ADOPTED LEVELS, GAMMAS for 36Cl
Authors: Ninel Nica, John Cameron and Balraj Singh Citation: Nucl. Data Sheets 113, 1 (2012) Cutoff date: 31-Dec-2011
Q(β-)=709.52 keV 5 | S(n)= 8580 keV | S(p)= 7964.77 keV 3 | Q(α)= -7642.06 keV 5 |
Reference: 2012WA38 |
References: | |||
A | 2H(35Cl,pγ) | B | 3H(35Cl,dγ) |
C | 27Al(14N,PAG) | D | 33S(α,pγ) |
E | 34S(3He,pγ) | F | 34S(α,d) |
G | 35Cl(n,γ) E=THERMAL | H | 35Cl(n,γ),(n,n):RES |
I | 35Cl(d,p) | J | 35Cl(d,pγ) |
K | 36Ar(n,p) | L | 37Cl(γ,n) |
M | 37Cl(p,d) | N | 37Cl(d,t),(pol d,t) |
O | 37Cl(3He,α) | P | 37Cl(3He,αγ) |
Q | 38Ar(p,3He) | R | 38Ar(pol d,α) |
S | 39K(n,αγ) | T | 40Ca(μ-,NUAG) |
E(level) (keV) | XREF | Jπ(level) | T1/2(level) | E(γ) (keV) | I(γ) | M(γ) | Final level | |
0.0 | ABCDE G IJKLMNOPQRST | 2+ | 3.013×10+5 y 15 % β- = 98.1 1 % ε = 1.9 1 | |||||
788.4328 4 | ABCD FG IJKLMNOP RST | 3+ | 14.7 ps 10 | 788.4236 4 | 100 5 | M1+E2 | 0.0 | 2+ |
1164.8799 9 | ABCDE G IJKLMNOPQRST | 1+ | 6.9 ps 4 | 376.446 5 1164.860 5 | 0.01 100.0 5 | M1+E2 | 788.4328 0.0 | 3+ 2+ |
1601.1034 14 | A DE G IJKLMNOPQRST | 1+ | 0.64 ps 4 | 436.2200 19 812.660 5 1601.065 5 | 25.52 17 1.8 3 100.0 6 | M1,E2 M1,E2 | 1164.8799 788.4328 0.0 | 1+ 3+ 2+ |
1951.1853 7 | ABCD G IJ Q ST | 2- | 1.87 ps 21 | 786.29643 53 1162.734 5 1951.12647 89 | 54.01 5 12.0 5 100.0 6 | E1,M2 E1,M2 E1,M2 | 1164.8799 788.4328 0.0 | 1+ 3+ 2+ |
1959.3940 13 | A D G IJ LMNOP R T | 2+ | 43.6 fs 14 | 358.2891 24 1170.941 5 1959.337 5 | 1.80 5 44 3 100.0 7 | 1601.1034 788.4328 0.0 | 1+ 3+ 2+ | |
2468.2590 8 | ABCD G IJK M | 3- | 0.97 ps 10 | 508.8635 18 517.06962 22 1679.786 5 2468.171 5 | 1.42 22 100.0 7 0.90 5 1.28 11 | M1+E2 | 1959.3940 1951.1853 788.4328 0.0 | 2+ 2- 3+ 2+ |
2492.3035 22 | A D G IJ LMNOPQ S | 2+ | 40 fs 9 | 532.904 4 891.188 4 1327.396 4 2492.210 6 | 10.2 8 5.7 17 100.0 6 27 10 | M1+E2 M1+E2 M1,E2 | 1959.3940 1601.1034 1164.8799 0.0 | 2+ 1+ 1+ 2+ |
2518.396 3 | ABCD FG IJ LM P | 5- | 1.61 ns 8 | 1729.919 7 2518.301 4 | 0.107 12 100 5 | M2+E3 E3 | 788.4328 0.0 | 3+ 2+ |
2676.440 7 | D G IJ LMNOP | 1+,(2+) | 21 fs 3 | 717.028 16 2676.323 17 | 9.9 20 100 3 | M1+E2 | 1959.3940 0.0 | 2+ 2+ |
2810.5731 21 | A CD G IJ LM P | 4- | 2.36 ps 21 | 292.176 4 342.311 4 859.376 4 2022.081 6 | 61.1 6 3.4 6 20.5 19 100 4 | M1(+E2) E2 E1+M2 | 2518.396 2468.2590 1951.1853 788.4328 | 5- 3- 2- 3+ |
2863.9305 22 | G IJ LMNOP T | (3)+ | 14.6 fs 7 | 904.523 6 2075.432 7 2863.807 7 | 0.77 22 13.9 4 100.0 6 | 1959.3940 788.4328 0.0 | 2+ 3+ 2+ | |
2896.3213 15 | A G IJ LM | (2,3)- | 596 fs 55 | 85.748 4 428.058 3 936.915 3 945.122 3 2896.197 6 | 1.3 3 2.3 4 100.0 8 30 4 85 3 | 2810.5731 2468.2590 1959.3940 1951.1853 0.0 | 4- 3- 2+ 2- 2+ | |
2994.674 3 | G IJ LM O | (1,2,3)- | 62 fs 8 | 502.365 8 1035.261 7 1043.468 7 2994.538 8 | 2.0 5 10.4 25 13 5 100.0 3 | 2492.3035 1959.3940 1951.1853 0.0 | 2+ 2+ 2- 2+ | |
3100.7000 13 | A CD G IJ | (4)- | 149 fs +49-28 | 204.379 4 236.772 6 582.300 6 632.4340 19 2312.1876 18 | 3.3 7 1.6 5 2.9 9 100.0 14 54 | M1+E2 E1,M2 | 2896.3213 2863.9305 2518.396 2468.2590 788.4328 | (2,3)- (3)+ 5- 3- 3+ |
3.12E3 10 ? | Q | 0+ | ||||||
3207.35 15 | IJ M | (0:3)- | 97 fs 14 | 1256.14 20 2042.41 20 | 11 100 | 1951.1853 1164.8799 | 2- 1+ | |
3332.2902 15 | G IJ M O | (2)- | 73 fs 7 | 337.615 5 435.964 6 468.356 3 655.852 17 864.016 5 1372.866 5 1731.141 6 2543.7612 21 | 17 6 49 8 26.1 19 2.4 13 39.0 3 100.0 4 65 9 14 | 2994.674 2896.3213 2863.9305 2676.440 2468.2590 1959.3940 1601.1034 788.4328 | (1,2,3)- (2,3)- (3)+ 1+,(2+) 3- 2+ 1+ 3+ | |
3470.016 9 | G IJ LMNOPQ | 1+,(2)+ | < 24 fs | 369.30 3 ? 659? 1510.57 3 1868.861 12 3469.82 3 | 40 10 100 10 70 69 6 | [M2,E3] [M2,E3] | 3100.7000 2810.5731 1959.3940 1601.1034 0.0 | (4)- 4- 2+ 1+ 2+ |
3566 4 | M O | + | ||||||
3599.5240 19 | G IJ M | (3)- | 40.9 fs 21 | 703.195 4 735.588 7 1131.244 4 1640.090 4 1648.297 4 2810.974 6 3599.332 6 | 5.6 3 2.3 4 100.0 5 25 3 37.8 8 23.0 11 26.2 10 | 2896.3213 2863.9305 2468.2590 1959.3940 1951.1853 788.4328 0.0 | (2,3)- (3)+ 3- 2+ 2- 3+ 2+ | |
3634.992 5 | G IJ L | (1)- | 21 fs 10 | 302.694 17 640.306 17 958.541 19 1683.754 17 2033.827 6 2470.013 17 3634.787 17 | 0.9 5 2.0 4 7.5 13 35 4 37 100 13 40.8 25 | 3332.2902 2994.674 2676.440 1951.1853 1601.1034 1164.8799 0.0 | (2)- (1,2,3)- 1+,(2+) 2- 1+ 1+ 2+ | |
3660.335 14 | G IJ | (1-,2) | < 55 fs | 665.65 4 1709.10 4 2495.36 4 3660.13 4 | 32 7 100 7 95 41 96 7 | 2994.674 1951.1853 1164.8799 0.0 | (1,2,3)- 2- 1+ 2+ | |
3660.6 15 ? | G M | 665.9 25 850.0 25 | 24 6 100 24 | 2994.674 2810.5731 | (1,2,3)- 4- | |||
3723.4 4 | D IJ OP | 4- | 49 fs 10 | 912.8 4 | 100 | M1+E2 | 2810.5731 | 4- |
3772 4 | M | - | ||||||
3825.88 20 | IJ | 2224.7 2 | 100 | 1601.1034 | 1+ | |||
3941.324 16 | G | (1+,2,3+,4+) | 1264.84 4 3152.72 4 | 100 24 86 14 | 2676.440 788.4328 | 1+,(2+) 3+ | ||
3962.900 7 | G IJ M | (2)- | < 21 fs | 630.602 19 968.211 20 1066.558 19 2003.443 19 2011.650 19 2797.900 19 3962.663 19 | 2.8 6 8.3 18 20 7 56 3 29 3 81 8 100 7 | 3332.2902 2994.674 2896.3213 1959.3940 1951.1853 1164.8799 0.0 | (2)- (1,2,3)- (2,3)- 2+ 2- 1+ 2+ | |
3992.06 8 | IJ M O | (1,2,3)- | 21 fs 7 | 2032.60 8 | 100 | 1959.3940 | 2+ | |
4031.901 16 | G I LM | (0,1,2)- | 371.562 20 2430.70 4 2866.88 4 | 0.73 16 38 5 100 6 | 3660.335 1601.1034 1164.8799 | (1-,2) 1+ 1+ | ||
4061.478 8 | G I | (1,2,3)- | 729.173 21 2110.215 20 4061.223 21 | 2.9 7 81 7 100 71 | 3332.2902 1951.1853 0.0 | (2)- 2- 2+ | ||
4138.978 7 | G I | (2)- | 478.64 4 503.983 22 539.442 17 2179.506 16 2537.772 16 3350.371 17 4138.715 17 | 23 13 4.1 8 9.5 15 100 42 61 20 79 8 | 3660.335 3634.992 3599.5240 1959.3940 1601.1034 788.4328 0.0 | (1-,2) (1)- (3)- 2+ 1+ 3+ 2+ | ||
4205.648 24 | G M O | (0:3)+ | 2246.17 5 3040.62 5 4205.38 5 | 37 8 100 11 | 1959.3940 1164.8799 0.0 | 2+ 1+ 2+ | ||
4262.0 18 | I | |||||||
4294.52 10 | CD | 6- | 5.2 ps 48 | 1484.1 5 1776.06 10 | 5.9 6 100.0 6 | E2 M1+E2 | 2810.5731 2518.396 | 4- 5- |
4299.667 14 | E G I LMNOPQ | (0)+ | 1623.19 4 2698.44 4 3134.641 19 | 11 5 100 12 43 8 | 2676.440 1601.1034 1164.8799 | 1+,(2+) 1+ 1+ | ||
4315.61 4 | G I M | (1,2)- | 1847.29 10 2356.13 10 2364.34 10 2714.39 10 | 100 16 58 37 29 4 63 21 | 2468.2590 1959.3940 1951.1853 1601.1034 | 3- 2+ 2- 1+ | ||
4410.064 12 | G I | (1+,2,3+) | 468.75 3 2450.57 3 2808.83 3 3245.02 3 3621.43 3 | 49 10 100 50 31 3 35 5 | 3941.324 1959.3940 1601.1034 1164.8799 788.4328 | (1+,2,3+,4+) 2+ 1+ 1+ 3+ | ||
4496.752 17 | G I | (2)- | 464.84 5 2537.25 3 3708.10 3 | 3.0 22 100 10 40 5 | 4031.901 1959.3940 788.4328 | (0,1,2)- 2+ 3+ | ||
4525.179 8 | G M P | (-) | 225.51 3 463.699 16 2565.679 20 3360.123 20 3736.531 20 4524.866 20 | 1.08 7 1.4 11 41 20 22 7 41 20 100 5 | 4299.667 4061.478 1959.3940 1164.8799 788.4328 0.0 | (0)+ (1,2,3)- 2+ 1+ 3+ 2+ | ||
4551.43 4 | G I M OP | (0:3)+ | 2591.93 7 3386.37 7 4551.11 7 | 100 27 17 3 52 7 | 1959.3940 1164.8799 0.0 | 2+ 1+ 2+ | ||
4598.426 18 | G I O | 3- | 459.45 5 998.88 5 1787.80 5 2638.92 5 2647.13 5 3809.78 5 4598.11 5 | 5.1 17 6.2 17 100 3 27 3 50 3 17 6 8.4 9 | 4138.978 3599.5240 2810.5731 1959.3940 1951.1853 788.4328 0.0 | (2)- (3)- 4- 2+ 2- 3+ 2+ | ||
4724.1 15 | I M O | - | ||||||
4738 5 | M | |||||||
4754.35 4 | G I | (1,2)- | 2794.71 13 3589.16 13 4753.90 13 | 20 11 100 28 22 6 | 1959.3940 1164.8799 0.0 | 2+ 1+ 2+ | ||
4757.983 7 | G | 3- | 619.001 24 696.501 19 1425.658 21 1657.235 20 2265.598 20 2289.637 20 4757.640 20 | 1.8 6 4.3 10 22 3 73 5 74 10 100 14 42 5 | 4138.978 4061.478 3332.2902 3100.7000 2492.3035 2468.2590 0.0 | (2)- (1,2,3)- (2)- (4)- 2+ 3- 2+ | ||
4823.7 15 | M | |||||||
4829.54 3 | G M | (2-,3-) | 4040.85 5 4829.17 5 | 44 6 100 8 | 788.4328 0.0 | 3+ 2+ | ||
4846.7 15 | I M | - | ||||||
4876.7 15 | I | |||||||
4884.0 7 | I M OP | (1,2,3)+ | 2020.0 9 3718.9 9 | | 2863.9305 1164.8799 | (3)+ 1+ | ||
4916 20 | O | |||||||
4956.5 3 | I M | - | ||||||
4997.195 21 | FG | (3)+ | 1034.27 22 2133.18 22 3832.08 22 4996.81 22 | 100 16 27 5 33 7 42 13 | 3962.900 2863.9305 1164.8799 0.0 | (2)- (3)+ 1+ 2+ | ||
4997.6 7 | G I | (3)- | 2479.1 11 2529.2 11 4997.2 11 | 41 15 100 11 32 8 | 2518.396 2468.2590 0.0 | 5- 3- 2+ | ||
5018.078 12 | G | 466.65 7 1076.75 4 1357.71 5 2525.67 3 2549.71 3 5017.69 3 | 6 3 6 3 12 4 39 8 56 9 100 5 | 4551.43 3941.324 3660.335 2492.3035 2468.2590 0.0 | (0:3)+ (1+,2,3+,4+) (1-,2) 2+ 3- 2+ | |||
5079.161 24 | G I | (1,2,3)- | 5078.75 4 | 100 | 0.0 | 2+ | ||
5150.629 10 | G I M | (1,2)- | 1089.14 3 1515.60 3 2254.220 22 2474.10 3 2682.250 22 5150.223 22 | 13 4 61 6 95 6 100 38 60 6 94 15 | 4061.478 3634.992 2896.3213 2676.440 2468.2590 0.0 | (1,2,3)- (1)- (2,3)- 1+,(2+) 3- 2+ | ||
5204.606 20 | G I O | (2)- | 2104 5 2528.07 4 4415.86 4 5204.19 4 | 100 7 75 6 36 9 62 4 | 3100.7000 2676.440 788.4328 0.0 | (4)- 1+,(2+) 3+ 2+ | ||
