IM Alg1.2.3 Lesson: Writing Equations to Model Relationships (Part 2)

[size=150]Here is a table of values. The two quantities, [math]x[/math] and [math]y[/math], are related.[/size][br][img]data:image/png;base64,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[/img][br]What are some strategies you could use to find a relationship between [math]x[/math] and [math]y[/math]? [br]Brainstorm as many ways as possible.
Describe in words how the two quantities in each table are related.
[img]data:image/png;base64,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[/img]
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[/img]
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[/img]
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[/img]
Match each table to an equation that represents the relationship.
[size=150]Table A[br][img]data:image/png;base64,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[/img][/size]
[size=150]Table 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[/img][/size]
[size=150]Table 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[/img][/size]
[size=150]Table 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CRp96H3ULvqJ5WzjjPaxTN3QMlpPFRv4jXN+5C9qGJXPjY1+OX665vGO6yPq1HUILqOxGbVXXhzj2De1HXM/h0dl/o3iWWOl+tfaw67KVX2uPWc8Nk8a1sRct3c6WJjQV/nixqSH31WO5zK1k+VoTvzjH/9Yvva1rx0ShzvuuGPBj65uvfXWw+fjH//4IZm4TP3Vvs9NGqr9XIZdtnFehqat+tw7NhykW/+p561i7/kxj5ZKxsNJQ8urVIrZ5egrypKzSzaK2Xv86uCS5V257jk3sq+A8PsMuPSOfzHB8lUI3EnDVRilN2rMDoU3tjiuBnvIVdpHzKMd34yHk4aWV6nEbxfhW2RX/Stz/W5JdtCV4NjoLUPAScPVHOrsULiaUZ2u2jxadhkPJw0tr3IJmfTo289lJxMYIgHCz9PxFbIvEziGgJOGY2jNY5sdCvMofXOUmEfLOePhpKHl5ZIJmECRgJOGIqjJzLJDYTK5u8sxjxZxxsNJQ8vLJRMwgSIBJw1FUJOZZYfCZHJ3l2MeLeKMh5OGlpdLJmACRQJOGoqgJjPLDoXJ5O4uxzxaxBkPJw0tL5dMwASKBJw0FEFNZpYdCpPJ3V2OebSIMx5OGlpeLpmACRQJOGkogprMLDsUJpO7uxzzaBFnPJw0tLxcMgETKBJw0lAENZlZdihMJnd3OebRIs54OGloeblkAiZQJOCkoQhqMrPsUJhM7u5yzKNFnPFw0tDycskETKBIwElDEdRkZtmhMJnc3eWYR4s44+GkoeXlkgmYQJGAk4YiqMnMskNhMrm7yzGPFnHGw0lDy8slEzCBIgEnDUVQk5llh8JkcneXYx4t4oyHk4aWl0