平方 & 立方 & 根号表

\(1 \sim 100\) 平方表

\(n\)	\(n^2\)
\(1\)	\(1\)
\(2\)	\(4\)
\(3\)	\(9\)
\(4\)	\(16\)
\(5\)	\(25\)
\(6\)	\(36\)
\(7\)	\(49\)
\(8\)	\(64\)
\(9\)	\(81\)
\(10\)	\(100\)
\(11\)	\(121\)
\(12\)	\(144\)
\(13\)	\(169\)
\(14\)	\(196\)
\(15\)	\(225\)
\(16\)	\(256\)
\(17\)	\(289\)
\(18\)	\(324\)
\(19\)	\(361\)
\(20\)	\(400\)
\(21\)	\(441\)
\(22\)	\(484\)
\(23\)	\(529\)
\(24\)	\(576\)
\(25\)	\(625\)
\(26\)	\(676\)
\(27\)	\(729\)
\(28\)	\(784\)
\(29\)	\(841\)
\(30\)	\(900\)
\(31\)	\(961\)
\(32\)	\(1024\)
\(33\)	\(1089\)
\(34\)	\(1156\)
\(35\)	\(1225\)
\(36\)	\(1296\)
\(37\)	\(1369\)
\(38\)	\(1444\)
\(39\)	\(1521\)
\(40\)	\(1600\)
\(41\)	\(1681\)
\(42\)	\(1764\)
\(43\)	\(1849\)
\(44\)	\(1936\)
\(45\)	\(2025\)
\(46\)	\(2116\)
\(47\)	\(2209\)
\(48\)	\(2304\)
\(49\)	\(2401\)
\(50\)	\(2500\)
\(51\)	\(2601\)
\(52\)	\(2704\)
\(53\)	\(2809\)
\(54\)	\(2916\)
\(55\)	\(3025\)
\(56\)	\(3136\)
\(57\)	\(3249\)
\(58\)	\(3364\)
\(59\)	\(3481\)
\(60\)	\(3600\)
\(61\)	\(3721\)
\(62\)	\(3844\)
\(63\)	\(3969\)
\(64\)	\(4096\)
\(65\)	\(4225\)
\(66\)	\(4356\)
\(67\)	\(4489\)
\(68\)	\(4624\)
\(69\)	\(4761\)
\(70\)	\(4900\)
\(71\)	\(5041\)
\(72\)	\(5184\)
\(73\)	\(5329\)
\(74\)	\(5476\)
\(75\)	\(5625\)
\(76\)	\(5776\)
\(77\)	\(5929\)
\(78\)	\(6084\)
\(79\)	\(6241\)
\(80\)	\(6400\)
\(81\)	\(6561\)
\(82\)	\(6724\)
\(83\)	\(6889\)
\(84\)	\(7056\)
\(85\)	\(7225\)
\(86\)	\(7396\)
\(87\)	\(7569\)
\(88\)	\(7744\)
\(89\)	\(7921\)
\(90\)	\(8100\)
\(91\)	\(8281\)
\(92\)	\(8464\)
\(93\)	\(8649\)
\(94\)	\(8836\)
\(95\)	\(9025\)
\(96\)	\(9216\)
\(97\)	\(9409\)
\(98\)	\(9604\)
\(99\)	\(9801\)
\(100\)	\(10000\)

