[br][img]data:image/png;base64,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[/img][br]How many small squares are in Step 10?

[size=150]Pattern A[br][img]data:image/png;base64,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[/img][br][br]Pattern B[/size][br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZ0AAAByCAYAAACIugxBAAAWWElEQVR4Ae2dCYwURRfH1wOI0QTUBVE0q0FRvMAgavDYxTO6kRWNgkIUiAceuHhfHIIYInIFYyRGXFA8WDlWEY2ioEggEYNIXMUjICoCZkVA44nWl//4PajpqZ7pmq7pnpn+V7Lpnq5Xr6p+r+q9vrarQjGRAAmQAAmQQEQEKiKqh9WQAAmQAAmQgGLQ4SAgARIgARKIjACDTmSoWREJkAAJkACDDscACZAACZBAZAQYdCJDzYpIgARIgAQYdDgGSIAESIAEIiPAoBMZalZEAiRAAiTAoMMxQAIkQAIkEBkBBp3IULMiEiABEiABBh2OARIgARIggcgIMOhEhpoVkQAJkAAJMOhwDJAACZAACURGgEEnMtSsiARIoJwJbN26VTU1Nal33303dDfXr1+vXnnlFbV8+fLQupqbm9VLL72kPvroo9C6XChg0HFBkTpIgAQSTWDs2LGqoqJi919VVZV644038mJy66237tYDnaeccopavXp1Xrr69euXpuu8885TmzdvzkuXq0IMOq5IUg8JkEAiCcydOzfNsUvwOeigg9TOnTutmEycONGoC4HHNg0bNsyoq66uzlaVU3kGHac4qYwESCBpBK688kqjc0fwmTVrlhUOBBcJWt6t7a22tm3b+uratGmTVbtcCjPouKRJXSRAAokjcMYZZ/g69/Hjx1vxqKys9NXV2NgYWNdPP/3kqwfBLM7nOww6gc1IQRIgARLIJDB8+HBfB7948eLMAlmO9OnTx1fX119/naVkZtZJJ51k1LX//vurf/75J7NAREcYdCICzWpIgATKkwCCQbt27TIcfG1trXWHlyxZkqEHVyZDhw611oVbe95bdPg9btw4a10uCzDouKRJXSRAAokksGbNGoU3xQ4++GDVuXNndd999+XN4Z133lEIWHgmc+KJJyrbW3R6xXPmzFE1NTXqgAMOUD179lTTp0/Xs2PZZ9CJBTsrJQESIIFkEmDQSabd2WsSIAESiIUAg04s2FkpCZAACSSTAINOMu3OXpMACZBALAQYdGLBzkpJgARIIJkEGHSSaXf2mgRIgARiIcCgEwt2VkoCJEACySTAoJNMu7PXJEACJBALAQadWLCzUhIgARJIJgEGnWTanb0mARIggVgIMOjEgp2VkgAJkEAyCTDoJNPu7HWREVixYoWaNm2amj9/fuiW4dtdkydPznvlytANSKiCtWvXpr5t9sILL6ht27aForBy5Ur1xBNPKCwQt2vXrlC6sHz2lClT1KJFi0LpcVWYQccVSeohgTwJeBcBw1LH77//vrW2lpYWVV1dnfZl4R49eijbT+JbV8wCqr6+Po37fvvtp2bPnp0Xmf79+6fp6tSpk0LgsE07duxQWJ5a/9J0t27d1Oeff26ryqk8g45TnFRGAnYERo4cmeYUxEF07drVTpFSauDAgUZdF198sbUuFghOwG8JgVatWqktW7YEV6SUGjNmjNGGRx99tJUeCA8ZMsSo69xzz7XW5bIAg45LmtRFApYEunTpYnQMCD42yxP//fffau+99/bV9cMPP1i2jOJBCdTV1flyf+aZZ4KqScmdcMIJvrqWLl1qpQtXW3IS491+8803VrpcCjPouKRJXSRgSeDAAw/0dQwLFy4MrO3HH3/01QOH09zcHFgXBe0I9OrVy5f9hAkTrJR16NDBV9e8efMC69q+fbuvHoyHjz/+OLAu14IMOq6JUh8JWBC4/PLLfZ3D1q1bLTQp1b17d6MuPBNgKhyBBx54wMgdzn3ZsmVWFWMhOO9Vifz+/vvvrXSddtppRl3t27e30uNamEHHNVHqIwELAnhLad99981wDiNGjLDQ8p9oY2Njhh44rGJYLdK6MyVUACcHRx11VAb7AQMGWPdi1apVqk2bNhm68lmJdMGCBRl6MB7wVlyciUEnTvqsmwSUUqtXr1aDBw9Wxx13nLrwwgvVzJkz8+ayePFiddVVVyk8eMazhldffTVvXSwYnACuQvAGG57JnHXWWWrSpEnBC3skP/nkk9RLABgP559/vpoxY4ZHIvhPPAfC1dMxxxyj+vTpo2xu0QWvxU6SQceOF6VJgARIgARCEGDQCQGPRUmABEiABOwIMOjY8aI0CZAACZBACAIMOiHgsSgJkAAJkIAdAQYdO16UJgESIAESCEGAQScEPBYlARIgARKwI8CgY8eL0iRAAiRAAiEIMOiEgMeiJEACJEACdgQYdOx4UZoESIAESCAEAQadEPBYlARIgARIwI4Ag44dL0qTAAmQAAmEIMCgEwJesRR97rnn1N13360aGhrUX3/9VSzNYjssCOCbWPha8ZNPPmm98Je3mueff17dc8896tlnn1W///67N5u/C0Tg7bffVqNGjVITJ04MvTonPtaJ8YCPc27atClUi7F8NsYD1vb59ddfQ+lyUZhBxwXFmHRg2dljjz027Uuy+NptnGtlxISiZKtFUOjdu3eaDbH4VlNTk3WfsCy1dxGwI444QuHLxUyFJYAvSssSBLKdNm2adaVYjA8f+RQd2LZu3VrNnTvXWhcWajv55JPTdB166KFqxYoV1rpcFmDQcUkzYl21tbVpA0oGatzL0UaMoaSru/POO402RLCwTX379jXqOvvss21VUd6CwFNPPWXkjvm4fv16C01K3XvvvUZdHTt2tNIDYXxtXHyCvj399NOtdbkswKDjkmaEunbs2GEcUDK4Nm/eHGFrWFW+BEzrsIgN33vvvcBqccUk5UzbjRs3BtZFQTsCl1xyiS97BCSblG35cty+C5p27dql9tlnH992ffXVV0FVOZdj0HGONBqFW7Zs8R1QcDobNmyIpiGsJRSByspKXzu++eabgXVv27bNVw/Gw7p16wLroqAdgerqal/2kydPtlKG21+mkwYcs1kbCc9u/PTg+Nq1a63a5VKYQcclzYh1nXrqqcaBhfv6TKVBYODAgUYbYjVRXM3apF69ehl1YQEvpsIRGDNmjJE7nPuHH35oVfGgQYN8dbW0tFjpqqmpMeqqqqqy0uNamEHHNdEI9b3++uvGQZXPQ8cIm82qNAKfffaZOuSQQzLsiDegbNNbb72VoQeO7+WXX7ZVRXkLAri12aNHjwz2t912m4WW/0S//PJLddhhh2XoGj9+vLWuJUuWGG+x4W3XOBODTpz0HdSNN9WGDRumzjnnHHXLLbdYn1k5aAJVhCSApY4ffPDB1Fts1113nbK5reatGksd33777anxcPPNN6uVK1d6Rfi7AATwrwoIDBdddFHqAT5eU8434XnsQw89pPBC0LXXXqtwcplvam5uVsOHD1e4BXjTTTep5cuX56vKWTkGHWcoqYgESIAESCAXAQadXISYTwIkQAIk4IwAg44zlFREAiRAAiSQiwCDTi5CzCcBEiABEnBGgEHHGUoqIgESIAESyEWAQScXIeaTAAmQAAk4I8Cg4wwlFZEACZAACeQiwKCTixDzSYAESIAEnBFg0HGGkopIgARIgARyEWDQyUWI+SRAAiRAAs4IMOg4Q0lFJEACJEACuQg4Czr4xtP999+vrr/++tQyubkqzpaPDxfecccdCt+OamxszCZaknlYHRDLEuOLsqNHj1affvppUfTjiy++UPhiLr7/hVUPf/vtt6JoV7E2Ah9OvPHGG1MLb33wwQfF2sy824WVSB955JHU97+mTp2qfvnll7x1FWtBrNCKD3Pie3ULFy4s1mYWRbuwXMq4ceNS4wFLNmzfvj2vdjkJOvgirnftBnyAEgsJ2aa77rorQ1e/fv1s1RSt/HfffaeOP/74jD7Onj071jbjy9ReG3bu3FnFudhTrEByVH7BBRdk8Hr00UdzlCqdbDjjvfbaK62PRx55pMIS6eWShgwZktY/jH98FJMpk8CiRYtUq1at0nh16tRJ4QOztil00MEXcr3OSn6PGjXKqj34AqqU9W4bGhqsdBWrsGmgo68dOnSItclwKF7m+N2/f/9Y21WMleNrwiZWOIZP05dDwho8pj5eccUV5dA9NX/+fGP/0Gc4WKZ0AlijyzQeLr300nTBAL9CBx3cYjA1Bsd69uwZoAl7RB5++GFfXVdfffUewRLea9++vW8fbZYndolg1apVvm1q06aNy6rKQle2lSKnT59e8n1cs2aN73jA1U85pKFDh/r2EUsBMO0hgDWf/Hw8jv/55597hAPshQ46s2bN8m0QVra0SXi+4de5cjnjzhZ0li5daoPLmWy2oNO6dWtn9ZSLItw69hun5RB0sEaTX/9wvBxStqBTX19fDl101