5246.587 16 | G M | (1+,2+,3+) | 2382.57 4 2570.06 5 3295.23 4 3645.28 4 4457.85 4 5246.17 4 | 59 6 29 11 34 8 16 3 41 10 100 38 | 2863.9305 2676.440 1951.1853 1601.1034 788.4328 0.0 | (3)+ 1+,(2+) 2- 1+ 3+ 2+ | ||
5263.09 5 | G I | (1,2)- | 1231.16 10 3311.73 9 4097.95 9 5262.67 9 | 100 8 53 11 100 28 89 17 | 4031.901 1951.1853 1164.8799 0.0 | (0,1,2)- 2- 1+ 2+ | ||
5308.12 11 | I | - | ||||||
5313.55 13 | CD F | 7+ | 19.7 ps 15 | 1019.01 10 2795.1 3 | 100 4 65 4 | E1+M2 M2(+E3) | 4294.52 2518.396 | 6- 5- |
5329.160 21 | G I | (2-,3+) | 2518.48 5 2836.72 5 3727.84 5 4164.01 5 | 100 21 79 16 58 11 | 2810.5731 2492.3035 1601.1034 1164.8799 | 4- 2+ 1+ 1+ | ||
5369.8 15 ? | I | |||||||
5463.530 9 | G I | (2)- | 466.35 4 1828.488 17 2131.165 23 3503.944 23 3512.150 23 4298.366 23 | 4.1 12 91 4 38 6 20 3 100 8 | 4997.195 3634.992 3332.2902 1959.3940 1951.1853 1164.8799 | (3)+ (1)- (2)- 2+ 2- 1+ | ||
5473.712 18 | G | (3) | 455.64 5 2955.17 5 4308.55 5 5473.26 5 | 16 8 81 11 48 22 100 19 | 5018.078 2518.396 1164.8799 0.0 | 5- 1+ 2+ | ||
5517.650 6 | G I M | (2)- | 1202.02 10 2653.612 18 3025.207 18 3558.063 17 3566.269 17 3916.314 18 4728.879 17 5517.192 17 | 6.0 4 4.5 5 3.2 7 12.0 14 17 4 3.9 5 39.8 16 100.0 9 | 4315.61 2863.9305 2492.3035 1959.3940 1951.1853 1601.1034 788.4328 0.0 | (1,2)- (3)+ 2+ 2+ 2- 1+ 3+ 2+ | ||
5545.0 15 | I | |||||||
5563.550 8 | G | (2-,3-) | 1247.9 5 2231.180 21 2568.96 17 2752.855 20 3095.138 20 3603.955 20 3612.161 20 | 17 6 74 4 47 11 63 8 30 8 100 5 28 4 | 4315.61 3332.2902 2994.674 2810.5731 2468.2590 1959.3940 1951.1853 | (1,2)- (2)- (1,2,3)- 4- 3- 2+ 2- | ||
5578.46 4 | G I | (1,2)- | 3059.92 5 3627.08 5 | 100 15 66 8 | 2518.396 1951.1853 | 5- 2- | ||
5578.498 17 | G | (2-) | 427.89 10 2246.18 11 2478 5 3086.10 11 3627.17 11 3977.21 11 4413.38 11 | 9.8 16 55 16 100 20 50 30 39 5 40 4 53 10 | 5150.629 3332.2902 3100.7000 2492.3035 1951.1853 1601.1034 1164.8799 | (1,2)- (2)- (4)- 2+ 2- 1+ 1+ | ||
5604.295 12 | G | (2,3+) | 2740.24 3 2927.73 3 3135.88 3 4002.95 3 4815.51 3 5603.82 3 | 36 4 45 9 33 4 33 4 43 5 100 27 | 2863.9305 2676.440 2468.2590 1601.1034 788.4328 0.0 | (3)+ 1+,(2+) 3- 1+ 3+ 2+ | ||
5604.32 7 | G | 3135.91 7 | 100 | 2468.2590 | 3- | |||
5605 5 | M | + | ||||||
5619.23 9 | I | - | ||||||
5660 30 | Q | |||||||
5694.42 21 | I | - | ||||||
5703.059 13 | G I M P | (1,2,3)- | 3210.59 3 3743.44 3 5702.56 3 | 35 8 24 24 100 8 | 2492.3035 1959.3940 0.0 | 2+ 2+ 2+ | ||
5734.041 6 | G I LM OP | (2)- | 976.037 24 979.68 5 1528.35 5 3774.422 15 4132.670 15 4945.231 15 5733.538 15 | 2.7 6 5.2 16 18 7 39 5 19 5 100 9 83 6 | 4757.983 4754.35 4205.648 1959.3940 1601.1034 788.4328 0.0 | 3- (1,2)- (0:3)+ 2+ 1+ 3+ 2+ | ||
5766 8 | I | - | ||||||
5778.455 18 | G | (2-,3) | 760.38 4 2446.07 5 2967.74 5 3827.04 5 4989.64 5 5777.95 5 | 3.1 8 19 3 19 4 100 7 42 25 25 3 | 5018.078 3332.2902 2810.5731 1951.1853 788.4328 0.0 | (2)- 4- 2- 3+ 2+ | ||
5778.58 9 | C G | (2,3,4) | 2914.53 12 3310.16 12 | 100 30 100 30 | 2863.9305 2468.2590 | (3)+ 3- | ||
5780.12 20 ? | C | (8) | 466.57 15 | 100 46 | D | 5313.55 | 7+ | |
5831.9 4 | I O | - | ||||||
5866.6 15 | I | |||||||
5898.48 10 | I O | - | ||||||
5912.01 11 | I M | |||||||
5947.6 15 | I | - | ||||||
5956.677 11 | G I M O | (0:4)+ | 3997.039 25 4355.286 25 4791.450 25 5956.143 25 | 37 8 78 7 15 2 100 22 | 1959.3940 1601.1034 1164.8799 0.0 | 2+ 1+ 1+ 2+ | ||
5959.5 25 | G I | (1+,2,3+) | 1463 6 2489 6 2627 6 3096 6 4358 6 5959 6 | 59 26 50 13 76 13 76 13 67 13 100 17 | 4496.752 3470.016 3332.2902 2863.9305 1601.1034 0.0 | (2)- 1+,(2)+ (2)- (3)+ 1+ 2+ | ||
5986 5 | M O | (-) | ||||||
6027 8 | I O | |||||||
6042.316 11 | G | (2-,3-) | 1517.09 3 2407.23 3 2941.47 3 4090.87 3 6041.77 4 | 40 8 100 10 67 7 16 3 | 4525.179 3634.992 3100.7000 1951.1853 0.0 | (-) (1)- (4)- 2- 2+ | ||
6051.1 3 | I | - | ||||||
6084.84 8 | I | - | ||||||
6089.872 16 | G M OP | (1+,2) | 616.16 3 2148.45 12 2429.45 5 2454.79 5 2757.46 4 4138.42 4 5301.01 4 | 24 5 50 14 45 4 41 9 43 9 100 15 29 6 | 5473.712 3941.324 3660.335 3634.992 3332.2902 1951.1853 788.4328 | (3) (1+,2,3+,4+) (1-,2) (1)- (2)- 2- 3+ | ||
6095.6 10 | M OP | + | 6095 | | 0.0 | 2+ | ||
6146.6 10 | M P | + | 6146 | | 0.0 | 2+ | ||
6154 7 | I O | - | ||||||
6184.96 4 | G M OP | + | 6184.35 5 | 100 | 0.0 | 2+ | ||
6236.4 5 | I | - | ||||||
6253.551 18 | G I O | (1,2)- | 779.83 6 4293.88 4 4652.11 4 5088.28 4 6252.96 4 | 9 9 28 6 20 3 100 40 49 19 | 5473.712 1959.3940 1601.1034 1164.8799 0.0 | (3) 2+ 1+ 1+ 2+ | ||
6268.184 9 | G I | (2-,3+) | 225.87 3 1858.07 3 2798.05 3 3371.680 19 3457.418 19 6267.585 19 | 0.9 4 68 5 63 5 25 18 12.3 23 100 31 | 6042.316 4410.064 3470.016 2896.3213 2810.5731 0.0 | (2-,3-) (1+,2,3+) 1+,(2)+ (2,3)- 4- 2+ | ||
6339.90 3 | G I | (1,2,3)- | 6339.26 4 | 100 | 0.0 | 2+ | ||
6344.417 25 | G | (1-,2,3-) | 1265.24 6 2282.85 4 6343.79 5 | 55 11 91 11 100 21 | 5079.161 4061.478 0.0 | (1,2,3)- (1,2,3)- 2+ | ||
6354.882 19 | G M | (2,3)+ | 576.42 5 3458.37 4 3490.76 4 4753.43 4 | 3.4 8 26 8 9 5 100 29 | 5778.455 2896.3213 2863.9305 1601.1034 | (2-,3) (2,3)- (3)+ 1+ | ||
6379.480 10 | G LM OP | (4)+ | 1382.26 4 3860.846 21 4419.780 20 6378.859 20 | 20 5 52 16 18 3 100 11 | 4997.195 2518.396 1959.3940 0.0 | (3)+ 5- 2+ 2+ | ||
6423.382 9 | G M | (2,3)- | 2953.23 3 3526.862 19 5634.464 19 6422.754 19 | 26 3 27 2 21 6 100 9 | 3470.016 2896.3213 788.4328 0.0 | 1+,(2)+ (2,3)- 3+ 2+ | ||
6441 7 | I O | - | ||||||
6469 8 | I | |||||||
6487.746 24 | G LM O | (1,2,3)- | 2524.74 4 6487.10 4 | 81 10 100 21 | 3962.900 0.0 | (2)- 2+ | ||
6487.82 15 | G | (1+,2,3,4-) | 3623.69 21 4536.33 21 | 100 26 85 18 | 2863.9305 1951.1853 | (3)+ 2- | ||
6504.6 5 | I | - | ||||||
6528.4 5 | I O | |||||||
6538.202 14 | G I O | (2,3+) | 495.882 20 3068.04 4 4586.68 3 5372.88 3 | 3.3 10 57 28 100 10 17.6 18 | 6042.316 3470.016 1951.1853 1164.8799 | (2-,3-) 1+,(2)+ 2- 1+ | ||
6544.966 8 | G M | (1,2,3)+ | 841.896 22 1526.85 4 2512.97 5 4585.245 18 4593.451 18 6544.314 18 | 14 3 47 9 74 11 100 15 41 11 56 8 | 5703.059 5018.078 4031.901 1959.3940 1951.1853 0.0 | (1,2,3)- (0,1,2)- 2+ 2- 2+ | ||
6576.7 5 | I | - | ||||||
6595.2 8 | I M | (-) | ||||||
6604.325 16 | G I | (2) | 870.28 4 1086.64 3 1525.14 5 2662.90 5 3271.86 4 4111.76 4 | 14 3 62 12 75 15 100 74 91 50 91 62 | 5734.041 5517.650 5079.161 3941.324 3332.2902 2492.3035 | (2)- (2)- (1,2,3)- (1+,2,3+,4+) (2)- 2+ | ||
6618 5 | M O | + | ||||||
6642.649 12 | G | (1-,2+) | 2342.89 4 4174.109 22 6641.972 22 | 27 5 10 3 100 17 | 4299.667 2468.2590 0.0 | (0)+ 3- 2+ | ||
6673.13 15 | I M O | - | ||||||
6750 6 | M O | + | ||||||
6771.0 10 | OP | 5982 | | 788.4328 | 3+ | |||
6773.22 4 | G LM | + | 2567.45 6 2711.60 5 | 100 | 4205.648 4061.478 | (0:3)+ (1,2,3)- | ||
6774 6 | M | + | ||||||
6826 6 | LM | + | ||||||
6836.490 17 | G O | 1257.99 4 3504.00 3 4884.92 3 | 31 6 100 8 49 10 | 5578.498 3332.2902 1951.1853 | (2-) (2)- 2- | |||
6894 6 | M O | + | ||||||
6950.0 7 | I | |||||||
6952.625 22 | G | (1,2,3) | 3292.12 6 5001.05 4 6951.89 4 | 49 11 25 4 100 16 | 3660.335 1951.1853 0.0 | (1-,2) 2- 2+ | ||
6997.14 21 | I M O | - | ||||||
7082.649 20 | G L O | (2) | 537.67 4 4087.71 4 5122.84 4 7081.94 7 | 14 5 100 16 56 7 | 6544.966 2994.674 1959.3940 0.0 | (1,2,3)+ (1,2,3)- 2+ 2+ | ||
7085.0 10 | M OP | + | 6296 | | 788.4328 | 3+ | ||
7165 6 | M O | |||||||
7339 15 | O | |||||||
7512 6 | M | + | ||||||
7559.167 24 | G LM | (1,2,3)+ | 2229.92 4 7558.29 4 | 86 11 100 27 | 5329.160 0.0 | (2-,3+) 2+ | ||
7564.7 6 | OP | (0+,1,2,3+) | 5073 5604 5963 | 43 10 95 14 100 14 | 2492.3035 1959.3940 1601.1034 | 2+ 2+ 1+ | ||
7663 6 | M O | + | ||||||
7755 6 | M | (-) | ||||||
7870 6 | M | + | ||||||
8184 6 | M | (+) | ||||||