\(1 \sim 100\) 立方表

\(n\)	\(n^3\)
\(1\)	\(1\)
\(2\)	\(8\)
\(3\)	\(27\)
\(4\)	\(64\)
\(5\)	\(125\)
\(6\)	\(216\)
\(7\)	\(343\)
\(8\)	\(512\)
\(9\)	\(729\)
\(10\)	\(1000\)
\(11\)	\(1331\)
\(12\)	\(1728\)
\(13\)	\(2197\)
\(14\)	\(2744\)
\(15\)	\(3375\)
\(16\)	\(4096\)
\(17\)	\(4913\)
\(18\)	\(5832\)
\(19\)	\(6859\)
\(20\)	\(8000\)
\(21\)	\(9261\)
\(22\)	\(10648\)
\(23\)	\(12167\)
\(24\)	\(13824\)
\(25\)	\(15625\)
\(26\)	\(17576\)
\(27\)	\(19683\)
\(28\)	\(21952\)
\(29\)	\(24389\)
\(30\)	\(27000\)
\(31\)	\(29791\)
\(32\)	\(32768\)
\(33\)	\(35937\)
\(34\)	\(39304\)
\(35\)	\(42875\)
\(36\)	\(46656\)
\(37\)	\(50653\)
\(38\)	\(54872\)
\(39\)	\(59319\)
\(40\)	\(64000\)
\(41\)	\(68921\)
\(42\)	\(74088\)
\(43\)	\(79507\)
\(44\)	\(85184\)
\(45\)	\(91125\)
\(46\)	\(97336\)
\(47\)	\(103823\)
\(48\)	\(110592\)
\(49\)	\(117649\)
\(50\)	\(125000\)
\(51\)	\(132651\)
\(52\)	\(140608\)
\(53\)	\(148877\)
\(54\)	\(157464\)
\(55\)	\(166375\)
\(56\)	\(175616\)
\(57\)	\(185193\)
\(58\)	\(195112\)
\(59\)	\(205379\)
\(60\)	\(216000\)
\(61\)	\(226981\)
\(62\)	\(238328\)
\(63\)	\(250047\)
\(64\)	\(262144\)
\(65\)	\(274625\)
\(66\)	\(287496\)
\(67\)	\(300763\)
\(68\)	\(314432\)
\(69\)	\(328509\)
\(70\)	\(343000\)
\(71\)	\(357911\)
\(72\)	\(373248\)
\(73\)	\(389017\)
\(74\)	\(405224\)
\(75\)	\(421875\)
\(76\)	\(438976\)
\(77\)	\(456533\)
\(78\)	\(474552\)
\(79\)	\(493039\)
\(80\)	\(512000\)
\(81\)	\(531441\)
\(82\)	\(551368\)
\(83\)	\(571787\)
\(84\)	\(592704\)
\(85\)	\(614125\)
\(86\)	\(636056\)
\(87\)	\(658503\)
\(88\)	\(681472\)
\(89\)	\(704969\)
\(90\)	\(729000\)
\(91\)	\(753571\)
\(92\)	\(778688\)
\(93\)	\(804357\)
\(94\)	\(830584\)
\(95\)	\(857375\)
\(96\)	\(884736\)
\(97\)	\(912673\)
\(98\)	\(941192\)
\(99\)	\(970299\)
\(100\)	\(1000000\)

\(1 \sim 100\) 根号表（\(eps = 10^{-1}\)）

\(n\)	\(\sqrt{n}\)
\(1\)	\(1.0\)
\(2\)	\(1.4\)
\(3\)	\(1.7\)
\(4\)	\(2.0\)
\(5\)	\(2.2\)
\(6\)	\(2.4\)
\(7\)	\(2.6\)
\(8\)	\(2.8\)
\(9\)	\(3.0\)
\(10\)	\(3.2\)
\(11\)	\(3.3\)
\(12\)	\(3.5\)
\(13\)	\(3.6\)
\(14\)	\(3.7\)
\(15\)	\(3.9\)
\(16\)	\(4.0\)
\(17\)	\(4.1\)
\(18\)	\(4.2\)
\(19\)	\(4.4\)
\(20\)	\(4.5\)
\(21\)	\(4.6\)
\(22\)	\(4.7\)
\(23\)	\(4.8\)
\(24\)	\(4.9\)
\(25\)	\(5.0\)
\(26\)	\(5.1\)
\(27\)	\(5.2\)
\(28\)	\(5.3\)
\(29\)	\(5.4\)
\(30\)	\(5.5\)
\(31\)	\(5.6\)
\(32\)	\(5.7\)
\(33\)	\(5.7\)
\(34\)	\(5.8\)
\(35\)	\(5.9\)
\(36\)	\(6.0\)
\(37\)	\(6.1\)
\(38\)	\(6.2\)
\(39\)	\(6.2\)
\(40\)	\(6.3\)
\(41\)	\(6.4\)
\(42\)	\(6.5\)
\(43\)	\(6.6\)
\(44\)	\(6.6\)
\(45\)	\(6.7\)
\(46\)	\(6.8\)
\(47\)	\(6.9\)
\(48\)	\(6.9\)
\(49\)	\(7.0\)
\(50\)	\(7.1\)
\(51\)	\(7.1\)
\(52\)	\(7.2\)
\(53\)	\(7.3\)
\(54\)	\(7.3\)
\(55\)	\(7.4\)
\(56\)	\(7.5\)
\(57\)	\(7.5\)
\(58\)	\(7.6\)
\(59\)	\(7.7\)
\(60\)	\(7.7\)
\(61\)	\(7.8\)
\(62\)	\(7.9\)
\(63\)	\(7.9\)
\(64\)	\(8.0\)
\(65\)	\(8.1\)
\(66\)	\(8.1\)
\(67\)	\(8.2\)
\(68\)	\(8.2\)
\(69\)	\(8.3\)
\(70\)	\(8.4\)
\(71\)	\(8.4\)
\(72\)	\(8.5\)
\(73\)	\(8.5\)
\(74\)	\(8.6\)
\(75\)	\(8.7\)
\(76\)	\(8.7\)
\(77\)	\(8.8\)
\(78\)	\(8.8\)
\(79\)	\(8.9\)
\(80\)	\(8.9\)
\(81\)	\(9.0\)
\(82\)	\(9.1\)
\(83\)	\(9.1\)
\(84\)	\(9.2\)
\(85\)	\(9.2\)
\(86\)	\(9.3\)
\(87\)	\(9.3\)
\(88\)	\(9.4\)
\(89\)	\(9.4\)
\(90\)	\(9.5\)
\(91\)	\(9.5\)
\(92\)	\(9.6\)
\(93\)	\(9.6\)
\(94\)	\(9.7\)
\(95\)	\(9.7\)
\(96\)	\(9.8\)
\(97\)	\(9.8\)
\(98\)	\(9.9\)
\(99\)	\(9.9\)
\(100\)	\(10.0\)