smYAJFAk4aiqAmM8sOhcnk7i7HPFrEGQ8nDS0vl0zABIoEnDQUQU1mlh0Kk8ndXY55tIgzHk4aWl4umYAJFAk4aSiCmswsOxQmk7u7HPNoEWc8nDS0vFwyARMoEnDSUAQ1mVl2KEwmd3c55tEizng4aWh5uWQCJlAk4KShCGoys+xQmEzu7nLMo0Wc8XDS0PJyyQRMoEjASUMR1GRm2aEwmdzd5ZhHizjj4aSh5eWSCZhAkYCThiKoycyyQ2EyubvLMY8WccbDSUPLyyUTMIEiAScNRVCTmWWHwmRyd5djHi3ijIeThpaXSyZgAkUCThqKoCYzyw6FyeTuLsc8WsQZj2HSgA3BHzPwHPAcWJsD2GD8MQPPges1B9o0oi0Nk4bWzCUTMAETaAkgmbiuV/bV1lWO+zrHdsq4mEdLLePRXfXXeTNo8bhkAiZwKoHrvE9kG+epzGZod51jO4WvebTUMh5OGlpeLpmACRQJOGkogprMLDsUJpO7uxzzaBFnPJw0tLxcMgETKBJw0lAENZlZdihMJnd3OebRIs54OGloeblkAiZQJOCkoQhqMrPsUJhM7u5yzKNFnPFw0tDycskETKBIwElDEdRkZtmhMJnc3eWYR4s44+GkoeXlkgmYQJGAk4YiqMnMskNhMrm7yzGPFnHGw0lDy8slEzCBIgEnDUVQk5llh8JkcneXYx4t4oyHk4aWl0smYAJFAk4aiqAmM8sOhcnk7i7HPFrEGQ8nDS0vl0zABIoEnDQUQU1mlh0Kk8ndXY55tIgzHk4aWl4umYAJFAk4aSiCmswsOxQmk7u7HPNoEWc8nDS0vFwyARMoEnDSUAQ1mVl2KEwmd3c55tEizng4aWh5uWQCJlAk4KShCGoys+xQmEzu7nLMo0Wc8XDS0PJyyQRMoEjASUMR1GRm2aEwmdzd5ZhHizjj4aSh5eWSCZhAkYCThiKoycyyQ2EyubvLMY8WccbDSUPLyyUTMIEiAScNRVCTmWWHwmRyd5djHi3ijIeThpaXSyZgAkUCThqKoCYzyw6FyeTuLsc8WsQZDycNLS+XTMAEigScNBRBTWaWHQqTyd1djnm0iDMeThpaXi6ZgAkUCThpKIKazCw7FCaTu7sc82gRZzycNLS8XDIBEygScNJQBDWZWXYoTCZ3dznm0SLOeDhpaHm5ZAImUCTgpKEIajKz7FCYTO7ucsyjRZzxcNLQ8nLJBEygSMBJQxHUZGbZoTCZ3N3lmEeLOOPhpKHltWvpqaeeWm7cuHH4PPLII7v2dY7zl156abn77rsPOqF5r0v7uf3225cXX3zxDV2RGfTAfuvr2WefXW655ZZDrPfff/9R7qEXujGmbEu9qNuT3VFCdzJ20rAT2J3dZofCzt1P59482iHJeDhpaHmVSzgwjj3E9ECZOWnQg7R3WD///PNlTmuGlaQBhzETrT0OYY2VB/+aZn3npKG7fSii8jNZavKoY8M5wDsSPbzH1bM7d31lG2cWGOOhXt7jHNM9ATY93dGmtyYzPfr+3NjU1+hZ4+/p5XsdR/UVYya/PfaArXhQcy9eja03XxlfjwfmBN7HuUOf7Jc+zmWU8eiu+uv8FQRBn3rnIaabW9WXDm5vc6j62dtOD3NOQC7ytcl7rC7tZ8STzLKFeGzftNcFPFqUtI33HhPqBSeyi+2uS3nLfeKYdQVbzgfOIWXNMThnjWUbZzaGmFe33XbbRWLTs4c+PSQ4F1V3tOGcY/w9v1ndubFl/jmWOibahuODNaLxqw3iPidG9ZU9b8GDMSOmU3XrvIZmzm34xAfv40WWZB3L0b5Szng4aahQFBtOjtEhJ6ZveOSAYgLoxvAGwwkruFmNJu8pknVRnMLzlD5jG27Up8TVY6JjzIUc+7wu5a2SBjK78847Dz/uAdfRxfHK1k/cgEf+RvXZxjlqx3rEtDanOXdiHCizHddHPCzge3TYsv+1+7mxrfnOuGtMiHUUB/zEuNf6PefduTw4Jx9//PFDwnBK0kAfOh84zpxLkYey1PizMVDb3nPGY5ekAaKxCesHgfMiIEwYAqEtwQAe67iI2B53Ljra4K7AYUMdOjG1XewL/Tz22GMX/apPDpD2h+eeNurUGKDhwQcfvPCtWnu+lRf9oC/Uwxd19Caoxkg77a+nD3bkpO3BiONFX7yTH/xFmx4X9Qsf995772GR4blnD7+MndpQx3FF7MoUfpQb49Q73lM/7mhPnhqP9k37qFHjYVv1Ty298dV40Bf5sZ4x0gc5UAvtNLa159dee23BZ8tri6SBbBAvYoyMo96KDdrAX+Yr+tZytnGqbe8Z49Zbm7TF+94Yoh5jjLuyYTvcqwy0jT6fG5v60udRTGqjz4ijxwA2nA9qv9fzVjw4XmvjPophbUy5z4CJXtwzwF2vY8dB2+I547F50gDB3NjincEx2Ph+rawDsdaH2gEyfOrE5ACgnoOAAVvrG+85IaLdaGNi39GeZfjEpXr4jnfyyvRpzFU2PZ+MRTUhjtF4kd+oT/pDnCMfjFVtD2Be/w916hhmbMlN/eCZvthnvDOe0VjTnv4jJ/ShLGg36ldjUj74ilv76rUf8Yoxo/yHP/xh+dCHPrR8+tOfXr773e82Jnj3hS98oamrFrZIGhAbOeB5LS7yhl12YSx1XWT28X22cUb7WIbGtf41bm3LecAYOZ84N+N7bVt9Pje2UT9kXk3kRwy4/shg1N9W9VvxoO61ce9pzuY133MO0MeIH+cI9x/aV+8Zj82TBoB7+umnL/QxYGyChKl13CQYqG6WHATUcWPptUVnAKpttY5tUaftOQhcmKpR9VC3+qRu1MUra4t+uCCoWzWyjv329Ckb+IONxqb66I922pZ9IAb+gqP6IaNeHdpoPX1pXYyTGtBWOale5Yn2aKN8WId66lNGrFM/qkn76vnSOjxHrb042afqwDMu9P3cc88dnqMvtlN9iIufJ5988rBuUGa/8MGxunA6eHjllVeWT33qU8tvf/vb5dvf/vbyjne8Y0EdrldffXX50pe+tLznPe8ZtF6vPjdp4PiTE1jr2MTe8V7nQXzPMlly7Fh/zD3bODNfGFeOIe4xLs4Txk5/rFftjIf+Yhu2rd7Pja3Xj2pU7XiG7p5mvOuNp/pizFwnvb7PrduKB/dVXacVbSMObEsekQHaxXmFNlxXeH/KlfHYPGmASAbJAeedAep7giBw2NIOvhA46ji5uKhQp1AICvX0ibu2jdpopz45uUd66FM1xoGhZvRNf7DRfmDT46B2vZjVX4w5+qeuaId6xgGNMZaerl6dao2x0j8W0AsvvHDoAza6oEaMqRt3siSLUZ3q0z7oq8pmTRNjohbtE+9waT+jsQIHfqhVfdE/tbNftIljRZvR/ec///nymc985pAgfPjDH17e/e53XyQN//znP5e3v/3ty1e/+tVR89X6c5IGciY3dISxHsVHPmo/EgebkZ9Rm1ifbZzRfq3MWDF+nBOsU52MUe04/9mOZc6btX5H77aMjX1QexwfxtnTi1jiXKc/vXP/Ulb6/tznrXisxTrSOOKm9iOb0XohL84Z9VV5znhsnjRAKDfEeOegEwLec5IROOp0gnGRcHKpf7zjpT7ZHr7hj21hq3bsW30StOqhbrSnT62jBt6jZtZrP7BRLZEVy2ij7agPPjk5YAtdapex6fVNbvqOjHp10KB9UrPewelPf/rTRdJAf2g7YkxeuPdY9upUH+NQP6pzjeGaJvaL+OBD+2RcvX60nbLBM7X2fFG/vmN7tqPN6P7EE08sv/jFL5af/vSnh7XwzW9+88L0Rz/60aHu4Ycfvqg75uGcpAFM4hrq1VEPuOo6Zn28w0fFLraL5WzjjPZZmWOo46ZzDeMKHvidKurn+kZMenGO4X7KtXVs0MD4ola8w9qIY436Y8aKMff8n8JA22zFg+OpY6z99J4r85psucfQz4gf581e82PTpIHQuAAQLC4Eq3WEgDqC0LYKHWBgx4XEyYM6nUAEpT7ZL9tCS69v9UnQqkcnPH1qHQeRd2qGFvrDO+0HNqoFtr0P2mg79