8579.795 5 S | G | 2+ | 1020.57 4 1497.07 4 1627.09 4 1743.22 3 1806.48 5 1937.049 20 1975.37 4 2034.728 16 2041.49 3 2091.95 4 2156.308 17 2200.205 18 2224.80 4 2235.26 5 2239.78 4 2311.493 17 2326.13 4 2394.70 5 2489.80 4 2537.341 25 2622.991 23 2801.19 5 2845.594 12 2876.57 3 2975.33 3 3001.161 19 3016.075 18 3061.979 17 3105.90 5 3116.087 23 3250.44 5 3316.51 9 3333.01 4 3374.98 4 3428.956 21 3500.41 4 3561.49 3 3582.39 3 3750.01 5 3821.563 21 3825.17 5 3981.11 5 4028.09 7 4054.339 21 4082.76 3 4169.44 3 4263.88 10 4440.487 16 4517.976 21 4547.55 4 4616.549 20 4638.10 3 4918.7 25 4944.404 17 4979.888 10 5109.35 3 5247.072 10 5584.633 11 5715.356 10 5902.798 17 6086.921 10 6110.9802 40 6619.732 9 6627.945 9 6977.951 10 7414.086 9 7790.454 10 8578.696 10 | 0.52 5 1.02 8 1.43 8 1.34 6 0.85 6 2.32 14 3.3 3 3.63 8 1.84 8 1.09 8 3.11 11 1.87 8 0.8 3 0.88 6 0.99 6 5.3 15 1.05 8 0.79 6 2.14 9 2.70 9 2.78 11 5.30 5 2.49 11 5.72 6 3.28 11 4.98 5 17.10 11 0.77 6 4.51 5 1.18 9 1.24 8 3.66 11 2.72 11 4.11 5 1.52 9 3.2 6 0.67 8 1.46 8 4.86 15 3.79 14 5.02 11 0.93 9 2.94 12 3.99 8 0.27 3 0.14 2 5.72 6 0.73 8 2.22 12 3.19 15 0.64 15 0.30 11 5.75 12 18.69 15 0.41 8 2.96 15 2.40 17 27.59 24 5.64 6 4.48 23 100.0 9 38.4 4 22.25 24 11.24 15 49.9 8 40.4 5 13.40 20 | E1 E1 E1 E1 E1 E1 E1 M1+E2 M1+E2 E1 M1+E2 M1+E2 M1+E2 | 7559.167 7082.649 6952.625 6836.490 6773.22 6642.649 6604.325 6544.966 6538.202 6487.746 6423.382 6379.480 6354.882 6344.417 6339.90 6268.184 6253.551 6184.96 6089.872 6042.316 5956.677 5778.455 5734.041 5703.059 5604.295 5578.498 5563.550 5517.650 5473.712 5463.530 5329.160 5263.09 5246.587 5204.606 5150.629 5079.161 5018.078 4997.195 4829.54 4757.983 4754.35 4598.426 4551.43 4525.179 4496.752 4410.064 4315.61 4138.978 4061.478 4031.901 3962.900 3941.324 3660.6 3634.992 3599.5240 3470.016 3332.2902 2994.674 2863.9305 2676.440 2492.3035 2468.2590 1959.3940 1951.1853 1601.1034 1164.8799 788.4328 0.0 | (1,2,3)+ (2) (1,2,3) + (1-,2+) (2) (1,2,3)+ (2,3+) (1,2,3)- (2,3)- (4)+ (2,3)+ (1-,2,3-) (1,2,3)- (2-,3+) (1,2)- + (1+,2) (2-,3-) (0:4)+ (2-,3) (2)- (1,2,3)- (2,3+) (2-) (2-,3-) (2)- (3) (2)- (2-,3+) (1,2)- (1+,2+,3+) (2)- (1,2)- (1,2,3)- (3)+ (2-,3-) 3- (1,2)- 3- (0:3)+ (-) (2)- (1+,2,3+) (1,2)- (2)- (1,2,3)- (0,1,2)- (2)- (1+,2,3+,4+) (1)- (3)- 1+,(2)+ (2)- (1,2,3)- (3)+ 1+,(2+) 2+ 3- 2+ 2- 1+ 1+ 3+ 2+ | |
8580.18 1 | H | 2- | ||||||
8583.92 1 | H | 1- | ||||||
8585.13 1 | H | (1-) | ||||||
8594.18 1 | H | 2+ | ||||||
8595.69 1 | H | (3-) | ||||||
8596.44 1 | H | 3- | ||||||
8601.56 1 | H | (0-) | ||||||
8605.66 1 | H | 2+ | ||||||
8606.37 1 | H | (2-) | ||||||
8616.50 1 | H | (1-) | ||||||
8618.93 1 | H | (3-) | ||||||
8622.72 1 | H | (1-) | ||||||
8629.95 1 | H | (3-) | ||||||
8631.28 1 | H | (2-) | ||||||
8633.18 1 | H | 1+ | ||||||
8635.98 1 | H | (2-) | ||||||
8640.81 1 | H | 1- | ||||||
8646.11 1 | H | 1+ | ||||||
8653.17 1 | H | (2+) | ||||||
8667.67 1 | H | (2-) | ||||||
8667.78 1 | H | (2-) | ||||||
8672.33 1 | H | (3-) | ||||||
8673.69 1 | H | (0-) | ||||||
8676.44 1 | H | (3-) | ||||||
8680.41 2 | H | 1- | ||||||
8688.70 2 | H | (3-) | ||||||
8690.01 2 | H | (2-) | ||||||
8690.21 2 | H | (2-) | ||||||
8691.66 2 | H | (1+) | ||||||
8706.57 2 | H | (2+) | ||||||
8710.02 2 | H | (1-) | ||||||
8711.12 2 | H | 1(-) | ||||||
8715.95 2 | H | (3-) | ||||||
8716.67 2 | H | (2-) | ||||||
8717.46 2 | H | (3-) | ||||||
8718.80 2 | H | (2-) | ||||||
8725.42 2 | H | (2-) | ||||||
8728.42 4 | H | (3-) | ||||||
8737.79 4 | H | (1-) | ||||||
8740.63 2 | H | (1-) | ||||||
8757.19 4 | H | 1+ | ||||||
8758.18 2 | H | (3-) | ||||||
8759.88 3 | H | (3-) | ||||||
8762.67 2 | H | 3(-) | ||||||
8764.64 2 | H | (3-) | ||||||
8767.07 3 | H | (2-) | ||||||
8767.32 3 | H | (3-) | ||||||
8773.38 5 | H | (3-) | ||||||
8775.24 2 | H | (2-) | ||||||
8779.99 5 | H | (2-) | ||||||
8780.62 6 | H | (2-) | ||||||
8785 15 | O | |||||||
8788.32 4 | H | (2-) | ||||||
8788.68 2 | H | 2+ | ||||||
8789.10 5 | H | (2-) | ||||||
8790.80 2 | H | 2(-) | ||||||
8793.61 8 | H | (1-) | ||||||
8794.97 3 | H | (2-) | ||||||
8797.62 2 | H | 1(-) | ||||||
8798.62 2 | H | (1-) | ||||||
8802.26 8 | H | (1-) | ||||||
8803.41 4 | H | (0-) | ||||||
8812.81 2 | H | (1+) | ||||||
8815.59 2 | H | 2+ | ||||||
8816.19 5 | H | (0-) | ||||||
8818.39 9 | H | (0-) | ||||||
8818.75 6 | H | (2-) | ||||||
8822.98 2 | H | 2(-) | ||||||
8834.01 3 | H | 1(-) | ||||||
8851.07 3 | H | 1(-) | ||||||
8855.58 2 | H | (2-) | ||||||
8856.31 9 | H | (1-) | ||||||
8856.47 3 | H | (2+) | ||||||
8857.39 3 | H | (2-) | ||||||
8858.75 9 | H P | (2-) | ||||||
8861.74 2 | H | (2-) | ||||||
8864.94 6 | H | (3-) | ||||||
8866.47 2 | H | (2-) | ||||||
8872.79 10 | H | (2-) | ||||||
8874 11 | O | |||||||
8875.11 2 | H | 2- | ||||||
8877.24 12 | H | (1-) | ||||||
8878.58 3 | H | 1(-) | ||||||
8884.74 3 | H | 2+ | ||||||
8901.58 9 | H | (2+) | ||||||
8905.52 16 | H | (1+) | ||||||
8907.11 3 | H | (3-) | ||||||
8909.27 3 | H | 2+ | ||||||
8910.94 19 | H | 1- | ||||||
8911.6 7 | H | (0-) | ||||||
8915.65 8 | H | (2-) | ||||||
8924.23 14 | H | (2-) | ||||||
8942.24 5 | H | 1(-) | ||||||
8949.39 6 | H | (2)+ | ||||||
8950 16 | O | |||||||
8951.05 13 | H | (1-) | ||||||
8953.48 10 | H | (2-) | ||||||
8955.38 4 | H | 2+ | ||||||
8956.81 12 | H | (1-) | ||||||
8967.75 6 | H | (1)+ | ||||||
8970.44 6 | H | (1-) | ||||||
8972.92 6 | H | (1-) | ||||||
8976.18 5 | H | 2(-) | ||||||
8983.81 21 | H | (1+) | ||||||
8990.06 7 | H | (1-) | ||||||
9006.14 4 | H | 2(-) | ||||||
9011.81 10 | H | (2-) | ||||||
9017.79 10 | H | (1+) | ||||||
9018.52 14 | H | (2-) | ||||||
9019.73 12 | H | (1-) | ||||||
9024.84 15 | H | (2-) | ||||||
9026.27 17 | H | (2+) | ||||||
9032.08 15 | H | (1-) | ||||||
9032.24 10 | H | 2(-) | ||||||
9035.74 14 | H | (2-) | ||||||
9041.76 6 | H | 3(-) | ||||||
9043.61 17 | H | (2-) | ||||||
9047.6 4 | H | (0-) | ||||||
9049.92 21 | H | (1-) | ||||||
9051.64 10 | H | (2-) | ||||||
9054.72 8 | H | (2+) | ||||||
9065.6 3 | H | (1+) | ||||||
9070.50 15 | H | (0-) | ||||||
9075.26 6 | H | (3-) | ||||||
9079.77 11 | H | 2+ | ||||||
9092.93 8 | H | (2)+ | ||||||
9094.83 6 | H | (3-) | ||||||
9100.03 7 | H | (3-) | ||||||
9106.81 8 | H | (1+) | ||||||
9108.32 7 | H | (2-) | ||||||
9112.28 16 | H | (0-) | ||||||
9116.93 14 | H | (1-) | ||||||
9123.15 13 | H | (2)+ | ||||||
9123.36 22 | H | (1-) | ||||||
9128.54 7 | H | (2-) | ||||||
9137.58 8 | H | (2-) | ||||||
9144.68 19 | H | (1-) | ||||||
9153.60 12 | H | (2-) | ||||||
9154.04 13 | H | (2)+ | ||||||
9154.6 3 | H | (1-) | ||||||
9163.78 8 | H | (1-) | ||||||
9170.80 7 | H | (3-) | ||||||
9176.83 10 | H | (1-) | ||||||
9180.56 7 | H | (2-) | ||||||
9184.04 14 | H | (2+) | ||||||
9191.7 3 | H | (1-) | ||||||
9193.14 11 | H | 2+ | ||||||
9195.14 23 | H | (2-) | ||||||
9202.63 7 | H | 2+ | ||||||
9204.51 10 | H | (2-) | ||||||
9215.66 12 | H | (1+) | ||||||
9219.16 25 | H | (2+) | ||||||
9220.7 3 | H | (1-) | ||||||
9226.43 25 | H | (1+) | ||||||
9226.92 15 | H | (3-) | ||||||
9233.30 16 | H | (1+) | ||||||
9234.9 3 | H | (3-) | ||||||
9238.8 3 | H | (1+) | ||||||
9241.76 12 | H | (2)+ | ||||||
9242.3 3 | H | (3-) | ||||||
9245.60 24 | H | (3-) | ||||||
9250.71 10 | H | (2)+ | ||||||
9255.25 8 | H | (1)+ | ||||||
9261.14 10 | H | (3-) | ||||||
9263.68 15 | H | (2-) | ||||||
9272.34 9 | H | 2(-) | ||||||
9278.03 17 | H | (1-) | ||||||
9281.54 15 | H | (1-) | ||||||
9284.6 3 | H | (1+) | ||||||
9288.92 14 | H | (2-) | ||||||
9292.13 23 | H | (1-) | ||||||
9294.19 18 | H | (2-) | ||||||
9298.86 10 | H | 2(-) | ||||||
9307.29 19 | H | (1-) | ||||||
9313.32 19 | H | (1)+ | ||||||
9316.01 12 | H | 3(-) | ||||||
9319.56 13 | H | 3(-) | ||||||
9323.74 25 | H | (1-) | ||||||
9328.48 10 | H | (2-) | ||||||
9333.03 19 | H | (3-) | ||||||
9337.89 21 | H | (2)+ | ||||||
9339.34 23 | H | (1+) | ||||||
9350.34 17 | H | (1-) | ||||||
9355.96 18 | H | (2-) | ||||||
9358.65 21 | H | (2-) | ||||||
9364.05 12 | H | (3-) | ||||||
9367.4 3 | H | (1-) | ||||||
9381.61 13 | H | 2+ | ||||||
9384.0 3 | H | (2-) | ||||||
9388.1 5 | H | (1+) | ||||||
9388.7 3 | H | (2-) | ||||||
9392.2 3 | H | (2-) | ||||||
9395.22 23 | H | (3-) | ||||||
9401.2 3 | H | (1-) | ||||||
9404.41 14 | H | (2-) | ||||||
9408.38 11 | H | (2-) | ||||||
9416.61 17 | H | 2+ | ||||||
9418.22 14 | H | (3-) | ||||||
9426.92 13 | H | (1-) | ||||||
9432.19 14 | H | (2-) | ||||||
9438.01 15 | H | (1)+ | ||||||
9441.51 14 | H | (3-) | ||||||
9449.77 17 | H | (2-) | ||||||
9460.25 24 | H | (3-) | ||||||
9465.15 16 | H | (3-) | ||||||
9469.77 24 | H | (2-) | ||||||
9476.45 14 | H | (2-) | ||||||
9486.77 13 | H | (2-) | ||||||
9490.19 15 | H | (1-) | ||||||
9497.28 15 | H | (1-) | ||||||
9499.37 14 | H | (2-) | ||||||
9503.61 12 | H | (3-) | ||||||
9506.41 13 | H | (2-) | ||||||
9527.2 4 | H | (1-) | ||||||
9533.3 3 | H | (2-) | ||||||
9536.7 5 | H | (1-) | ||||||
9543.53 18 | H | (2-) | ||||||
9551.60 12 | H | (2-) | ||||||
9558.1 3 | H | (2-) | ||||||
9561.9 4 | H | (3-) | ||||||
9567.8 3 | H | (2-) | ||||||
9579.5 3 | H | (2-) | ||||||
9584.5 2 | H | (3)- | ||||||
9600.9 2 | H | (2-) | ||||||
9603.7 4 | H | 2+ | ||||||
9605.7 4 | H | (2-) | ||||||
9612.1 4 | H | (3-) | ||||||
9621.0 3 | H | (3-) | ||||||
9623.7 4 | H | (2-) | ||||||
9629.7 4 | H | (2-) | ||||||
9634.8 7 | H | (3-) | ||||||
9638.0 3 | H | (2-) | ||||||
9641.2 5 | H | (1-) | ||||||
9652.5 2 | H | (3-) | ||||||
9657.9 4 | H | (1+) | ||||||
9664.2 3 | H | (2-) | ||||||
9664.5 9 | H | (2-) | ||||||
9669.3 5 | H | (3-) | ||||||
9675.1 4 | H | (3-) | ||||||
9680.1 3 | H | (2-) | ||||||
9685.8 3 | H | (2+) | ||||||
9686.6 6 | H | (1-) | ||||||
9692.6 3 | H | (3-) | ||||||
9702.7 2 | H | (3-) | ||||||
9712.4 2 | H | (2-) | ||||||
9719.0 3 | H | (2-) | ||||||
9723.8 4 | H | (1-) | ||||||
9736.1 2 | H | (3-) | ||||||
9744.7 2 | H | (2-) | ||||||
9751.7 | H | (1+) | ||||||
9754.9 | H | (3-) | ||||||
9763.7 | H | (2-) | ||||||
9770.7 | H | (1-) | ||||||
9782.3 | H | (3-) | ||||||
9788.4 | H | (2-) | ||||||
9802.2 | H | (2+) | ||||||
9812.8 | H | (3-) | ||||||
9821.7 | H | (3-) | ||||||
9827.6 | H | (2-) | ||||||
9854.8 | H | (2-) | ||||||
9858.0 | H | (3-) | ||||||
9879.4 | H | (2-) | ||||||
9895.4 | H | (1-) | ||||||
9895.9 | H | (2-) | ||||||
9907.6 | H | (2-) | ||||||
9931.5 | H | (3-) | ||||||
9944.3 | H | (2-) | ||||||
9965.2 | H | (3-) | ||||||
9973.9 | H | (2-) | ||||||
9975.0 | H | (1-) | ||||||
9980.8 | H | (2-) | ||||||
10023.3 | H | (3-) | ||||||
10099.1 | H | (2+) | ||||||
11240 25 | O | |||||||
11440 25 | O | |||||||
12230 25 | O | |||||||
E(level): From least-squares fit to Eγ data for the levels up to 8580 decaying by γ rays (or from the datasets with levels without gammas); above this level, data are from 35Cl(n,γ):res (see dataset for E(n)(lab), partial neutron, γ, and selected proton widths) | ||||||||
Additional Gamma data:
E(level) (keV) | E(γ) (keV) | Multipolarity | Mixing Ratio | Additional Data |
788.4328 | 788.4236 4 | M1+E2 | +1.1 4 | B(E2)(W.u.)=10 4, B(M1)(W.u.)=0.0014 6, α=8.8E-5 10, α(K)=8.1E-5 9, α(L)=6.4E-6 7, α(M)=5.9E-7 7 |
1164.8799 | 1164.860 5 | M1+E2 | -0.32 6 | B(E2)(W.u.)=0.50 18, B(M1)(W.u.)=0.00183 13, α=3.49E-5 6, α(K)=2.89E-5 5, α(L)=2.30E-6 4, α(M)=2.10E-7 4, α(N+)=3.44E-6 8 |
1601.1034 | 436.2200 19 | M1,E2 | α=0.00045 23, α(K)=0.00041 21, α(L)=3.3E-5 17, α(M)=3.0E-6 15 | |
1601.065 5 | M1,E2 | α=0.000131 19, α(K)=1.72E-5 13, α(L)=1.37E-6 11, α(M)=1.25E-7 10, α(N+)=0.000113 1 | ||
1951.1853 | 786.29643 53 | E1,M2 | α=0.00010 6, α(K)=9.E-5 6, α(L)=7.E-6 5, α(M)=7.E-7 4 | |
1162.734 5 | E1,M2 | α=5.8E-5 5, α(K)=3.7E-5 20, α(L)=3.0E-6 16, α(M)=2.7E-7 15, α(N+)=1.8E-5 18 | ||
1951.12647 89 | E1,M2 | α=0.00038 24, α(K)=1.3E-5 6, α(L)=1.0E-6 5, α(M)=1.0E-7 5, α(N+)=0.00036 25 | ||
2468.2590 | 517.06962 22 | M1+E2 | +0.03 1 | B(E2)(W.u.)=1.9 13, B(M1)(W.u.)=0.158 17, α=0.0001543 22, α(K)=0.0001419 20, α(L)=1.133E-5 16, α(M)=1.036E-6 15 |
2492.3035 | 532.904 4 | M1+E2 | -2.7 LT | B(E2)(W.u.)<3.7E+3, B(M1)(W.u.)>0.024, α=0.000333 13, α(K)=0.000306 12, α(L)=2.45E-5 10, α(M)=2.23E-6 9 |
1327.396 4 | M1+E2 | -0.10 7 | B(E2)(W.u.)=3 +5-3, B(M1)(W.u.)=0.16 4, α=4.91E-5 8, α(K)=2.22E-5 4, α(L)=1.77E-6 3, α(M)=1.617E-7 24, α(N+)=2.49E-5 4 | |
2492.210 6 | M1,E2 | α=0.00051 5, α(K)=8.0E-6 3, α(L)=6.34E-7 24, α(M)=5.80E-8 22, α(N+)=0.00050 5 | ||
2518.396 | 1729.919 7 | M2+E3 | -0.11 1 | B(E3)(W.u.)=0.0027 6, B(M2)(W.u.)=0.000120 16, α=9.13E-5 13, α(K)=2.41E-5 4, α(L)=1.92E-6 3, α(M)=1.755E-7 25, α(N+)=6.51E-5 10 |
2518.301 4 | E3 | B(E3)(W.u.)=15.2 14, α=0.000374 6, α(K)=1.201E-5 17, α(L)=9.55E-7 14, α(M)=8.74E-8 13, α(N+)=0.000361 5 | ||
2676.440 | 2676.323 17 | M1+E2 | -0.05 9 | B(E2)(W.u.)=0.06 +23-6, B(M1)(W.u.)=0.050 8, α=0.000540 8, α(K)=6.90E-6 10, α(L)=5.48E-7 8, α(M)=5.02E-8 7, α(N+)=0.000532 8 |
2810.5731 | 292.176 4 | M1(+E2) | +0.03 3 | B(E2)(W.u.)=(5 +10-5), B(M1)(W.u.)=(0.123 12), α=0.000549 10, α(K)=0.000505 9, α(L)=4.05E-5 8, α(M)=3.70E-6 7 |
859.376 4 | E2 | B(E2)(W.u.)=8.0 11, α=8.46E-5 12, α(K)=7.78E-5 11, α(L)=6.20E-6 9, α(M)=5.67E-7 8 | ||
2022.081 6 | E1+M2 | -0.14 3 | B(E1)(W.u.)=1.69E-5 17, B(M2)(W.u.)=0.37 16, α=0.000656 11, α(K)=7.34E-6 14, α(L)=5.83E-7 11, α(M)=5.33E-8 10, α(N+)=0.000648 1 | |
3100.7000 | 632.4340 19 | M1+E2 | +0.07 2 | B(E2)(W.u.)=16 +10-11, B(M1)(W.u.)=0.36 +7-12, α=0.0001015 15, α(K)=9.33E-5 14, α(L)=7.45E-6 11, α(M)=6.81E-7 10 |
2312.1876 18 | E1,M2 | α=0.0006 3, α(K)=1.0E-5 4, α(L)=8.E-7 3, α(M)=7.E-8 3, α(N+)=0.0005 4 | ||
3723.4 | 912.8 4 | M1+E2 | -0.06 8 | B(E2)(W.u.)=9 +25-9, B(M1)(W.u.)=0.59 12, α=4.86E-5 8, α(K)=4.47E-5 8, α(L)=3.56E-6 6, α(M)=3.25E-7 6 |
4294.52 | 1484.1 5 | E2 | B(E2)(W.u.)=0.12 11, α=0.0001059 15, α(K)=2.16E-5 3, α(L)=1.718E-6 24, α(M)=1.571E-7 22, α(N+)=8.25E-5 | |
1776.06 10 | M1+E2 | +0.54 8 | B(E2)(W.u.)=0.19 18, B(M1)(W.u.)=0.0006 6, α=0.000184 4, α(K)=1.376E-5 22, α(L)=1.094E-6 17, α(M)=1.000E-7 16, α(N+)=0.000169 | |
5313.55 | 1019.01 10 | E1+M2 | -0.082 10 | B(E1)(W.u.)=1.79E-5 17, B(M2)(W.u.)=0.53 14, α=2.46E-5 4, α(K)=2.26E-5 4, α(L)=1.80E-6 3, α(M)=1.644E-7 24 |
2795.1 3 | M2(+E3) | -0.01 3 | B(E3)(W.u.)=(0.024 +142-24), B(M2)(W.u.)=(0.33 4), α=0.000399 6, α(K)=9.53E-6 14, α(L)=7.58E-7 11, α(M)=6.93E-8 10, α(N+)=0.000388 6 | |
8579.795 | 3821.563 21 | E1 | α=0.001612 23, α(K)=3.09E-6 5, α(L)=2.45E-7 4, α(M)=2.24E-8 4, α(N+)=0.001609 23 | |
3981.11 5 | E1 | α=0.001676 24, α(K)=2.94E-6 5, α(L)=2.33E-7 4, α(M)=2.13E-8 3, α(N+)=0.001673 24 | ||
4082.76 3 | E1 | α=0.001713 24, α(K)=2.85E-6 4, α(L)=2.26E-7 4, α(M)=2.07E-8 3, α(N+)=0.001710 24 | ||
4616.549 20 | E1 | α=0.00190 3, α(K)=2.46E-6 4, α(L)=1.95E-7 3, α(M)=1.79E-8 3, α(N+)=0.00189 3 | ||
4944.404 17 | E1 | α=0.00201 3, α(K)=2.27E-6 4, α(L)=1.80E-7 3, α(M)=1.649E-8 23, α(N+)=0.00200 3 | ||
4979.888 10 | E1 | α=0.00202 3, α(K)=2.25E-6 4, α(L)=1.79E-7 3, α(M)=1.635E-8 23, α(N+)=0.00201 3 | ||
5247.072 10 | E1 | α=0.00210 3, α(K)=2.12E-6 3, α(L)=1.682E-7 24, α(M)=1.539E-8 22, α(N+)=0.00209 3 | ||
5715.356 10 | M1+E2 | α=0.00160 9, α(K)=2.38E-6 5, α(L)=1.88E-7 4, α(M)=1.72E-8 3, α(N+)=0.00160 9 | ||
6086.921 10 | M1+E2 | +0.43 +16-26 | α(N+)=0.00163 3 | |
6110.9802 40 | E1 | α(N+)=0.00232 4 | ||
7414.086 9 | M1+E2 | +0.47 10 | α(N+)=0.00190 3 | |
7790.454 10 | M1+E2 | -0.210 4 | α(N+)=0.00194 3 | |
8578.696 10 | M1+E2 | +0.12 4 |
Additional Level data and comments:
E(level) | Comments |
0.0 | μ=+1.28547 5 (1955So10,1989Ra17,2011StZZ), Q=-0.0180 4 (1972St38,1989Ra17,2011StZZ) Jπ(level): spin from microwave spectroscopy (1949To10,1951Jo21,1952Gi04, 1955Aa23); parity from σ(θ) and vector analyzing power in (pol d,α). T1/2(level): 3.071×105 15 y weighted average of partial T1/2’s of β- decay: 3.08×105 3 y (1955Ba93), 3.10×105 4 y (1966Go07), 3.06×105 2 y (1966Go07), the first two by 4πβ proportional gas counting method, the third by liquid scintillator method. |
788.4328 | E(level): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset. Jπ(level): also: 2,3 from 7790γ-778γ angular correlation (1966Va05); 3+ from 778γ linear polarization (1971Ho30) in 35Cl(n,γ). From σ(θ), vector analyzing power in 38Ar(pol d,α). T1/2(level): adopted mean lifetime |t in ps: 21.2 15, weighted average of 19.9 17 (1977He12), 23 2 (1976Co02) in 2H(35Cl,pγ); others: 32.3 25 (1976Me03) in 27Al(14N,pαγ), 30 2 (1973No03) in 33S(α,pγ), 3.0 12 (1973Yo01) in 35Cl(d,pγ), >5 (1973Wa10) in 2H(35Cl,pγ). |
1164.8799 | E(level): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset. Jπ(level): also: 1,2 from 7414γ-1165γ angular correlation (1966Va05); 1+ from 778γ linear polarization (1971Ho30) in 35Cl(n,γ). From σ(θ), vector analyzing power in 38Ar(pol d,α). T1/2(level): adopted mean lifetime |t in ps: 9.9 6, weighted average of 9.2 6 (1977He12), 10.4 5 (1976Co02) in 2H(35Cl,pγ); others: 7.1 5 (1973No03) in 33S(α,pγ), 9.2 6 (1977He12), 10.4 5 (1976Co02) in 2H(35Cl,pγ), 3.0 12 (1973Yo01) in 35Cl(d,pγ), 13 4 (1976Co11) in 3H(35Cl,dγ). |
1601.1034 | E(level): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset. Jπ(level): also: 1,2 from 6978γ-1601γ angular correlation (1966Va05) in 35Cl(n,γ); π=+ from L=0 in 35Cl(d,p). From σ(θ), vector analyzing power in 38Ar(pol d,α). T1/2(level): from DSAM. Mean lifetime |t=927 fs 60 from weighted average of |t=940 fs 60 (1977He12) in 2H(35Cl,pγ); 1100 fs 300 (1991Ul02) in 35Cl(n,γ); 800 fs 150 (1973Yo01) in 35Cl(d,pγ). |
1951.1853 | Jπ(level): from 6111γ-517γ angular correlation (1966Va05) in 35Cl(n,γ); π=- from L=1+3 in 35Cl(d,p). T1/2(level): adopted mean lifetime |t in ps: 2.7 3, weighted average of 2.3 2 (1976No03) in 33S(α,pγ) and 2.95 14 (1976Co02) in 2H(35Cl,pγ); others: 1800 500 (1991Ul02) in 35Cl(n,γ), 1800 +1000-500 (1973Yo01) in 35Cl(d,pγ). |
1959.3940 | Jπ(level): from 6620γ-1959γ angular correlation (1966Va05) in 35Cl(n,γ); π=+ from L=0 in 35Cl(d,p). T1/2(level): adopted mean lifetime |t in ps: 62.9 20, weighted average of 63 2 (1992Ku17, 1991Ul02) in 35Cl(n,γ) and 60 15 (1973Yo01) in 35Cl(d,pγ). |
2468.2590 | Jπ(level): 3 from 6111γ-517γ angular correlation (1966Va05); π=- from 6111γ circular polarization (1969Ko05) in 35Cl(n,γ), or L=1 in 37Cl(p,d). T1/2(level): adopted mean lifetime |t in ps: 1.40 15, weighted average of 1.20 25 (1991Ul02) in 35Cl(n,γ) and 1.50 18 (1973Wa10) in 2H(35Cl,pγ); others: 0.470 50 (1973Yo01) in 35Cl(d,pγ); <1 (1976No03) in 33S(α,pγ). |
2492.3035 | Jπ(level): ΔJ=0 M1+E2 γ from 2+, 8580 (1976Sp06) in 35Cl(n,γ). T1/2(level): adopted mean lifetime |t in fs: 57 13 weighted average of 48 26 (1992Ku17, 1991Ul02) in 35Cl(n,γ) and 60 15 (1973Yo01) in 35Cl(d,pγ). |
2518.396 | Jπ(level): E3 γ to 2+, g.s. and M2+E3 γ to 3+, 788. T1/2(level): adopted mean lifetime |t in ns: 2.33 11, weighted average of 2.30 16 (1976Ke02) in 27Al(14N,pαγ) and 2.36 16 (1973No03) in 33S(α,pγ); others: ≈2.4 (1976Co02) in 2H(35Cl,pγ). |