\(1 \sim 100\) 根号表（\(eps = 10^{-2}\)）

\(n\)	\(\sqrt{n}\)
\(1\)	\(1.00\)
\(2\)	\(1.41\)
\(3\)	\(1.73\)
\(4\)	\(2.00\)
\(5\)	\(2.24\)
\(6\)	\(2.45\)
\(7\)	\(2.65\)
\(8\)	\(2.83\)
\(9\)	\(3.00\)
\(10\)	\(3.16\)
\(11\)	\(3.32\)
\(12\)	\(3.46\)
\(13\)	\(3.61\)
\(14\)	\(3.74\)
\(15\)	\(3.87\)
\(16\)	\(4.00\)
\(17\)	\(4.12\)
\(18\)	\(4.24\)
\(19\)	\(4.36\)
\(20\)	\(4.47\)
\(21\)	\(4.58\)
\(22\)	\(4.69\)
\(23\)	\(4.80\)
\(24\)	\(4.90\)
\(25\)	\(5.00\)
\(26\)	\(5.10\)
\(27\)	\(5.20\)
\(28\)	\(5.29\)
\(29\)	\(5.39\)
\(30\)	\(5.48\)
\(31\)	\(5.57\)
\(32\)	\(5.66\)
\(33\)	\(5.74\)
\(34\)	\(5.83\)
\(35\)	\(5.92\)
\(36\)	\(6.00\)
\(37\)	\(6.08\)
\(38\)	\(6.16\)
\(39\)	\(6.24\)
\(40\)	\(6.32\)
\(41\)	\(6.40\)
\(42\)	\(6.48\)
\(43\)	\(6.56\)
\(44\)	\(6.63\)
\(45\)	\(6.71\)
\(46\)	\(6.78\)
\(47\)	\(6.86\)
\(48\)	\(6.93\)
\(49\)	\(7.00\)
\(50\)	\(7.07\)
\(51\)	\(7.14\)
\(52\)	\(7.21\)
\(53\)	\(7.28\)
\(54\)	\(7.35\)
\(55\)	\(7.42\)
\(56\)	\(7.48\)
\(57\)	\(7.55\)
\(58\)	\(7.62\)
\(59\)	\(7.68\)
\(60\)	\(7.75\)
\(61\)	\(7.81\)
\(62\)	\(7.87\)
\(63\)	\(7.94\)
\(64\)	\(8.00\)
\(65\)	\(8.06\)
\(66\)	\(8.12\)
\(67\)	\(8.19\)
\(68\)	\(8.25\)
\(69\)	\(8.31\)
\(70\)	\(8.37\)
\(71\)	\(8.43\)
\(72\)	\(8.49\)
\(73\)	\(8.54\)
\(74\)	\(8.60\)
\(75\)	\(8.66\)
\(76\)	\(8.72\)
\(77\)	\(8.77\)
\(78\)	\(8.83\)
\(79\)	\(8.89\)
\(80\)	\(8.94\)
\(81\)	\(9.00\)
\(82\)	\(9.06\)
\(83\)	\(9.11\)
\(84\)	\(9.17\)
\(85\)	\(9.22\)
\(86\)	\(9.27\)
\(87\)	\(9.33\)
\(88\)	\(9.38\)
\(89\)	\(9.43\)
\(90\)	\(9.49\)
\(91\)	\(9.54\)
\(92\)	\(9.59\)
\(93\)	\(9.64\)
\(94\)	\(9.70\)
\(95\)	\(9.75\)
\(96\)	\(9.80\)
\(97\)	\(9.85\)
\(98\)	\(9.90\)
\(99\)	\(9.95\)
\(100\)	\(10.00\)

