6.07 5.77 5.70 6.07 6.50 .483 5.03 5.97 5.58 5.97 6.07 5.62 5.68 6.08 6.56 .494 5.16 5.97 5.58 5.90 6.03 5.72 5.68 6.06 6.51 .504 5.13 6.03 5.80 6.10 6.13 5.90 5.80 5.88 6.56 .514 5.29 5.90 5.70 6.07 6.23 5.80 5.83 5.83 6.66 .525 5.61 5.87 5.60 6.03 6.27 5.83 5.78 5.82 6.55 34118.355 5.17 5.90 5.40 5.68 5.83 5.62 5.80 5.81 - .372 5.05 5.75 5.37 5.80 5.90 5.62 5.83 5.66 6.48 .388 5.24 5.78 5.37 5.90 5.78 5.52 5.62 5.99 - .428 5.72 5.93 5.73 5.97 6.00 - 5.80 6.20 - .443 5.43 6.03 5.80 5.93 6.03 5.65 5.73 6.00 6.32 .470 5.03 5.88 5.50 5.80 5.97 5.40 5.50 5.90 - .485 4.77 5.93 5.83 5.72 6.03 5.80 5.63 6.08 - .499 5.03 5.90 5.73 5.68 5.93 5.83 5.67 6.16 - .513 4.98 5.83 5.90 5.73 5.87 5.87 5.65 6.37 6.54 .526 5.10 5.63 5.63 5.60 5.87 5.70 5.60 - - .540 5.48 6.07 5.93 5.97 5.92 5.90 5.63 6.30 - 34120.471 5.20 5.67 - 5.77 5.67 5.62 - 6.26 6.32 .484 5.12 5.47 5.80 6.00 5.77 5.47 - - - .497 5.03 5.43 5.60 5.97 5.68 5.60 5.60 - - .510 5.00 - 5.68 6.10 - 5.50 5.68 6.39 - .523 5.06 5.40 5.70 5.97 5.68 5.62 5.70 6.33 6.55 .536 5.12 5.35 5.68 5.97 5.78 5.65 5.68 6.50 6.87 .551 5.23 5.27 5.73 6.10 5.80 5.73 5.80 6.35 - .564 5.61 5.40 5.57 5.93 5.68 5.57 5.80 6.50 - .579 5.68 5.47 5.53 5.90 5.70 5.55 5.60 6.45 - 34121.401 5.72 5.77 5.67 5.68 5.75 5.75 5.62 6.33 6.17 .412 5.34 5.72 5.55 5.72 6.03 5.75 5.60 6.02 6.63 .422 5.20 5.77 5.70 5.73 5.80 5.80 5.65 6.00 6.36 .431 5.03 5.83 5.60 5.68 5.90 5.82 5.60 5.95 6.49 .441 4.87 5.83 5.77 5.80 6.00 5.80 5.50 5.94 6.80 .484 5.04 5.87 5.70 5.92 5.97 5.70 5.63 5.76 6.61 .495 5.19 5.97 5.83 5.90 5.97 5.72 5.62 5.83 6.67 .505 5.54 5.97 5.77 5.83 6.00 5.62 5.62 5.75 6.55 .517 5.83 5.90 5.77 5.93 5.97 5.68 5.77 5.68 - .528 5.76 5.73 5.67 5.78 5.90 5.60 5.60 5.87 6.61 .539 5.57 5.90 5.60 5.93 6.00 5.53 5.60 5.89 6.52 .552 5.27 5.85 5.45 5.87 5.90 5.40 - 5.84 6.76 .562 5.09 5.80 5.50 5.90 5.80 5.30 - 5.83 6.53 .594 5.00 5.93 5.53 5.87 5.93 5.68 5.62 6.11 6.50 .605 5.22 - 5.45 5.93 5.87 5.70 5.85 6.13 6.60 34122.404 5.12 5.52 - 5.68 5.67 5.65 - 6.04 6.23 .416 5.20 5.55 5.68 5.80 5.57 5.85 5.72 6.26 6.27 .431 5.19 5.62 5.60 5.73 5.68 5.70 5.70 6.30 6.24 34126.433 5.13 5.80 5.63 5.75 5.70 5.65 5.80 6.40 6.45 34131.415 4.98 5.73 - 5.72 5.78 5.62 - 6.40 - 34487.347 5.41 6.05 5.77 5.62 6.08 5.47 5.77 6.31 6.61 34487.367 - 6.00 5.80 5.50 6.00 5.53 5.87 6.12 6.30 .385 5.19 6.00 5.93 5.72 6.13 5.75 5.93 6.12 6.28 .397 5.14 6.03 5.80 5.77 5.97 5.55 5.77 6.37 5.81 .410 5.35 5.97 5.67 5.87 5.97 5.57 5.60 6.31 5.78 .428 5.39 6.07 5.68 5.87 6.07 5.67 5.52 6.20 5.76 .438 5.60 6.00 5.83 5.93 6.03 5.73 5.55 6.10 - .449 6.19 6.10 5.77 5.90 5.93 5.93 5.62 6.33 - .460 5.93 5.93 5.72 5.93 5.93 5.67 5.63 6.30 - .474 5.76 5.77 5.43 6.00 