2676.440 | Jπ(level): M1+E2 γ to 2+, g.s., as given in 33S(α,pγ) T1/2; mean lifetime |t in fs: 31 5 (1992Ku17, 1991Ul02); other <10 (1973Yo01) in 35Cl(d,pγ). |
2810.5731 | Jπ(level): E2 γ to 2-, 1951 and M1(+E2) γ to 5-, 2518. T1/2(level): adopted mean lifetime |t in ps: 3.4 3, weighted average of 3.3 3 (1976No03) in 33S(α,pγ), 4.9 10 (1976Co02) in 2H(35Cl,pγ), 2.7 10 (1973Yo01) in 35Cl(d,pγ). |
2863.9305 | Jπ(level): (1,2,3)+ from ΔJ=(0,1), M1+E2 γ from 2+, 8580 (1976Sp06); (3)+ γ from (4)-, 3101. T1/2(level): mean lifetime |t in fs: 21 1 (1992Ku17, 1991Ul02) in 35Cl(n,γ); other: <15 (1973Yo01) in 35Cl(d,pγ). |
2896.3213 | Jπ(level): (2-,3) from γ’s to 4-, 2811; 2+, 1959; and 2-, 1951, respectively; π=- from L=1+3 in 35Cl(d,p);. T1/2(level): mean lifetime |t in fs: 860 80 (1973Yo01) in 35Cl(d,pγ). |
2994.674 | Jπ(level): (1,2,3) from γ’s to 2+, g.s., and 2-, 2995; π=- from L=1 in 35Cl(d,p). T1/2(level): mean lifetime |t in fs: 90 12 (1973Yo01) in 35Cl(d,pγ). |
3100.7000 | Jπ(level): 2-,3-,4- from M1+E2 γ to 3-, 2468; (4)- from no γ to 2+, g.s. T1/2(level): mean lifetime |t in fs: 215 +70-40 (1973Yo01). |
3.12E3 | E(level): estimated in 38Ar(p,3He) based on analogy with 36Ar. Jπ(level): 0+, based on L=0 and t=1 analog state (38Ar(p,3He)). |
3207.35 | Jπ(level): L=1 in 35Cl(d,p) and γ’s to 1+, 1165 and 2-, 1951. T1/2(level): mean lifetime |t in fs: 140 20 (1973Yo01) in 35Cl(d,pγ). |
3332.2902 | Jπ(level): (1,2,3)- from ΔJ=(0,1), E1 γ from 2+, 8580 (1976Sp06); (2,3+) from γ’s to 3+, 788; 3-, 1959; and 1+, 1601, respectively. T1/2(level): mean lifetime |t in fs: 105 10 (1973Yo01) in 35Cl(d,pγ). |
3470.016 | Jπ(level): L=0+2 in 37Cl(p,d) from 3/2+ target. 369γ to (4)-, 1601 level is presumed to be erroneous placement in (n,γ) (1990En08). T1/2(level): mean lifetime |t in fs: <35 (1973Yo01). |
3566 | Jπ(level): π=+ from L=0+2 in 37Cl(p,d). |
3599.5240 | Jπ(level): 1-,3- from ΔJ=1, E1 γ from 2+, 8580; (3)- γ to 3-, 2468. T1/2(level): mean lifetime |t in fs: 59 3 (1992Ku17, 1991Ul02) in 35Cl(n,γ); other: 60 20 (1973Yo01) in 35Cl(d,pγ). |
3634.992 | Jπ(level): 1-,3- from ΔJ=1, E1 γ from 2+, 8580; (1)- from γ to 1+, 1165. T1/2(level): mean lifetime |t in fs: 30 15 (1973Yo01) in 35Cl(d,pγ). |
3660.335 | Jπ(level): γ’s to 2+, g.s.; 2-, 1951; 1+, 1165; (1,2,3)-, 2997. T1/2(level): mean lifetime |t in fs: <80 (1973Yo01) in 35Cl(d,pγ). |
3723.4 | Jπ(level): ΔJ=0, M1+E2 γ to 4-, 2810. T1/2(level): mean lifetime |t in fs: 70 15 (1973Yo01) in 35Cl(d,pγ). |
3772 | Jπ(level): π=- from L=3 in 37Cl(p,d). |
3941.324 | Jπ(level): γ’s to 3+, 788 and 1+,(2+), 2676. |
3962.900 | Jπ(level): (1,2,)- from ΔJ=(0,1), E1 γ from 2+, 8580 (1976Sp06); (1)- less likely from γ from (3)+, 4997.2. T1/2(level): mean lifetime |t in fs: <30 (1973Yo01) in 35Cl(d,pγ). |
3992.06 | Jπ(level): (0+,1,2,3,4+) from γ to 2+, 1959; π=- from L=1 in 35Cl(d,p). T1/2(level): mean lifetime |t in fs: 30 10 (1973Yo01) in 35Cl(d,pγ). |
4031.901 | Jπ(level): (0,1,2,3+) from γ to 1+, 1165; π=- from L=1 in 35Cl(d,p). |
4061.478 | Jπ(level): (1,2,3) from γ to 2+, g.s. and γ to 2-, 1951; π=- from L=1 in 35Cl(d,p). |
4138.978 | Jπ(level): (0,1,2) from γ’s to 1+, 1601 and (1)-, 3635; (2,3,4) from γ’s to 3+, 788 and (3)-, 3599; π=- from L=1 in 35Cl(d,p). |
4205.648 | Jπ(level): (0+,1,2,3+) from γ’s to 2+, g.s. and 1+, 1165; π=+ from L=0+2 in. |
4294.52 | Jπ(level): M1+E2 γ to 5-, 2518; E2 γ to 4-, 2810. T1/2(level): adopted mean lifetime |t in ps: 5.2 48, from >0.4 (1977No09) in 33S(α,pγ) and <10 (1976Wa11) in 27Al(14N,pαγ); other: <20 (1976Ke02) in 27Al(14N,pαγ). |
4299.667 | Jπ(level): isobar analog L=0 state in 38Ar(p,3He). |
4315.61 | Jπ(level): (1-,2,3+) from γ’s to 1+, 1601 and 3-, 2468; π=- from L=1 in 35Cl(d,p). |
4410.064 | Jπ(level): (1+,2,3+) from γ’s to 3+, 788 and 1+, 1601. |
4496.752 | Jπ(level): (1,2)- from ΔJ=(0,1), E1 γ from 2+, 8580; (1)- less likely from γ to 3+, 788. |
4525.179 | Jπ(level): π=(-) from L=(1+3) in 37Cl(p,d). |
4551.43 | Jπ(level): (0+,1,2,3+) from γ’s to 2+, g.s. and 1+, 1165; π=+ from L=0+2 in 37Cl(p,d). |
4598.426 | Jπ(level): ΔJ=1, E1 γ from 2+, 8580; 1- less likely from γ’s to 3+, 788 and (3)-, 3599. |
4724.1 | Jπ(level): from L=3 in 35Cl(d,p). |
4754.35 | Jπ(level): (0+,1,2 3+) from γ’s to 2+, g.s. and 1+, 1165; π=- from L=1+3 in 35Cl(d,p). |
4757.983 | Jπ(level): ΔJ=1, E1 γ from 2+, 8580; 1- less likely from γ to (4)-, 3101. |
4829.54 | Jπ(level): (1+,2,3,4+) from γ’s to 2+, g.s. and 3+, 788; π=(-) from L=(1+3) in 37Cl(p,d). |
4846.7 | Jπ(level): π=- from L=1+3 in 37Cl(p,d). |
4884.0 | E(level): from 35Cl(d,p). Jπ(level): (1+,2,3+) from γ to 1+, 1165 and (3)+, 2864; π=+ from L=. |
4956.5 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
4997.195 | Jπ(level): 3+,4+,5+ from L=4 in 34S(α,d); (1+,2,3+) from γ’s to 1+, 1165 and (3)+, 2864. |
4997.6 | Jπ(level): (3-,4+) from γ’s to 2+, g.s. and 5-, 2518; π=- from L=1+3 in 35Cl(d,p). |
5079.161 | Jπ(level): (0+,1,2,3,4+) from γ to 2+, g.s.; π=- from L=1 in 35Cl(d,p). |
5150.629 | (1-,2) from γ’s to 3-, 2468; 1+,(2+) 2676; (1)-, 3635; π=- from L=1 in 35Cl(d,p). E(level): |
5204.606 | Jπ(level): (2-,3+) from γ’s to 1+,(2+), 2676 and (4)-, 3101; π=- from L=1 in 35Cl(d,p). |
5246.587 | Jπ(level): (1+,2,3+) from γ’s to 2+, g.s.; 3+, 1601; 2-, 1951; π=(+) from L=(1+3) in 37Cl(p,d). |
5263.09 | Jπ(level): (1,2-) from γ’s to 2+, g.s.; 2-, 1951; (0,1,2)-, 4032; π=- from L=1 in 35Cl(d,p). |
5308.12 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
5313.55 | Jπ(level): E1+M2 γ to 6-, 4295; M2(+E3) γ to 5-, 2518. T1/2(level): mean lifetime |t in ps: 32 3 (1976Wa11), 27.2 17 (1976Ke02) in 27Al(14N,pαγ); weighted average: 28.4 21. |
5329.160 | Jπ(level): (2-,3+) from γ’s to 1+, 1165 and 4-, 2811. |
5463.530 | Jπ(level): (1+,2) from γ’s to 1+, 1165; 2+, 1959; 1-, 3635; (3)+, 4997; π=- from L=1 in 35Cl(d,p). |
5473.712 | Jπ(level): γ’s to 1+, 1165 and 5-, 2518. |
5517.650 | Jπ(level): (1+,2) from γ’s to 3+, 788; 1+, 1601; (1,2)-, 4316; π=- from L=1+3 in 37Cl(p,d). |
5563.550 | Jπ(level): (2-,3-) from γ’s to 4-, 2811 and (1,2)-, 4316. |
5578.46 | Jπ(level): (1,2,3+) from γ’s to 2-, 1951 and 1+,(2+), 2518; π=- from L=1+3 in 35Cl(d,p). |
5578.498 | Jπ(level): (2-) from γ’s to 1+, 1165; (4)-, 3101; (1,2)-, 5151. |
5604.295 | Jπ(level): (2,3+) from γ’s to 3+,788; 1+, 1601; 3-, 2469. |
5605 | E(level): can Be either of 5604.296 or 5604.32. Jπ(level): π=+ from L=0+2 in 37Cl(p,d). |
5619.23 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
5694.42 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
5703.059 | Jπ(level): (0+,1,2,3,4+) from γ to 2+, g.s.; π=- from L=1 in 35Cl(d,p). |
5734.041 | Jπ(level): (2) from γ’T1/2 to 3+, 788; 3-, 4758; 1+, 1601; (1,2)-, 4754; π=- from L=1 in 35Cl(d,p). |
5766 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
5778.455 | Jπ(level): (2-,3) from γ’s to 2+, g.s.; 2-, 1951; 4-, 2811. |
5778.58 | Jπ(level): (2,3,4) from γ’s to 3-, 2468 and (3)+, 2864. |
5780.12 | Jπ(level): 6,8 from d γ 7+, 5314; (8) since spin usually increase with increasing E(level) for this type of reactions. |
5831.9 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
5898.48 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
5912.01 | Jπ(level): π=- from L=1 in 35Cl(d,p) but π=+ from L=0+2 in 37Cl(p,d). |
5947.6 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
5956.677 | Jπ(level): (0+,1,2,3+) from γ’s to 2+, g.s. and 1+, 1165; π=+ from L=0+2 in 37Cl(p,d). |
5959.5 | Jπ(level): (1+,2,3+) from γ’s to 1+, 1601 and (3)+, 2864. |
5986 | Jπ(level): π=(-) from L=(1+3) in 37Cl(p,d). |
6042.316 | Jπ(level): (2-,3-) from γ’s to (4)-, 3101 and (1)-, 6042. |
6051.1 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
6084.84 | Jπ(level): π=- from L=1+3 in 35Cl(d,p). |
6089.872 | Jπ(level): (1+,2) from γ’s to 3+, 788; (1)-, 3635; (1+,2+,3+), 3941. |
6095.6 | Jπ(level): π=+ from L=0+2 in 37Cl(p,d). |
6146.6 | Jπ(level): π=+ from L=0+2 in 37Cl(p,d). |
6154 | E(level): weighted average of 6150 8 (35Cl(d,p)) and 6166 13 (37Cl(3He,α)). Jπ(level): π=- from L=1 in 35Cl(d,p). |
6184.96 | Jπ(level): π=+ from L=0+2 in 35Cl(d,p). |
6236.4 | Jπ(level): π=- from L=1+3 in 35Cl(d,p). |
6253.551 | Jπ(level): (1,2,3+) from γ’s to 2+, g.s. and 1+, 1165; π=- from L=1+3 in 35Cl(d,p). |
6268.184 | Jπ(level): (2-,3+) from γ’s to 4-, 2811 and (1+,2,3+), 4410. |
6339.90 | Jπ(level): (0+,1,2,3,4+) from γ to 2+, g.s.; π=- from L=1 in 35Cl(d,p). |
6344.417 | Jπ(level): (1-,2,3-) from γ’s to 2+, g.s. and (1,2,3)-, 4061. |
6354.882 | Jπ(level): (2,3+) from γ’s to 1+, 1601; (3)+, 2864; (2,3)-, 2896; π=+ from L=0+2 in 37Cl(p,d). |
6379.480 | Jπ(level): (3-,4+) from γ’s to 2+, g.s. and 5-, 2518; π=+ from L=0+2 in 37Cl(p,d). |