\(1 \sim 100\) 根号表（\(eps = 10^{-3}\)）

\(n\)	\(\sqrt{n}\)
\(1\)	\(1.000\)
\(2\)	\(1.414\)
\(3\)	\(1.732\)
\(4\)	\(2.000\)
\(5\)	\(2.236\)
\(6\)	\(2.449\)
\(7\)	\(2.646\)
\(8\)	\(2.828\)
\(9\)	\(3.000\)
\(10\)	\(3.162\)
\(11\)	\(3.317\)
\(12\)	\(3.464\)
\(13\)	\(3.606\)
\(14\)	\(3.742\)
\(15\)	\(3.873\)
\(16\)	\(4.000\)
\(17\)	\(4.123\)
\(18\)	\(4.243\)
\(19\)	\(4.359\)
\(20\)	\(4.472\)
\(21\)	\(4.583\)
\(22\)	\(4.690\)
\(23\)	\(4.796\)
\(24\)	\(4.899\)
\(25\)	\(5.000\)
\(26\)	\(5.099\)
\(27\)	\(5.196\)
\(28\)	\(5.292\)
\(29\)	\(5.385\)
\(30\)	\(5.477\)
\(31\)	\(5.568\)
\(32\)	\(5.657\)
\(33\)	\(5.745\)
\(34\)	\(5.831\)
\(35\)	\(5.916\)
\(36\)	\(6.000\)
\(37\)	\(6.083\)
\(38\)	\(6.164\)
\(39\)	\(6.245\)
\(40\)	\(6.325\)
\(41\)	\(6.403\)
\(42\)	\(6.481\)
\(43\)	\(6.557\)
\(44\)	\(6.633\)
\(45\)	\(6.708\)
\(46\)	\(6.782\)
\(47\)	\(6.856\)
\(48\)	\(6.928\)
\(49\)	\(7.000\)
\(50\)	\(7.071\)
\(51\)	\(7.141\)
\(52\)	\(7.211\)
\(53\)	\(7.280\)
\(54\)	\(7.348\)
\(55\)	\(7.416\)
\(56\)	\(7.483\)
\(57\)	\(7.550\)
\(58\)	\(7.616\)
\(59\)	\(7.681\)
\(60\)	\(7.746\)
\(61\)	\(7.810\)
\(62\)	\(7.874\)
\(63\)	\(7.937\)
\(64\)	\(8.000\)
\(65\)	\(8.062\)
\(66\)	\(8.124\)
\(67\)	\(8.185\)
\(68\)	\(8.246\)
\(69\)	\(8.307\)
\(70\)	\(8.367\)
\(71\)	\(8.426\)
\(72\)	\(8.485\)
\(73\)	\(8.544\)
\(74\)	\(8.602\)
\(75\)	\(8.660\)
\(76\)	\(8.718\)
\(77\)	\(8.775\)
\(78\)	\(8.832\)
\(79\)	\(8.888\)
\(80\)	\(8.944\)
\(81\)	\(9.000\)
\(82\)	\(9.055\)
\(83\)	\(9.110\)
\(84\)	\(9.165\)
\(85\)	\(9.220\)
\(86\)	\(9.274\)
\(87\)	\(9.327\)
\(88\)	\(9.381\)
\(89\)	\(9.434\)
\(90\)	\(9.487\)
\(91\)	\(9.539\)
\(92\)	\(9.592\)
\(93\)	\(9.644\)
\(94\)	\(9.695\)
\(95\)	\(9.747\)
\(96\)	\(9.798\)
\(97\)	\(9.849\)
\(98\)	\(9.899\)
\(99\)	\(9.950\)
\(100\)	\(10.000\)