6.03 5.70 5.43 6.56 - .483 5.44 5.55 5.27 5.97 5.92 - 5.37 6.35 - .494 5.30 5.62 5.40 5.93 5.90 - 5.43 6.35 - .508 5.18 5.60 5.13 6.03 6.00 - 5.43 6.32 - .518 5.10 5.37 5.27 6.00 5.93 - 5.53 - - 34488.530 6.12 5.85 5.37 6.03 5.97 5.63 5.43 6.23 - .540 6.00 - 5.42 6.03 6.07 - 5.48 5.92 - 34567.388 6.02 5.87 5.50 5.58 5.65 5.52 5.62 5.82 - 35223.415 5.20 5.30 5.73 5.97 5.97 5.43 6.65 5.92 - .428 5.09 5.43 5.70 6.00 5.93 5.37 5.62 5.93 - .441 - 5.50 5.70 5.97 5.97 5.65 5.62 5.97 - .467 5.14 5.27 5.70 5.87 6.00 5.73 5.40 6.14 - .490 5.49 5.58 5.65 5.90 5.97 5.67 5.50 6.00 5.75 .503 5.93 5.72 5.60 5.82 5.93 5.65 5.57 6.13 - .517 5.98 5.68 5.60 5.80 5.93 5.67 5.43 6.16 - .530 5.36 5.50 5.33 5.68 5.83 - 5.57 6.22 - .546 5.24 5.88 5.30 5.47 5.92 5.62 5.60 6.22 - .573 5.05 5.65 5.37 5.25 5.90 5.65 5.50 6.49 - 35224.454 6.00 5.78 5.62 5.90 5.63 5.52 5.63 6.58 - .472 5.22 5.88 5.58 5.70 5.65 5.33 5.58 6.72 - .485 5.24 5.90 5.73 5.63 5.77 5.57 5.58 6.53 - .499 5.02 5.88 5.53 5.67 5.80 5.55 5.47 6.38 - .512 5.11 5.87 5.43 5.63 5.62 5.52 5.50 6.64 - .524 5.00 - 5.37 5.60 5.60 5.40 5.43 6.33 - .542 5.16 5.77 5.45 5.58 5.70 5.55 5.50 6.30 - .556 5.19 5.50 5.47 5.47 5.87 5.78 5.50 6.08 - .569 5.65 - 5.17 5.52 5.72 - 5.40 - - .583 5.96 5.33 5.43 5.40 5.97 - 5.47 6.02 - 35227.534 5.46 5.67 5.60 5.63 5.53 5.30 5.60 6.41 5.31 .547 5.76 5.57 5.40 5.77 5.63 5.45 5.63 6.50 5.45 .560 6.06 5.30 5.68 5.57 5.80 5.20 5.53 6.61 5.77 .573 5.16 5.23 5.37 5.60 5.73 5.37 5.80 6.24 - .586 - 5.30 - 5.58 5.63 5.40 5.80 6.60 5.77 35598.507 5.20 5.97 5.77 5.80 5.68 5.27 5.53 5.87 6.06 .524 5.12 5.87 5.70 5.83 5.70 5.50 5.43 5.90 6.10 .537 5.02 5.80 5.65 5.90 5.60 5.33 5.27 5.94 6.20 35600.363 5.88 5.90 - 5.43 5.57 5.60 5.50 5.92 6.07 .378 5.43 5.80 5.53 5.43 5.50 5.47 5.43 5.92 5.29 .391 5.34 5.87 5.67 5.47 5.60 5.68 5.53 5.75 5.53 .405 5.08 5.93 5.62 5.53 - 5.68 5.40 5.86 5.66 .421 5.17 5.92 5.65 5.60 5.63 5.75 5.58 - - .434 5.08 6.00 5.57 5.68 5.63 5.83 5.50 5.93 5.67 .446 5.22 5.95 5.77 5.70 5.67 5.75 5.47 5.89 - .501 6.02 5.68 5.70 5.57 5.87 5.73 5.60 6.20 - .525 5.40 5.33 5.18 5.60 5.60 5.53 5.53 6.07 - 35603.369 5.18 5.83 5.73 5.67 5.87 5.40 5.47 6.55 - .381 5.20 5.90 5.65 5.77 6.00 5.40 5.47 6.55 6.50 .397 5.01 5.68 5.55 5.63 5.90 5.15 5.43 6.80 6.70 .408 5.12 5.93 5.62 5.68 5.80 5.37 5.47 6.52 6.26 .419 5.18 5.83 5.60 5.88 5.92 5.40 5.58 6.58 6.11 35603.431 5.32 5.93 5.75 5.97 5.93 - 5.55 6.53 5.43 .466 5.67 - 5.63 6.00 6.00 5.45 5.68 6.80 - .457 6.13 5.80 5.62 5.97 5.90 5.43 5.62 6.55 5.28 .468 6.09 5.90 5.50 5.97 5.97 5.53 5.87 6.61 5.31 .491 5.25 5.58 5.57 5.80 5.97 5.50 5.68 6.51 - .507 5.24 5.52 - 5.97 5.77 5.50 - 6.16 5.64 35920.444 5.68 - 5.90 5.87 5.82 5.65 5.83 