6423.382 | Jπ(level): (2,3) from γ’s to 2+, g.s.; 3+, 788; (2,3)-, 2896; π=- from L=1+3 in 37Cl(p,d). |
6441 | E(level): weighted average of 6440 8 (35Cl(d,p)) and 6444 20 (37Cl(3He,α)). Jπ(level): π=- from L=1 in 35Cl(d,p). |
6487.746 | Jπ(level): (1,2,3-) from γ’s to 2+, g.s. and (1,2)-, 3963; π=- from L=1+3 in 37Cl(p,d). |
6487.82 | Jπ(level): (1+,2,3,4-) from γ’s to 2-, 1951 and (3)+, 2864. |
6504.6 | Jπ(level): π=- from L=1+3 in 35Cl(d,p). |
6538.202 | Jπ(level): (2,3+) from γ’s to 1+, 6538; (3)+, 3470; (2-,3-), 6042. |
6544.966 | Jπ(level): (1,2,3) from 2+, g.s. and 2-, 1951; π=+ from L=0+2 in 37Cl(p,d). |
6576.7 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
6595.2 | Jπ(level): π=(-) from L=(1+3) in 37Cl(p,d). |
6604.325 | Jπ(level): (1,2,3) from γ’s to 2+, 2492 and (2)-, 3332; (2) with extra γ’s to (1+,2+,3+), 3941 and (1,2,3)-, 5079. |
6618 | E(level): weighted average of 6618 5 (37Cl(p,d)) and 6621 15 (37Cl(3He,α)). Jπ(level): π=+ from L=2 in 37Cl(p,d). |
6642.649 | Jπ(level): (1-,2+) from γ’s to 2+, g.s.; 3-, 2468; (0)+, 4300. |
6673.13 | Jπ(level): π=- from L=1+3 in 35Cl(d,p). |
6750 | Jπ(level): π=+ from L=0+2 in 37Cl(p,d). |
6773.22 | Jπ(level): π=+ from L=2 in 37Cl(p,d). |
6774 | Jπ(level): π=+ from L=2 in 37Cl(p,d). |
6826 | Jπ(level): π=+ from L=2 in 37Cl(p,d). |
6894 | E(level): weighted average of 6893 7 (37Cl(p,d)) and 6897 13 (37Cl(3He,α)). Jπ(level): π=+ from L=0+2 in 37Cl(p,d). |
6952.625 | Jπ(level): (1,2,3) from γ’s to 2+, g.s. and 2-, 1951. |
6997.14 | Jπ(level): π=- from L=1 in 35Cl(d,p). |
7082.649 | Jπ(level): (2) from γ’s to (1,2,3)-, 2995 and (1,2,3)+, 6545. |
7085.0 | Jπ(level): π=+ from L=2 in 37Cl(p,d). |
7165 | E(level): weighted average of 7165 7 (37Cl(p,d)) and 7166 16 (37Cl(3He,α)). |
7512 | Jπ(level): π=+ from L=0+2 in 37Cl(p,d). |
7559.167 | Jπ(level): (1+,2,3) from γ’s to 2+, g.s. and (2-,3+), 5329; π=+ from L=0+2 in 37Cl(p,d). |
7564.7 | Jπ(level): (0+,1,2,3+) from γ’s to 1+, 1601 and 2+, 1959. |
7663 | E(level): weighted average of 7652 16 (37Cl(3He,α)) and 7665 6 (37Cl(p,d)). Jπ(level): π=+ from L=0+2 in 37Cl(p,d). |
7755 | Jπ(level): π=(-) from L=(1+3) in 37Cl(p,d). |
7870 | Jπ(level): π=+ from L=0+2 in 37Cl(p,d). |
8184 | Jπ(level): π=(+) from L=(0+3) in 37Cl(p,d). |
8579.795 | E(level): from 2006De21. Other: 8579.79 1 (2011AuZZ) in 35Cl(n,γ). Jπ(level): from 35Cl(n,γ): 1+,2+ based on selection rules; 1+ ruled out by positive A4 angular correlation coefficients for all possible M1+E2 mixings for primary-secondary γ cascades (see A4 values at 7790γ for 7790γ-778γ, and at 6111γ for 6111γ-517γ). 2+ also sustained by 1966Va05 and 1956Br99 who show that the capture state is dominated by a single negative-energy resonance close to the n-capture state, which thus has a definite spin. 1976Sp06 argue that a small 0.6% admixture of 1+ is possible. |
8580.18 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8583.92 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8585.13 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8594.18 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8595.69 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8596.44 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8601.56 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8605.66 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8606.37 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8616.50 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8618.93 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8622.72 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8629.95 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8631.28 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8633.18 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8635.98 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8640.81 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8646.11 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8653.17 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8667.67 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8667.78 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8672.33 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8673.69 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8676.44 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8680.41 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8688.70 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8690.01 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8690.21 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8691.66 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8706.57 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8710.02 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8711.12 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8715.95 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8716.67 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8717.46 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8718.80 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8725.42 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8728.42 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8737.79 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8740.63 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8757.19 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8758.18 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8759.88 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8762.67 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8764.64 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8767.07 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8767.32 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8773.38 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8775.24 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8779.99 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8780.62 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8788.32 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8788.68 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8789.10 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8790.80 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8793.61 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8794.97 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8797.62 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8798.62 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8802.26 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8803.41 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8812.81 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8815.59 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8816.19 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8818.39 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8818.75 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8822.98 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8834.01 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8851.07 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8855.58 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8856.31 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8856.47 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8857.39 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8858.75 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8861.74 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8864.94 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8866.47 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8872.79 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8875.11 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8877.24 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8878.58 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8884.74 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8901.58 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8905.52 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8907.11 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8909.27 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8910.94 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8911.6 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8915.65 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8924.23 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8942.24 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8949.39 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8951.05 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8953.48 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8955.38 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8956.81 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8967.75 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8970.44 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8972.92 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8976.18 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8983.81 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