\(1 \sim 100\) 根号表（\(eps = 10^{-4}\)）

\(n\)	\(\sqrt{n}\)
\(1\)	\(1.0000\)
\(2\)	\(1.4142\)
\(3\)	\(1.7321\)
\(4\)	\(2.0000\)
\(5\)	\(2.2361\)
\(6\)	\(2.4495\)
\(7\)	\(2.6458\)
\(8\)	\(2.8284\)
\(9\)	\(3.0000\)
\(10\)	\(3.1623\)
\(11\)	\(3.3166\)
\(12\)	\(3.4641\)
\(13\)	\(3.6056\)
\(14\)	\(3.7417\)
\(15\)	\(3.8730\)
\(16\)	\(4.0000\)
\(17\)	\(4.1231\)
\(18\)	\(4.2426\)
\(19\)	\(4.3589\)
\(20\)	\(4.4721\)
\(21\)	\(4.5826\)
\(22\)	\(4.6904\)
\(23\)	\(4.7958\)
\(24\)	\(4.8990\)
\(25\)	\(5.0000\)
\(26\)	\(5.0990\)
\(27\)	\(5.1962\)
\(28\)	\(5.2915\)
\(29\)	\(5.3852\)
\(30\)	\(5.4772\)
\(31\)	\(5.5678\)
\(32\)	\(5.6569\)
\(33\)	\(5.7446\)
\(34\)	\(5.8310\)
\(35\)	\(5.9161\)
\(36\)	\(6.0000\)
\(37\)	\(6.0828\)
\(38\)	\(6.1644\)
\(39\)	\(6.2450\)
\(40\)	\(6.3246\)
\(41\)	\(6.4031\)
\(42\)	\(6.4807\)
\(43\)	\(6.5574\)
\(44\)	\(6.6332\)
\(45\)	\(6.7082\)
\(46\)	\(6.7823\)
\(47\)	\(6.8557\)
\(48\)	\(6.9282\)
\(49\)	\(7.0000\)
\(50\)	\(7.0711\)
\(51\)	\(7.1414\)
\(52\)	\(7.2111\)
\(53\)	\(7.2801\)
\(54\)	\(7.3485\)
\(55\)	\(7.4162\)
\(56\)	\(7.4833\)
\(57\)	\(7.5498\)
\(58\)	\(7.6158\)
\(59\)	\(7.6811\)
\(60\)	\(7.7460\)
\(61\)	\(7.8102\)
\(62\)	\(7.8740\)
\(63\)	\(7.9373\)
\(64\)	\(8.0000\)
\(65\)	\(8.0623\)
\(66\)	\(8.1240\)
\(67\)	\(8.1854\)
\(68\)	\(8.2462\)
\(69\)	\(8.3066\)
\(70\)	\(8.3666\)
\(71\)	\(8.4261\)
\(72\)	\(8.4853\)
\(73\)	\(8.5440\)
\(74\)	\(8.6023\)
\(75\)	\(8.6603\)
\(76\)	\(8.7178\)
\(77\)	\(8.7750\)
\(78\)	\(8.8318\)
\(79\)	\(8.8882\)
\(80\)	\(8.9443\)
\(81\)	\(9.0000\)
\(82\)	\(9.0554\)
\(83\)	\(9.1104\)
\(84\)	\(9.1652\)
\(85\)	\(9.2195\)
\(86\)	\(9.2736\)
\(87\)	\(9.3274\)
\(88\)	\(9.3808\)
\(89\)	\(9.4340\)
\(90\)	\(9.4868\)
\(91\)	\(9.5394\)
\(92\)	\(9.5917\)
\(93\)	\(9.6437\)
\(94\)	\(9.6954\)
\(95\)	\(9.7468\)
\(96\)	\(9.7980\)
\(97\)	\(9.8489\)
\(98\)	\(9.8995\)
\(99\)	\(9.9499\)
\(100\)	\(10.0000\)

\(1 \sim 100\) 根号表（\(eps = 10^{-5}\)）

\(n\)	\(\sqrt{n}\)
\(1\)	\(1.00000\)
\(2\)	\(1.41421\)
\(3\)	\(1.73205\)
\(4\)	\(2.00000\)
\(5\)	\(2.23607\)
\(6\)	\(2.44949\)
\(7\)	\(2.64575\)
\(8\)	\(2.82843\)
\(9\)	\(3.00000\)
\(10\)	\(3.16228\)
\(11\)	\(3.31662\)
\(12\)	\(3.46410\)
\(13\)	\(3.60555\)
\(14\)	\(3.74166\)
\(15\)	\(3.87298\)
\(16\)	\(4.00000\)
\(17\)	\(4.12311\)
\(18\)	\(4.24264\)
\(19\)	\(4.35890\)
\(20\)	\(4.47214\)
\(21\)	\(4.58258\)
\(22\)	\(4.69042\)
\(23\)	\(4.79583\)
\(24\)	\(4.89898\)
\(25\)	\(5.00000\)
\(26\)	\(5.09902\)
\(27\)	\(5.19615\)
\(28\)	\(5.29150\)
\(29\)	\(5.38516\)
\(30\)	\(5.47723\)
\(31\)	\(5.56776\)
\(32\)	\(5.65685\)
\(33\)	\(5.74456\)
\(34\)	\(5.83095\)
\(35\)	\(5.91608\)
\(36\)	\(6.00000\)
\(37\)	\(6.08276\)
\(38\)	\(6.16441\)
\(39\)	\(6.24500\)
\(40\)	\(6.32456\)
\(41\)	\(6.40312\)
\(42\)	\(6.48074\)
\(43\)	\(6.55744\)
\(44\)	\(6.63325\)
\(45\)	\(6.70820\)
\(46\)	\(6.78233\)
\(47\)	\(6.85565\)
\(48\)	\(6.92820\)
\(49\)	\(7.00000\)
\(50\)	\(7.07107\)
\(51\)	\(7.14143\)
\(52\)	\(7.21110\)
\(53\)	\(7.28011\)
\(54\)	\(7.34847\)
\(55\)	\(7.41620\)
\(56\)	\(7.48331\)
\(57\)	\(7.54983\)
\(58\)	\(7.61577\)
\(59\)	\(7.68115\)
\(60\)	\(7.74597\)
\(61\)	\(7.81025\)
\(62\)	\(7.87401\)
\(63\)	\(7.93725\)
\(64\)	\(8.00000\)
\(65\)	\(8.06226\)
\(66\)	\(8.12404\)
\(67\)	\(8.18535\)
\(68\)	\(8.24621\)
\(69\)	\(8.30662\)
\(70\)	\(8.36660\)
\(71\)	\(8.42615\)
\(72\)	\(8.48528\)
\(73\)	\(8.54400\)
\(74\)	\(8.60233\)
\(75\)	\(8.66025\)
\(76\)	\(8.71780\)
\(77\)	\(8.77496\)
\(78\)	\(8.83176\)
\(79\)	\(8.88819\)
\(80\)	\(8.94427\)
\(81\)	\(9.00000\)
\(82\)	\(9.05539\)
\(83\)	\(9.11043\)
\(84\)	\(9.16515\)
\(85\)	\(9.21954\)
\(86\)	\(9.27362\)
\(87\)	\(9.32738\)
\(88\)	\(9.38083\)
\(89\)	\(9.43398\)
\(90\)	\(9.48683\)
\(91\)	\(9.53939\)
\(92\)	\(9.59166\)
\(93\)	\(9.64365\)
\(94\)	\(9.69536\)
\(95\)	\(9.74679\)
\(96\)	\(9.79796\)
\(97\)	\(9.84886\)
\(98\)	\(9.89949\)
\(99\)	\(9.94987\)
\(100\)	\(10.00000\)