6.63 6.22 .467 6.11 5.80 5.60 5.93 5.83 - 5.50 6.39 6.13 .487 - 5.50 5.50 5.73 - 5.50 5.73 6.34 - .504 5.18 5.55 5.47 5.70 5.73 - 5.47 - 6.22 .547 5.10 - 5.65 5.78 6.03 - 5.80 6.43 6.72 .562 5.20 5.80 5.50 5.80 5.90 - 5.63 6.35 6.58 .585 5.51 - 5.27 5.97 5.87 - 5.57 - 6.33 35933.415 6.28 5.90 5.72 5.87 5.90 5.60 5.68 6.51 6.58 .443 5.34 5.87 5.73 5.83 5.77 5.75 5.60 6.18 6.71 .479 4.90 5.83 5.73 5.80 5.87 5.93 5.83 5.92 6.59 .503 5.09 - - - - - - 5.45 5.07 .515 5.36 - - - - - - 5.37 4.80 .530 - - - 5.87 5.87 - - 5.36 4.72 .543 5.99 - - - - - - 5.51 4.59 .573 5.48 - 5.37 5.68 5.87 - 5.13 5.78 5.23 .588 5.10 - - - - - - 5.81 5.42 .602 5.03 - - - - - - - 5.30 36991.457 6.00 - 5.20 6.00 5.57 5.50 5.70 5.75 6.69 .470 5.84 - - 5.97 5.63 5.55 - 5.82 - .485 5.31 5.95 5.20 5.70 5.55 5.40 - 5.91 6.43 37018.470 5.04 5.93 5.63 5.63 5.50 5.43 5.50 6.21 - .483 4.90 5.87 5.70 5.73 5.70 5.65 5.42 6.51 6.36 .496 4.95 5.75 5.47 5.72 5.60 5.68 5.60 6.34 5.95 .510 5.00 - 5.30 5.47 5.65 5.60 5.45 - 5.35 .523 5.10 5.93 5.30 5.53 5.77 5.67 5.57 6.23 5.10 .537 - 5.80 5.43 5.62 5.73 - 5.47 - 5.19 .550 5.88 5.85 5.07 5.27 5.47 - 5.53 6.36 5.31 .563 - - - - - - - 6.31 5.38 .577 5.26 5.67 5.50 5.50 5.60 - - 6.45 5.46 .609 4.95 5.77 5.50 5.72 5.80 5.70 5.57 6.50 5.56 .623 - - - - - - - - 5.79 .637 4.79 5.90 5.57 5.93 5.90 5.60 5.63 6.27 5.59 37057.539 5.06 5.43 5.60 5.77 5.90 5.70 5.80 - - .552 4.84 5.50 5.70 5.90 5.97 5.80 5.57 6.17 6.59 .578 5.00 5.70 5.83 5.63 6.00 - 5.77 6.21 6.41 37058.529 4.79 6.03 5.97 5.93 5.93 5.83 5.60 6.26 6.70 .580 6.14 - 5.83 5.80 5.87 5.80 5.77 6.27 6.51 37757.598 5.00 5.30 - 5.62 5.90 - - 5.61 6.36 37791.365 4.80 6.03 5.97 5.87 5.90 5.77 5.70 5.73 5.71 .380 5.28 5.90 5.83 5.90 5.87 5.87 5.73 5.70 5.84 .394 5.63 5.97 5.97 5.97 6.00 5.60 5.90 5.71 5.89 .424 5.08 5.80 5.87 5.97 6.00 5.63 5.80 5.69 5.99 .439 4.83 6.13 5.65 5.80 5.93 5.90 5.73 5.71 6.08 .454 4.68 5.80 5.65 6.03 6.10 5.80 5.70 5.83 6.25 .469 4.64 6.10 5.83 5.93 6.07 5.90 5.90 5.89 6.25 .483 - 6.00 5.57 5.80 5.97 5.80 5.73 5.98 6.17 .497 5.05 5.90 5.68 5.83 5.90 5.87 5.80 5.88 6.33 .519 5.81 5.65 5.70 5.80 5.93 5.90 5.87 6.09 6.48 .533 5.90 5.50 5.77 5.97 6.00 5.83 5.97 6.18 6.59 .549 5.30 5.25 5.72 5.80 5.93 5.90 5.77 6.14 6.70 .563 5.06 5.23 5.63 5.97 5.93 5.80 5.67 6.46 6.59 Fig. 3a O - C diagrams of variables Nos. 3, 30, 128, 137 and 141 Fig. 3b O - C diagram of variable No. 111 Fig. 3c O - C diagrams of variables No. 130 and No. 144 Fig. 3d O - C diagrams of variables Nos. 152, 167, 177, and 178 Fig. 3e O - C diagrams of variables SVS 1264 = v.Z.89 and SVS 1276 = v.Z.1221 The author would like to thank Professor L. 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