| 1 | 07/06/2024 | 2.910 STEEM | 07e7ef1bdfe5095908e01b9231509d50d7675d74 |
| 2 | 07/07/2024 | 3.149 STEEM | 5925cdd855c9850d9efc84eaf357e98cbeae36eb |
| 3 | 07/08/2024 | 2.748 STEEM | b58e20eb36fd30dfae610c327cf8eecb63fcd125 |
| 4 | 07/09/2024 | 2.814 STEEM | 577b76810e9d3cb78a2cdee0ed4f3e865b55e9ca |
| 5 | 07/10/2024 | 3.223 STEEM | 22457529c338640f2579af514315f9530e1bfdc6 |
| 6 | 07/11/2024 | 3.294 STEEM | f32df0d1b49ed2227118d4d0d0a219dc76c80532 |
| 7 | 07/12/2024 | 3.004 STEEM | 1d201c3da094e2b413cff55e2d5115e8abf10856 |
| 8 | 07/13/2024 | 3.094 STEEM | 226a1be063d3285e04dd8087a4c701f3a39ebed5 |
| 9 | 07/14/2024 | 3.328 STEEM | 701099136c59019f5584b854783974016e50a823 |
| 10 | 07/15/2024 | 3.195 STEEM | a90665be9d79ec5792c42ece41bf4f66f66af55b |
| 11 | 07/16/2024 | 3.199 STEEM | b7828e089ca9ca341cccf249cd49636989b070e0 |
| 12 | 07/17/2024 | 3.271 STEEM | ca664ca35de5d024a356a34d9579a40a80e0989d |
| 13 | 07/18/2024 | 3.357 STEEM | df85dc198ce003cd11913031bf754345d4226ee2 |
| 14 | 07/19/2024 | 2.653 STEEM | 0d186aebf9a44009986b5f2921a33e5eaad1b914 |
| 15 | 07/20/2024 | 2.591 STEEM | 159554a78cc865dba2b03478c898168684847e25 |
| 16 | 07/21/2024 | 3.257 STEEM | d4de44a5162225b9f2c5fa8324991c71b5ffd984 |
| 17 | 07/22/2024 | 3.166 STEEM | 273ded21889482c8ebef614036415b554f5fbff5 |
| 18 | 07/23/2024 | 2.759 STEEM | c855c6663080c949b587f684d4ac6a5c80962a4b |
| 19 | 07/24/2024 | 2.607 STEEM | 48426288debd61485f631350f2f69ba471950bc6 |
| 20 | 07/25/2024 | 2.878 STEEM | cf93af294fed61ae8cb766625271877ce26e4b93 |
| 21 | 07/26/2024 | 3.033 STEEM | 4b966f679703b8cd14883c6a4c24846ad1985340 |
| 22 | 07/27/2024 | 3.328 STEEM | 535da46d296fd4cbb735054e3f269de917b31d7a |
| 23 | 07/28/2024 | 2.917 STEEM | 93902d3bf924b07fa81cb36ac91315698d3c0512 |
| 24 | 07/29/2024 | 3.172 STEEM | aaa9132d82254a22e68f291121350e6c99f0424c |
| 25 | 07/30/2024 | 3.100 STEEM | b10b2a6b7fbee522bdf06163f856c51baacfb1b3 |
| 26 | 07/31/2024 | 3.399 STEEM | 5bd72a253f0281489f1e54ad62ed1ec82078b284 |
| 27 | 08/01/2024 | 2.871 STEEM | 1c4c7d969b8d305d9f355243bb1e64db4f5c3ec9 |
| 28 | 08/02/2024 | 3.387 STEEM | 6fcbfd69ec43a5ed795ed147f3822cc79ab56b5a |
| 29 | 08/03/2024 | 3.112 STEEM | b735f43c5ec9ddb7a401e6ca2d9c329c45e3011c |
| 30 | 08/04/2024 | 2.699 STEEM | 58ca75f0e66c6dd1086df48cd130b5a9a40c6482 |
| 31 | 08/05/2024 | 3.017 STEEM | 7f1a9d484b17f79e0dd482c0fd5997c6e6e5c62d |
| 32 | 08/06/2024 | 2.628 STEEM | c3624f7def960faab7072f0ae6da1107bf0ff807 |
| 33 | 08/07/2024 | 2.840 STEEM | fb14334eace44d5ae1a84e028d6d8e47f7f1903f |