\(1 \sim 100\) 根号表（\(eps = 10^{-6}\)）

\(n\)	\(\sqrt{n}\)
\(1\)	\(1.000000\)
\(2\)	\(1.414214\)
\(3\)	\(1.732051\)
\(4\)	\(2.000000\)
\(5\)	\(2.236068\)
\(6\)	\(2.449490\)
\(7\)	\(2.645751\)
\(8\)	\(2.828427\)
\(9\)	\(3.000000\)
\(10\)	\(3.162278\)
\(11\)	\(3.316625\)
\(12\)	\(3.464102\)
\(13\)	\(3.605551\)
\(14\)	\(3.741657\)
\(15\)	\(3.872983\)
\(16\)	\(4.000000\)
\(17\)	\(4.123106\)
\(18\)	\(4.242641\)
\(19\)	\(4.358899\)
\(20\)	\(4.472136\)
\(21\)	\(4.582576\)
\(22\)	\(4.690416\)
\(23\)	\(4.795832\)
\(24\)	\(4.898979\)
\(25\)	\(5.000000\)
\(26\)	\(5.099020\)
\(27\)	\(5.196152\)
\(28\)	\(5.291503\)
\(29\)	\(5.385165\)
\(30\)	\(5.477226\)
\(31\)	\(5.567764\)
\(32\)	\(5.656854\)
\(33\)	\(5.744563\)
\(34\)	\(5.830952\)
\(35\)	\(5.916080\)
\(36\)	\(6.000000\)
\(37\)	\(6.082763\)
\(38\)	\(6.164414\)
\(39\)	\(6.244998\)
\(40\)	\(6.324555\)
\(41\)	\(6.403124\)
\(42\)	\(6.480741\)
\(43\)	\(6.557439\)
\(44\)	\(6.633250\)
\(45\)	\(6.708204\)
\(46\)	\(6.782330\)
\(47\)	\(6.855655\)
\(48\)	\(6.928203\)
\(49\)	\(7.000000\)
\(50\)	\(7.071068\)
\(51\)	\(7.141428\)
\(52\)	\(7.211103\)
\(53\)	\(7.280110\)
\(54\)	\(7.348469\)
\(55\)	\(7.416198\)
\(56\)	\(7.483315\)
\(57\)	\(7.549834\)
\(58\)	\(7.615773\)
\(59\)	\(7.681146\)
\(60\)	\(7.745967\)
\(61\)	\(7.810250\)
\(62\)	\(7.874008\)
\(63\)	\(7.937254\)
\(64\)	\(8.000000\)
\(65\)	\(8.062258\)
\(66\)	\(8.124038\)
\(67\)	\(8.185353\)
\(68\)	\(8.246211\)
\(69\)	\(8.306624\)
\(70\)	\(8.366600\)
\(71\)	\(8.426150\)
\(72\)	\(8.485281\)
\(73\)	\(8.544004\)
\(74\)	\(8.602325\)
\(75\)	\(8.660254\)
\(76\)	\(8.717798\)
\(77\)	\(8.774964\)
\(78\)	\(8.831761\)
\(79\)	\(8.888194\)
\(80\)	\(8.944272\)
\(81\)	\(9.000000\)
\(82\)	\(9.055385\)
\(83\)	\(9.110434\)
\(84\)	\(9.165151\)
\(85\)	\(9.219544\)
\(86\)	\(9.273618\)
\(87\)	\(9.327379\)
\(88\)	\(9.380832\)
\(89\)	\(9.433981\)
\(90\)	\(9.486833\)
\(91\)	\(9.539392\)
\(92\)	\(9.591663\)
\(93\)	\(9.643651\)
\(94\)	\(9.695360\)
\(95\)	\(9.746794\)
\(96\)	\(9.797959\)
\(97\)	\(9.848858\)
\(98\)	\(9.899495\)
\(99\)	\(9.949874\)
\(100\)	\(10.000000\)