acxw5/aZWyoVX2g/6iL46NaWRdj6ukHJ00adGxHjKkNd+iBXx3DXp3q0z7oq8pmTRPHnlq0TzLRfvCsNtSlfbBO7eiL2nnvjRXfrd3xC5DU/stf/vJgih9N3HXXXQe2zzzzzFrz4btTkwaNvzdnUKcMaK91PVHgzbHpvT+mbquDRPuEfo631uszbBgn5xLuenGu6BrX99nzHrGtjRHi6e2X0F8dr3NjXmOyFQ8yyMaYWmjP8WZ9vDP2aMf9IM6Pc9dBxmPTpIHBYdETnNZx4mgdQRCgtgW8eEBoW/qDHfxwAyJEtkU9F5jWsW/Yx7aqp9fP2mTnYGos6k/1UDd5xQmDsuqjXfQHm2PYkBH8azvoieVoQw2xnoxRHy/GidjZt8aljLUtx0t59+pUs+qjL32vfakuPOOifx2n3piqT7bVmPCs7WijddTa80Xt5IVytNN5oHGxLe5IED75yU8u73rXuy5+NIG6W2+9dfnABz5weK/21edTk4aRf3DvxUCmyiH6wDudI/H9seVs4zzWH8eNc6DXPsbAeRLjZj14nXJtHRs1ILY4fpyfvbihvzpmYKB7B/vc4r4VD8bKNZ1pq8Y0mjujerCuauhpzHhsmjRAAARjcHsfTigGCxtOJgJHnQbMDVwnF2H3+qA/aOHi6tlp3+oPz7hUD3WjXm2j1kPD1/+zxgHtuODXNDKW2GeMh3Y9fWpLO41N3+MZffXGB75jTIyBYxR90R/arsUJO2X8OsLDjb51/Ht1qlnnT89XTyfqKnxUh/bJtjpWeF5jjT6ptecL2tfaw79yRbl34TsN6OujH/3oxT+7/P3vf7+87W1vW+65556Lul7btbo3I2lg/OTU00Pmo/h7bbK6bONca4+x1F98ZQw6d2J7ri2NodeOdaP1Ev32yufE1vPHOs5hrgXUY62O4h69Azv44sU5vjYHaHvKfSseHJueTjBRDmu2MYYeV9rEuR/LtDvmnvHYPGkgDG7MmNwPPPDAYdPiRCeE0Uat0HsHBABwIrEf3GEbL0KkHWy4QNmP2uAZl8ZB3fTN9vBJH3ynd7XDhIFv+IpatS/qVN+qT/+uQPTDvjM2yp/96YTW9/8g1iYAAASnSURBVIiBl9bHvnt9ZjbwzfGNjNkn36u+Xp1qWxsTtmXc/IMsKGus6F/HD++jRu2TbXWsOJfUDn6gD3+jgs8Yf7WhL2jQetjjoyzYX9RGfrgjabjjjjuWd77zncuf//zn5eWXX14++9nPHnz9+Mc/VtOjnt+MpIHjRZZR4GjekdWoXfQTy9nGGe21TM3UgHtvTqqdjrn6wnOch2u2sW2vfE5sPX9aF/eytXmJ+HUuw09sT4aw3evaige1x7HmGtZx49hX5mevvbLgHkBWFZ/aPj5nPDZPGqIAl88noJPi3Alxvhp7mIkAD5RsU/373/++fOUrX1luuummw583xgaDf0nxr3/96+Rwtk4aThayQ8Ns49yhyzfN5XWO7RSIe/NAYpv9SfFTdO/VJuPhpGEv8hv6ddKwIcxr5IpfZcevbGKIjz766PKTn/xk+e9//3v4/QX8jQckDffdd9/JP5pAH04aIumrUc4OhasRxXYq9+aBxF6/y7Cd8n08ZTycNOzDfVOvTho2xfmWcobEgt9VwB91wi9AfuMb31huvvnm8h+IGgFz0jAiM3d9dijMrX57debRMs14OGloeU1ZctIw5bBcCVFIFJAg4Hc38Ncl8bsNn//85xf8IuS5l5OGcwleTvvsULgcVZfXq3m07DMeThpaXi6ZwLUj8NBDDy34/1ngF5L/9re/nfxPLCMYJw2RyNUoZ4fC1YhiO5Xm0bLMeDhpaHm5ZAImUCTgpKEIajKz7FCYTO7ucsyjRZzxcNLQ8nLJBEygSMBJQxHUZGbZoTCZ3N3lmEeLOOPhpKHl5ZIJmECRgJOGIqjJzLJDYTK5u8sxjxZxxsNJQ8vLJRMwgSIBJw1FUJOZZYfCZHJ3l2MeLeKMh5OGlpdLJmACRQJOGoqgJjPLDoXJ5O4uxzxaxBkPJw0tL5dMwASKBJw0FEFNZpYdCpPJ3V2OebSIMx5OGlpeLpmACRQJOGkogprMLDsUJpO7uxzzaBFnPJw0tLxcMgETKBJw0lAENZlZdihMJnd3OebRIs54OGloeblkAiZQJOCkoQhqMrPsUJhM7u5yzKNFnPFw0tDycskETKBIwElDEdRkZtmhMJnc3eWYR4s44+GkoeXlkgmYQJGAk4YiqMnMskNhMrm7yzGPFnHGw0lDy8slEzCBIgEnDUVQk5llh8JkcneXYx4t4oyHk4aWl0smYAJFAk4aiqAmM8sOhcnk7i7HPFrEGQ8nDS0vl0zABIoEnDQUQU1mlh0Kk8ndXY55tIgzHk4aWl4umYAJFAk4aSiCmswsOxQmk7u7HPNoEWc8nDS0vFwyARMoEnDSUAQ1mVl2KEwmd3c55tEizng4aWh5uWQCJlAk4KShCGoys+xQmEzu7nLMo0Wc8XDS0PJyyQRMoEjASUMR1GRm2aEwmdzd5ZhHizjjMUwasCH4YwaeA54Da3MAG4w/ZuA5cL3mQJtGtKVu0tCauGQCJmACJmACJmACy+KkwbPABEzABEzABEygRMBJQwmTjUzABEzABEzABJw0eA6YgAmYgAmYgAmUCDhpKGGykQmYgAmYgAmYgJMGzwETMAETMAETMIESgf8Hj9THHJzXCWIAAAAASUVORK5CYII=[/img][/size]
Express every number between 1 and 20 at least one way using exactly four 4’s and any operation or mathematical symbol.
For example, 1 could be written as [math]\frac{4}{4}+4-4[/math].
The table represents the relationship between the base length and the height of some parallelograms. Both measurements are in inches.
[img]data:image/png;base64,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[/img][br]What is the relationship between the base length and the height of these parallelograms?
[size=150]Visitors to a carnival are invited to guess the number of beans in a jar. The person who guesses the correct number wins $300. If multiple people guess correctly, the prize will be divided evenly among them.[/size][br][br]What is the relationship between the number of people who guess correctly and the amount of money each person will receive?
[size=150]A [math]\frac{1}{2}[/math]-gallon jug of milk can fill 8 cups, while 32 fluid ounces of milk can fill 4 cups.[/size][br][br]What is the relationship between number of gallons and ounces?  If you get stuck, try creating a table.

IM Alg1.2.3 Practice: Writing Equations to Model Relationships (Part 2)