8990.06 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9006.14 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9011.81 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9017.79 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9018.52 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9019.73 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9024.84 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9026.27 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9032.08 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9032.24 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9035.74 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9041.76 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9043.61 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9047.6 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9049.92 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9051.64 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9054.72 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9065.6 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9070.50 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9075.26 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9079.77 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9092.93 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9094.83 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9100.03 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9106.81 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9108.32 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9112.28 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9116.93 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9123.15 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9123.36 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9128.54 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9137.58 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9144.68 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9153.60 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9154.04 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9154.6 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9163.78 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9170.80 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9176.83 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9180.56 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9184.04 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9191.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9193.14 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9195.14 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9202.63 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9204.51 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9215.66 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9219.16 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9220.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9226.43 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9226.92 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9233.30 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9234.9 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9238.8 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9241.76 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9242.3 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9245.60 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9250.71 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9255.25 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9261.14 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9263.68 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9272.34 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9278.03 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9281.54 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9284.6 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9288.92 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9292.13 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9294.19 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9298.86 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9307.29 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9313.32 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9316.01 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9319.56 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9323.74 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9328.48 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9333.03 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9337.89 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9339.34 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9350.34 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9355.96 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9358.65 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9364.05 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9367.4 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9381.61 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9384.0 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9388.1 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9388.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9392.2 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9395.22 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9401.2 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9404.41 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9408.38 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9416.61 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9418.22 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9426.92 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9432.19 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9438.01 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9441.51 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9449.77 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9460.25 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9465.15 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9469.77 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9476.45 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9486.77 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9490.19 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9497.28 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9499.37 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9503.61 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9506.41 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9527.2 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9533.3 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9536.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9543.53 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9551.60 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9558.1 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9561.9 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9567.8 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9579.5 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9584.5 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9600.9 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9603.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9605.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9612.1 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9621.0 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9623.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9629.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9634.8 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9638.0 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9641.2 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9652.5 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9657.9 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9664.2 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9664.5 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9669.3 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9675.1 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9680.1 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9685.8 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9686.6 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9692.6 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9702.