\(1 \sim 100\) 根号表（\(eps = 10^{-7}\)）

\(n\)	\(\sqrt{n}\)
\(1\)	\(1.0000000\)
\(2\)	\(1.4142136\)
\(3\)	\(1.7320508\)
\(4\)	\(2.0000000\)
\(5\)	\(2.2360680\)
\(6\)	\(2.4494897\)
\(7\)	\(2.6457513\)
\(8\)	\(2.8284271\)
\(9\)	\(3.0000000\)
\(10\)	\(3.1622777\)
\(11\)	\(3.3166248\)
\(12\)	\(3.4641016\)
\(13\)	\(3.6055513\)
\(14\)	\(3.7416574\)
\(15\)	\(3.8729833\)
\(16\)	\(4.0000000\)
\(17\)	\(4.1231056\)
\(18\)	\(4.2426407\)
\(19\)	\(4.3588989\)
\(20\)	\(4.4721360\)
\(21\)	\(4.5825757\)
\(22\)	\(4.6904158\)
\(23\)	\(4.7958315\)
\(24\)	\(4.8989795\)
\(25\)	\(5.0000000\)
\(26\)	\(5.0990195\)
\(27\)	\(5.1961524\)
\(28\)	\(5.2915026\)
\(29\)	\(5.3851648\)
\(30\)	\(5.4772256\)
\(31\)	\(5.5677644\)
\(32\)	\(5.6568542\)
\(33\)	\(5.7445626\)
\(34\)	\(5.8309519\)
\(35\)	\(5.9160798\)
\(36\)	\(6.0000000\)
\(37\)	\(6.0827625\)
\(38\)	\(6.1644140\)
\(39\)	\(6.2449980\)
\(40\)	\(6.3245553\)
\(41\)	\(6.4031242\)
\(42\)	\(6.4807407\)
\(43\)	\(6.5574385\)
\(44\)	\(6.6332496\)
\(45\)	\(6.7082039\)
\(46\)	\(6.7823300\)
\(47\)	\(6.8556546\)
\(48\)	\(6.9282032\)
\(49\)	\(7.0000000\)
\(50\)	\(7.0710678\)
\(51\)	\(7.1414284\)
\(52\)	\(7.2111026\)
\(53\)	\(7.2801099\)
\(54\)	\(7.3484692\)
\(55\)	\(7.4161985\)
\(56\)	\(7.4833148\)
\(57\)	\(7.5498344\)
\(58\)	\(7.6157731\)
\(59\)	\(7.6811457\)
\(60\)	\(7.7459667\)
\(61\)	\(7.8102497\)
\(62\)	\(7.8740079\)
\(63\)	\(7.9372539\)
\(64\)	\(8.0000000\)
\(65\)	\(8.0622577\)
\(66\)	\(8.1240384\)
\(67\)	\(8.1853528\)
\(68\)	\(8.2462113\)
\(69\)	\(8.3066239\)
\(70\)	\(8.3666003\)
\(71\)	\(8.4261498\)
\(72\)	\(8.4852814\)
\(73\)	\(8.5440037\)
\(74\)	\(8.6023253\)
\(75\)	\(8.6602540\)
\(76\)	\(8.7177979\)
\(77\)	\(8.7749644\)
\(78\)	\(8.8317609\)
\(79\)	\(8.8881944\)
\(80\)	\(8.9442719\)
\(81\)	\(9.0000000\)
\(82\)	\(9.0553851\)
\(83\)	\(9.1104336\)
\(84\)	\(9.1651514\)
\(85\)	\(9.2195445\)
\(86\)	\(9.2736185\)
\(87\)	\(9.3273791\)
\(88\)	\(9.3808315\)
\(89\)	\(9.4339811\)
\(90\)	\(9.4868330\)
\(91\)	\(9.5393920\)
\(92\)	\(9.5916630\)
\(93\)	\(9.6436508\)
\(94\)	\(9.6953597\)
\(95\)	\(9.7467943\)
\(96\)	\(9.7979590\)
\(97\)	\(9.8488578\)
\(98\)	\(9.8994949\)
\(99\)	\(9.9498744\)
\(100\)	\(10.0000000\)