gesyZNtPPzxxx9WdYUeQd9++61vg0aMGGHVmGXLlvnqmjFjhpWuYhX2W462srJS/fvvv7E1G0vYmgZWOT1PcwUXz25MrHAML2OUQ8LzPFMf+/btWw7dU6ZnmNLfMIumlQUcQye6du1qHA+1tbUG6eyHQgcdqH/ssccyGnTmmWdaX3ZBFy5txfiyLZf7yOjfxo0bVZcuXTL6OHPmzOyWKnDunDlzMtqE5zzl4kRd4+vdu3cGr7Fjx7quJjZ98+bNy+jf4YcfXjRvWroAg7c0xcfIFm/fMmUSeO211zJeLOnYsaPCVbFtchJ0UCleGcWbZzDk008/bduONHk8yMNrjDfccIN68cUX0/LK4QfWVMcrqAMGDEgtU4x76MWQcBk9cuRIdc0116hJkyapnTt3FkOzirYNuPoePHhw6vX+uG6NFhLOunXrFF4GwvPUxx9/XP3888+FrC4W3bjiwRtr+PeMBQsWxNKGUqkUL8nguTvGw4QJE1RLS0teTXcWdPKqnYVIgARIgAQSRYBBJ1HmZmdJgARIIF4CDDrx8mftJEACJJAoAgw6iTI3O0sCJEAC8RJg0ImXP2snARIggUQRYNBJlLnZWRIgARKIlwCDTrz8WTsJkAAJJIoAg06izM3OkgAJkEC8BBh04uXP2kmABEggUQQYdBJlbnaWBEiABOIlwKATL3/WTgIkQAKJIsCgkyhzs7MkQAIkEC8BBp14+bN2EiABEkgUAQadRJmbnSUBEiCBeAkw6MTLn7WTAAmQQKIIMOgkytzsLAmQAAnES4BBJ17+rJ0ESIAEEkUgUNDZsGGDGjRokOrevbvCEsY1NTWplS/jIjVlypRUW9q1a6cuu+wyhfaVY8JKjVipD7zRV2yxnHecKziibjBvaGgoR+QF6RNYwXYydzCX4hqz3rbEvUx6QYDHpLSY/CRWssU8FZ+N/XyWli4EypxBB04GDq+urk6hI/iD0x89evTu9uCY/nt3RgF2UHfbtm1TS8uiXiyPDbDlmMC8W7duu/uK5XTRXz2BRVQJgxZjoaqqKjJ7R9W3QtVTX1+fGq9w9hivYkM96MDGUSTMnerq6t3jCW2SuRRF/eVcB/wkTip0Pwm+ul/E/AH/KBLmKOyNMYc/jEPMXX3cRdEOUx05gw4aXFGRXQwd0uF6KwLsXGfnqCeXDPQCJoypJ9MxPb9U98EdXPwSHFg222CA5RpksE0uGdQPGXFQmDjZ7O3X3iQel8nv13eM+Ww2RH4u+yAfdswnYe7CUTKFIxDUT2YLOi79pKk3mL9e32mSK/Sx7NFEqZTTw6TwCwgYsMjX/6TR6CCiK87kkI/bCroeHBMZAMFv3IbQZUQXtphckPFOQpz9e68A9HKluo++IrCYErghX/+TAIXBi6s/MMUf9nWnhIABZwPWIgM76TKmOsUuDDomOuZjYAXWpgTeuv2wL8EcrMU+CFxe+0BOxr1uQ7/xYqofx6AnmyP0K8fj6QQk6MgcSc9VKVt5bS0ysBnsCztDBrfCdD2wD65acCUlMpjTuozo8ttCFrrFR/jJRXE8Z9BBIxA00Em/BpuckEwocWToNPTIpIJeQABECSIi4xdAxLBeMOU6ceCsMBhx3900wPx4gKnOWQKMcEMe2OtnPWCOQR0kmewdpFwSZeRqFM/mbGwIxvo8gNPBWBAdYkPdznIiIvMpCG+MFX0cBClDGTMB8ZNNTU1GAdgKdtWTnEiLb4V9IaOfqOA3Tiy8vlQfH7pOfR/60B6cwHjr1uWi3A8UdNBwdBCOCo7J+/ARndEHPzoAeS8UTBwEL0nQ5y0nk1Rk9K2fkzUZUy9XyvtgBscAh+N9icDEA/wwQPUkA1ucEXhhgugJNoY9ZPDred59k729Mvy9hwBsAhuCr/clApMN5YQNNtGTbh/Y0GtnyHpPOPTy3n04Nu848Mrwd3ACsJfYBX5y6tSpaYVNfgrHvLc3MV4w3yVhvulBCMez+Um9HMYM/hB0ZP5LflzbQEFHGqdDxSWgJJMTwjGAR2flDwEHACRhH/D05HWQep5pgiLfZEy9XDnsgxMcBJiKMzLxAAsMWGEuW7CWgAIZ7wkBGJnsaGIXVM5UNsnHwB/sYB85azXZUI6J7WSLcrAdkt+YhwPzOigTc1zdIGgViyMytbFUj2F+Cl/dT5psFsRPQgYnn96kz2lvnv4b7UH5oPJ62ULs74kAFtplUsiANTkhHINjg6z3T6oyBR05yxPdIout5InTlTxMMu/ZguSV0xb9xpmsDECxg95HDGwEJy9z/BZupsEPHSgnunWd3n2Tvb0y/O1PQOYGJEw2lGMmG8q88LMhdOcKOuIQJfD5t5Q5YQiIv4IdkUw2k7FgsrXUbZpvmMvwnzY2hD8uBj+ZV9DxdhgdAVA9oYOms2ldBtC8EwQTAsf9Es7OvFdHQZ2ln85SOq4PQHFOevvlmAQYPU/2YSv9NieOi01lgoisaau3wZTPY9kJ6HND7KWXEGclAUbPk33Y0DRP9JMSkdW3DDg6jcLvw0Yyp0xBxzQXva3CfPP6ySC317x69HHnzYvyt793/38rAEyPpnBOuC8NRy/JBA4TBsD1+5o4JgZAWeTjdpHoh244w2zBSuoSpyqTKNsElXaW0hb98T6QlEtk6as4LOEn/YNtvG8K6oEaDMEe7CSBORxWkMSgE4TSfzJgLGMVR2Az3CbT7aE7JtGMEznMBb2sXkZsiOd8kjA+cFKml5E8bGWueMeLLsP9/Aj4+Ul9TsE++u1x1IS5DJvpfhL20/0k5pt+Sxb52fykyXeYxl1+PQ1fKmfQkYGKiSF/gKAPXHQScAEGf5LQURyXctjqERu/YQgpi9+YbH6TRvRCh+g0XfmIXClvwdfLDr91x4P+IViABQazDFTYAzYSRth6TxLAUJdBvm7TbOxQDk6PKTcBcNXtgPGKMa8nCSCwoXDFHMBc0MvC/pIgBzvIXMC8g24ZAyKnb3V763qxn62croP7ZgJB/CRsivEAW8HWknL5SdhN/KTYDcf8/GRQ3yH1R73NGXT0BuVySnB2JhA4ZiqrD3aUtU0mnbY6SkE+Vz/B14+fyZnAYenOzWSzUuBSSm2EDXNx9rOzqawEHWHgZ3/J5zY6An52lBbY+kkEGJnHNnbGeJNyUncxbK2CjusG60HHtW7q8yegBx1/KeYUMwFv0CnmtrJt4QjoQSecpuIozaBTHHaItBUMOpHiLkhlDDoFwVqUShl0HJoFMHNdijqsjqr+TwD3n/HHVLoEYD/9+Wjp9oQtz0UAdi4nPxnrlU4u2MwnARIgARIoLwIMOuVlT/aGBEiABIqaAINOUZuHjSMBEiCB8iLAoFNe9mRvSIAESKCoCfwPPidfHtjn8sAAAAAASUVORK5CYII=[/img][br][br]How many dots will there be in Step 4 of each pattern?

Which pattern shows a quadratic relationship between the step number and the number of dots? Explain how you know.[br]

[size=150]Each expression represents the total number of dots in a pattern where n represents the step number. [br][br]Select [b]all[/b] the expressions that represent a quadratic relationship between the step number and the total number of dots. (If you get stuck, consider sketching the first few steps of each pattern as described by the expression.)[/size]

[size=150]The function [math]C[/math] gives the percentage of homes using only cell phone service [math]x[/math] years after 2004. Explain the meaning of each statement.[/size][br][br][math]C\left(10\right)=35[/math]

[math]C\left(x\right)=10[/math]

How is [math]C\left(10\right)[/math] different from [math]C\left(x\right)=10[/math]?

What lengths and widths do you think will produce the largest possible area? Explain how you know.

Which is the first day, after the antibiotic is given, that the bacteria population is more than 1,000,000?[br]

Write an equation relating [math]p[/math], the bacteria population, to [math]d[/math], the number of days since it was first measured.