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9712.4 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9719.0 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9723.8 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9736.1 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9744.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9751.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9754.9 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9763.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9770.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9782.3 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9788.4 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9802.2 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9812.8 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9821.7 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9827.6 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9854.8 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9858.0 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9879.4 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9895.4 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9895.9 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9907.6 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9931.5 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9944.3 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9965.2 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9973.9 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9975.0 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
9980.8 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
10023.3 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
10099.1 | Jπ(level): From multilevel Reich-Moore R-matrix formalism. |
Additional Gamma comments:
E(level) | E(gamma) | Comments |
1601.1034 | 436.2200 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) | 1601.065 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) |
1951.1853 | 786.29643 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) | 1162.734 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) | 1951.12647 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) |
2468.2590 | 517.06962 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) |
2492.3035 | 532.904 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) | 1327.396 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) | 2492.210 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) |
2518.396 | 1729.919 | I(γ): from 33S(α,pγ) M(γ): from γ(θ) and pol(γ) in 27Al(14N,pαγ) and 33S(α,pγ) | 2518.301 | E(γ): from 35Cl(d,pγ) I(γ): from 33S(α,pγ) M(γ): from γ(θ) and pol(γ) in 27Al(14N,pαγ) and 33S(α,pγ) |
2810.5731 | 859.376 | M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) |
3100.7000 | 2312.1876 | I(γ): from 33S(α,pγ) M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) |
3470.016 | 369.30 | E(γ): the placement in (n,γ) considered as erroneous (1990En08) | 659 | E(γ): only from 37Cl(3He,αγ) |
4294.52 | 1484.1 | E(γ): from 27Al(14N,pαγ) I(γ): from 33S(α,pγ) M(γ): from 33S(α,pγ) by γ(θ) and pol(γ) | 1776.06 | E(γ): from 27Al(14N,pαγ) I(γ): from 33S(α,pγ) |
4299.667 | 1623.19 | I(γ): from 37Cl(3He,αγ) | 2698.44 | I(γ): from 37Cl(3He,αγ) | 3134.641 | I(γ): from 37Cl(3He,αγ) |
4884.0 | 2020.0 | E(γ): from ΔE(level) (37Cl(3He,αγ)) | 3718.9 | E(γ): from ΔE(level) (37Cl(3He,αγ)) |
6095.6 | 6095 | E(γ): from 37Cl(3He,αγ) |
6146.6 | 6146 | E(γ): from 37Cl(3He,αγ) |
8579.795 | 1020.57 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 1497.07 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 1627.09 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 1743.22 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 1806.48 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 1937.049 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 1975.37 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2034.728 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2041.49 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2091.95 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2156.308 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2200.205 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2224.80 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2235.26 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2239.78 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2311.493 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2326.13 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2394.70 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2489.80 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2537.341 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2622.991 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2801.19 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2845.594 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2876.57 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 2975.33 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3001.161 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3016.075 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3061.979 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3105.90 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3116.087 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3250.44 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3316.51 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3333.01 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3374.98 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3428.956 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3500.41 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3561.49 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3582.39 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3750.01 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3821.563 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset M(γ): ΔJ=1, E1 γ from circular polarization (1976Sp06) | 3825.17 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 3981.11 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset M(γ): ΔJ=1, E1 γ from circular polarization (1976Sp06) | 4028.09 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 4054.339 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 4082.76 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset M(γ): ΔJ=(0,1), E1 γ from circular polarization (1976Sp06) | 4169.44 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 4263.88 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 4440.487 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 4517.976 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 4547.55 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 4616.549 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset M(γ): ΔJ=(0,1), E1 γ from circular polarization (1976Sp06) | 4638.10 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 4944.404 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset M(γ): ΔJ=1, E1 γ from circular polarization (1976Sp06) | 4979.888 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset M(γ): ΔJ=1, E1 γ from circular polarization (1976Sp06) | 5109.35 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 5247.072 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset M(γ): ΔJ=(0,1), E1 γ from circular polarization (1976Sp06) | 5584.633 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 5715.356 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 5902.798 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 6086.921 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 6110.9802 | E(γ): from 2006De21 | 6619.732 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 6627.945 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 6977.951 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 7414.086 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 7790.454 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset | 8578.696 | E(γ): Modified to account for four new very precisely-remeasured Eγ’s (2006De21) - see 35Cl(n,γ) dataset |
General Comments:
36Cl identified in irradiation of chlorine compounds at Berkeley 37-inch cyclotron by d.C. Grahame and H.W. Walker: Phys. Rev. 60, 909 (1941), measured emission of positrons from decay. |
The 35Cl(n,γ) E=thermal dataset is abbreviated as 35Cl(n,γ); the 35Cl(n,γ),(n,n),(n,p):res dataset is abbreviated as 35Cl(n,γ):res |
Gammas: For unplaced gammas, see 35Cl(n,γ) |
Q-value: Note: Current evaluation has used the following Q record 709.547 46 8579.79 1 7964.78 3-7642.03 5 2011AuZZ |
Q-value: S(2n)=21224.60 7, S(2p)=19551.2 8 (2011AuZZ) |
Q-value: Values in 2003Au03 are nearly the same as in 2011AuZZ: Q(β-)=709.68 8, S(n)=8579.63 6, S(p)=7964.47 11, Q(α)=-7641.55 20, S(2n)=21224.72 19, S(2p)=19542 5 |