\(1 \sim 100\) 根号表（\(eps = 10^{-8}\)）

\(n\)	\(\sqrt{n}\)
\(1\)	\(1.00000000\)
\(2\)	\(1.41421356\)
\(3\)	\(1.73205081\)
\(4\)	\(2.00000000\)
\(5\)	\(2.23606798\)
\(6\)	\(2.44948974\)
\(7\)	\(2.64575131\)
\(8\)	\(2.82842712\)
\(9\)	\(3.00000000\)
\(10\)	\(3.16227766\)
\(11\)	\(3.31662479\)
\(12\)	\(3.46410162\)
\(13\)	\(3.60555128\)
\(14\)	\(3.74165739\)
\(15\)	\(3.87298335\)
\(16\)	\(4.00000000\)
\(17\)	\(4.12310563\)
\(18\)	\(4.24264069\)
\(19\)	\(4.35889894\)
\(20\)	\(4.47213595\)
\(21\)	\(4.58257569\)
\(22\)	\(4.69041576\)
\(23\)	\(4.79583152\)
\(24\)	\(4.89897949\)
\(25\)	\(5.00000000\)
\(26\)	\(5.09901951\)
\(27\)	\(5.19615242\)
\(28\)	\(5.29150262\)
\(29\)	\(5.38516481\)
\(30\)	\(5.47722558\)
\(31\)	\(5.56776436\)
\(32\)	\(5.65685425\)
\(33\)	\(5.74456265\)
\(34\)	\(5.83095189\)
\(35\)	\(5.91607978\)
\(36\)	\(6.00000000\)
\(37\)	\(6.08276253\)
\(38\)	\(6.16441400\)
\(39\)	\(6.24499800\)
\(40\)	\(6.32455532\)
\(41\)	\(6.40312424\)
\(42\)	\(6.48074070\)
\(43\)	\(6.55743852\)
\(44\)	\(6.63324958\)
\(45\)	\(6.70820393\)
\(46\)	\(6.78232998\)
\(47\)	\(6.85565460\)
\(48\)	\(6.92820323\)
\(49\)	\(7.00000000\)
\(50\)	\(7.07106781\)
\(51\)	\(7.14142843\)
\(52\)	\(7.21110255\)
\(53\)	\(7.28010989\)
\(54\)	\(7.34846923\)
\(55\)	\(7.41619849\)
\(56\)	\(7.48331477\)
\(57\)	\(7.54983444\)
\(58\)	\(7.61577311\)
\(59\)	\(7.68114575\)
\(60\)	\(7.74596669\)
\(61\)	\(7.81024968\)
\(62\)	\(7.87400787\)
\(63\)	\(7.93725393\)
\(64\)	\(8.00000000\)
\(65\)	\(8.06225775\)
\(66\)	\(8.12403840\)
\(67\)	\(8.18535277\)
\(68\)	\(8.24621125\)
\(69\)	\(8.30662386\)
\(70\)	\(8.36660027\)
\(71\)	\(8.42614977\)
\(72\)	\(8.48528137\)
\(73\)	\(8.54400375\)
\(74\)	\(8.60232527\)
\(75\)	\(8.66025404\)
\(76\)	\(8.71779789\)
\(77\)	\(8.77496439\)
\(78\)	\(8.83176087\)
\(79\)	\(8.88819442\)
\(80\)	\(8.94427191\)
\(81\)	\(9.00000000\)
\(82\)	\(9.05538514\)
\(83\)	\(9.11043358\)
\(84\)	\(9.16515139\)
\(85\)	\(9.21954446\)
\(86\)	\(9.27361850\)
\(87\)	\(9.32737905\)
\(88\)	\(9.38083152\)
\(89\)	\(9.43398113\)
\(90\)	\(9.48683298\)
\(91\)	\(9.53939201\)
\(92\)	\(9.59166305\)
\(93\)	\(9.64365076\)
\(94\)	\(9.69535971\)
\(95\)	\(9.74679434\)
\(96\)	\(9.79795897\)
\(97\)	\(9.84885780\)
\(98\)	\(9.89949494\)
\(99\)	\(9.94987437\)
\(100\)	\(10.00000000\)