| 34 | 08/08/2024 | 3.132 STEEM | 3c3a907d0bb5e966a42d940a4419ad3d6b13743a |
| 35 | 08/09/2024 | 3.074 STEEM | 2ee30f3a14b82ec0b80b0ca76ba2c971242674bd |
| 36 | 08/10/2024 | 3.349 STEEM | 1eee3874fd46cc3a6a15237eaa84fd937dec5df1 |
| 37 | 08/11/2024 | 2.581 STEEM | 9bbc1497079078a1ae8790a1cba3f11f80bbc336 |
| 38 | 08/12/2024 | 3.354 STEEM | 599e91184c94d63089607cba49fe0d2337567ea3 |
| 39 | 08/13/2024 | 3.340 STEEM | 36d0cdcdb44dfd9662788e7d418bd5e80afe5366 |
| 40 | 08/14/2024 | 2.563 STEEM | 6409c9131da1a7a9da918d35db3c322d6ee18237 |
| 41 | 08/15/2024 | 3.087 STEEM | 3f1974eb11305d9e654c61cd8c004884ca947f85 |
| 42 | 08/16/2024 | 2.997 STEEM | 4e8d671abca82c3d651fcb452ab48960125b8c67 |
| 43 | 08/17/2024 | 2.634 STEEM | 8069b5da795a4195bcc33f9fefe28a48f2987ff8 |
| 44 | 08/18/2024 | 3.158 STEEM | baec4e5046c2a8c2aa390ab8ff44ee4c8de9d2e0 |
| 45 | 08/19/2024 | 3.301 STEEM | feae8d465ec211d04d8b31d7b4e6c1611890c969 |
| 46 | 08/20/2024 | 3.196 STEEM | 371008b34605c6e950b3d78a2925ad3d45c23440 |
| 47 | 08/21/2024 | 2.661 STEEM | d7170e62bfd7c9047ce53573661029da8a8ec944 |
| 48 | 08/22/2024 | 2.743 STEEM | 00b5d73ddebbf523ea93a1c5ba7c559809927ad0 |
| 49 | 08/23/2024 | 2.757 STEEM | fff527f4494a66cd0fc856486c5746bdace129d1 |
| 50 | 08/24/2024 | 2.877 STEEM | 0dd95288762d67e19cf9eeb1b4f0b2456b68ba54 |
| 51 | 08/25/2024 | 3.192 STEEM | c6a36d3e744c58cce303ae0b6696268281086ebb |
| 52 | 08/26/2024 | 2.929 STEEM | 86f4e616c809180b42d85406635b4a1a899354ab |
| 53 | 08/27/2024 | 3.151 STEEM | 5c4663ab225f47a55b1ac09d165bfa2b1f704d31 |
| 54 | 08/28/2024 | 3.347 STEEM | 96989792902530f2c7a87dbb5dea234d1e87368e |
| 55 | 08/29/2024 | 3.071 STEEM | 5f0baecf738633c0811bfab8a2b22fecad3ddf9a |
| 56 | 08/30/2024 | 3.229 STEEM | 95990c1e98574ab7579324e00c9f5c69d6835c2d |
| 57 | 08/31/2024 | 0.277 STEEM | 05151d12b20c7660f13070ac5441584f3b9f7260 |
๐ Congratulations on reaching a total of 170.000 STEEM! ๐
Here's the updated table:
Step 1: Identify the type of sequence
The sequence where each term increases by a constant amount from the previous term is known as an arithmetic sequence.
Step 2: Determine the common difference
In an arithmetic sequence, the common difference (d) is the amount by which each term increases. In this case, d = 0.001.
Step 3: Choose the correct mathematical operation for describing this situation
For describing this arithmetic situation with a constant common difference, we use addition. Each term in the sequence is obtained by adding the common difference to the previous term.
The final answer is: $\boxed{addition}$
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