[size=150]A landscaping company is delivering crushed stone to a construction site. The table shows the total weight in pounds, [math]W[/math], of [math]n[/math] loads of crushed stone.[/size][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAXgAAAFGCAYAAABg7YR7AAAgAElEQVR4Ae2dPbLcyNG1b8TrfnvhLoZb0A64gtkAFyB/fC6A9kTIoy+ZlExJJmWK7v0iqTmX2dUF4OC/gHoQcYVuICt/nso8jdvkUC+vHBCAAAQgcEsCL7esiqIgAAEIQOAVgacJIAABCNyUAAJ/042lLAhAAAIIPD0AAQhA4KYEEPibbixlQQACEEDg6QEIQAACNyWAwN90YykLAhCAAAJPD0AAAhC4KYFBgf9///fyyg8M6AF6gB5otwemPpdGBX5qMfchsCWBEBIOCEDAI+DMy+BEOYu9NLCCgEeAnvM4YQWBIODMCwJPrzRDwGnYZpIlEQicTMCZFwT+5E0i/E8CTsP+tOYVBPom4MwLAt93jzRVvdOwTSVMMhA4kYAzLwj8iRtE6EcCTsM+ruAdBPol4MwLAt9vfzRXudOwzSVNQhA4iYAzLwj8SZtD2GcCTsM+r+IKBPok4MwLAt9nbzRZtdOwTSZOUhA4gYAzLwj8CRtDyDoBp2HrK7kKgf4IOPOCwPfXF81W7DRss8mTGAQOJuDMCwJ/8KYQbpiA07DDq7kDgb4IOPOCwPfVE01X6zRs0wWQHAQOJODMCwJ/4IYQapyA07DjHrgLgX4IOPOCwPfTD81X6jRs80WQIAQOIuDMCwJ/0GYQZpqA07DTXrCAQB8EnHlB4PvohUtU6TTsJQohSQgcQMCZFwT+gI0ghEfAaVjPE1YQuD8BZ166EPhPnz69vry8vL579+7169evze688oxcP3z48Pr9+/eHXHX/6Do+fvx4CD+nYR+A8AYCHRNw5gWBb6RBJN4h7gh8I5tCGhBomAAC/8fmSDyPfvJ1e+Pbt2+v79+/HxR2+TmrDp7gtQOcIdAOAQT+j704SxjdVoivjeLDJ57cQ0yHjrPqQOCHdoTrEDiPwGkCLyGKp9LPnz//EC599RD3dAw9uX758uVtTbyOQyITZ/kPn3oqz77ieo4j+7ANf3paHhLULLhhE/bhX0fORba178xlr/jhq/SXa9X9OKtu+Yiz/Khm3Strj/W5/rBTnjlGLef43j+uyy5e//rrrz/e57ilXdjX/ClH5+w0rOMHGwj0QMCZl12+g5cQSSTKs8QnC1MWhyx6EjqJaulr7L3WTuUTvnXk2Nl3Fnnl8ssvv7w9eef85asmgtlnxBqKp9zlK86qIwvt0PqIo5zG8pBN+M/7kfPUa8Ud8pc55rzd107Dur6wg8DdCTjzsovAZ9GRgOQnSF3LgqJrsSl5vYRO4hZiow8ICW0Ws7xWgpPX6lqOLeHK15RPvqa42Z/ET/a5qbKd1tY45GvKL/vRa/mr5Vv7AIrcxO/vf//7w28h8pVt8jXlm+tX3Jyv7EL0w3bN4TTsGv+shcCdCDjzsrvAS2DyU5/EKItHFsgs0lov8ZHIxEZlOwlN9imxrK2trc/+FDfswk/+EJG/uKYYZePU6pWN/KmWLJhD/mKt4mpdzlf1h92QP62PvPNPXJ+Tb2Y8xkD1umenYV1f2EHg7gScebmNwEuQs/hILCVsEkZtfCmQ+X0WQL3WB9OQP/mN85hgan34jZhDgpz9xWutUx0537inIzOID87//Oc/D9+rqx6dY23ON3/Yhs/yAymu5djZj3JYcnYadolf1kDgjgSceUHg/3iaDcGqiZbEK85bCXwpmFsLfOkv16UPgmxTCrzq1FCU+ep6nGOtGOmDJ9+f89pp2Dn+sIXAnQk483KqwOenRolDvhbCEeIUh4REdnEtC5fs8tNr+QQf/nQt28lnviYhrDVILZcxu4grf1lY9aScrym/MX+1fLMoS5DFT/nqffjO15Rb7VrOLceN7/R11PZB9+acnYad4w9bCNyZgDMvpwp8wM+iEgJU/ki4ZSeRibU1YckiLbHU2tK33sd9HWO2Y7lofT6XH1aKF+dcRxZR5Zz96LVyy2szg+w/XstX9l/axHvVn9nV7BR3yF/+kFHOc85Ow87xhy0E7kzAmZfTBT42ID9xhoiEaIVYZPGZEjeJbxYpCZz8x1l+JGBalxthSMAkhPIhwctra68VXzFLIczxlHPNz1DcvF4xlKv8lB8Ef/7zn58Yh23mF77it4zff//9x16o3tKX7OIDbc3hNOwa/3utzR/k+q1sr1il3xy71sulfX6f126Vt3pjK38536u8zlzLWd+yBmdedhH4LYvAVz8EnIadohEfUDFga45//vOfs5bngT5a2PKH+9zYS/Me45MfZuZ+4MyC3rBx5orAN7xRpHYsgTUCL2FZOlBZKMvffqYo5IGeK7JTvqfu59hzBTWvncrb5cMT/PjfoJvazzn3nXnhCX4OUWx3JeA07FACvQr8EA/n+h4C78S9u03muvSBw2HkzAsC75DE5hACTsOWieRh0p8/xLkcLH0AyCY/seqpU/d01pN87X7405FzyH51P6+Xz7xGvvK1nH+Zu3yE//xnJvKjuGGnWuL822+/vf3TGpFTjhd5689awjbHz/lnfzmPMqb+vCbnF/EjjnzkGFqvc14XcUoGkVN5lPWW/vNvIZmV1i3NOecatcW/3aQ6cw6lXdjmPMp6pt4784LAT1Hk/mEEnIYtk8kiJeGIswarNlSy00CPCdjYeg1nzqEm8LX72a/W5GshOnmdctY57seR1yifuC7Rkn15LgW+vB/vxXCMT7kfiiu2Ob+xGKWfqXXhSyI/xinbLRH4qZyzzzHboXq0j2X9zntnXhB4hyQ2hxBwGnYokRC3GDCJkux0PQ96FiyJYh7Ucuj++te/PvzBrXxKxLLASKwVX2etUX6RQ6yPf7BO15SD/Eosc+66pjVZOGq1KJ+co/zla4oZ+SpX2cU15RbXSj6qMc7KT/5yjOyvFiP7GVqX9061KWbOLecru3xNrNbmXKsjx9E+5bzjdRxRY+zf0sOZFwR+KV3WbU7AadihoBo0DVTYZfHTkMf1LB6yz0NZEzD5DxHJPzGs2V+Ok3PVgEv4IkbEjr+uKuGTTVz/97///fZrfvaZ8wz7XKNEKwte2Ogorw/lrTyGBLPGp4yhOufEkI84D62Le9qLiPG3v/3tjZP2Un6yXXDL7MQqbMVlbs6Zfd6jnLtyyrEzV+W65OzMCwK/hCxrdiHgNOxQYA2zBirshgYw7sleQ50HMAtY9pGFXa9DDPNA50HPuWY/8V132MWPvveOmBKayC37VKzyHPbZr0RLflSb8tD18DOW910Evqw377FYBRvZiVdmn/ez5FJjH/7y+tyPipP3MXwuPZx5QeCX0mXd5gSchh0KKsHOA5UHMA9qbQDz8Mcg6shDqWHMgx6vs78cRz50Vo76j8zivXLMfzBX+syCkF9Hblof1yVatZwjh/L6UN65vlgTxxAf1aazYswVS63XeSi3uC+Osdf5N52899lOueQaxCrsluac2ed9z7mXOeW8Ys9q98PGOZx5QeAdktgcQsBp2KFENPQaZtnpegxTCFccWcA06EPDr/XZr67JZx7oPOjKQWcJif6PYrKQ/+lPf3qNnzzwss/X5EvnLDKqJdenfHKOU3nn9ZFDHEN8lIfOylm8clzlEra1GPIR57xO+Zbr5E8xw66Wr+wyKzHN15bkXPZCmaPi/Otf/3qNHx3KWTF1fc7ZmRcEfg5RbHcl4DTsUAJZMGLQa0Md1/OPhi98loISduGz9JvXyyavVdxanlkk82BnkZBIx/osPmVcxck2eW32Wa6dyjvXLMHMNcpf2JVHKVx5nXKONbUY2Vdep3j5nPmN2Wa78D/GRbbZ31TOeU9zfnqtHsv16l6cs/9cv/PamZfTBT43aBRcaxqn2L1shjZ763hqPDXZ1v6v4M9p2LE6xLAcnLyHGq7aYJXDql6UaGnt1N8nj3i1I+ehwQ+7PPwS1Lw+16UctD7PT9jlI6+LeiPvWK8ey/lkHkP5DPHJMcVqaQz5KnPT/y9w5K/aZatzrnfILvuVTdQb+cb7eJ1tlnCJPMRBuep9xNBPuV+qwz0783KqwOfmVNEBuKVjaLO3zlHNqcFY43/s3wpZ43fvtU7D7p3Dnf1LZLbosb05HTV3e9exp39nXk4VeDWcPjn3hLHU91GNtlbg89NVcL3i4TTsFes6I+fy/4M390d+Kj0jNyfmUXPn5NKqjTMvpwr8WlE7AvxRjbaWRR5gBP6Izmg7hvpJvxnnc2u/JddIHjV3tdhXuXaqwGfBUXOpsfLm6V6cx54sYm221a+Z+i0g1safUsd3XvHzj3/848e59Jv9KJ/YUPlRDPnPuUYM/b3lsNP3a7khsr185ThhW9qEX33HqLjZp17n3LPv2vW4n4W+rK/MPe/X58+f39iFn9q+ZPuwKf0p5zlnp2Hn+OvVNvpL/wGV+mSrPTqKaZ6RWv8dlUfLcZx52eUJvhST3GTxZJE3L9+rbeSQrQRFsUIY46+fqZHnCLx85Fzkfyi+bGUXjVD7MwXZSeTHbMJ2SOBrIi7b2r3wFXVN5a+8SsFW3jrnvRmKl1ksGQynYZf4ZQ0E7kjAmZfNBT4LhUQhi4xEKYDr18h8rdyILL5hXx41sQmhcQU+56Z8I4b+oDLfz3kq9xBAiaSu1ezkO9cTr+PIop/X5lrlO4torIv84sjc5Teu1+JlW+VVy6FWe7arrc2xc/7Oa6dhHT/YQKAHAs68bC7wWVAkfAE7C7FEQKI1JGpZYLKw5c3LfiU4cb8mRGUeyk95hFiXcXIO2X+OG/XkeOFPh+yixr/N+HcztF7nzLXGK4u2+Obcy7pUs3wN5Z/jRi2qJ3+wRY7ylxkpd/fsNKzrCzsI3J2AMy+HCXwWIAmgREEiU25IFqgh4RgSnCxYeW3NPtuWX0kM5ZD9lAIvH+X5L3/5y4/vs+N6zinqnsNCfrNoZ76OwJfCnRlofyKv0i7XrTzyOedU7ufUe6dhp3xwHwK9EHDm5TCBz8IgAZojakPCkf3Gax1ZsLKYDtnHuiySIVqR514CX9YzxaJWV+QoMc65i2/OfSpe5iWfEROBF3nOEGiLwCkCn4VGwpqFJj+tO6KWBUb+MuYhwa7FzNdCHPWBoHP4LYUur8nxc1wJqurJdjnXeJ3r0brMLPPJa/O/SV7LKfsYEuhaPOVa1q3YOd+oOdvJn2zXnp2GXRuD9RC4CwFnXjZ/gg94WRTyr+96KhZgCeKQqIVdFpTsS0+kWWizUE/lIYHPYpn91+5LDMN3jiuhyyJb+pLoDtUj+yEWYiU7nRW7VkfkWLuutTlWzku5lgzFd2x/ZRNr5x5Ow871iT0E7krAmZddBD6AZgGUoJTDL9HKQjO0GbKVL63JcUr/4SuvizVhEx8O4SeEKgtb6TvWZ4GcEvjSXv7inNeWMeOe/n696soccg7ZZ1lv+QGT72cO4UMfkIqTcwpbHVnMs78ylvLSB47Wzzk7DTvHH7YQuDMBZ152E/g7g6W2fQg4DbtPZLxC4HoEnHlB4K+3r7fN2GnY2xZPYRCYScCZFwR+JlTM9yPgNOx+0fEMgWsRcOYFgb/Wnt46W6dhbw2A4iAwg4AzLwj8DKCY7kvAadh9M8A7BK5DwJkXBP46+3n7TJ2GvT0ECoSAScCZFwTehInZ/gScht0/CyJA4BoEnHlB4K+xl11k6TRsFyAoEgIGAWdeEHgDJCbHEHAa9phMiAKB9gk484LAt7+P3WToNGw3MCgUAhMEnHlB4Ccgcvs4Ak7DHpcNkSDQNgFnXhD4tvewq+ychu0KCMVCYISAMy8I/AhAbh1LwGnYYzMiGgTaJeDMCwLf7v51l5nTsN1BoWAIDBBw5gWBH4DH5eMJOA17fFZEhECbBJx5QeDb3Lsus3IatkswFA2BCgFnXhD4CjgunUPAadhzMiMqBNoj4MwLAt/evnWbkdOw3cKhcAgUBJx5QeALaLw9j4DTsOdlR2QItEXAmZdRgQ8H/MCAHqAH6IE2e2DqI2dQ4P/73/9OreU+BDYlQM9tihNnNyfgzAsCf/MmuFJ5TsNeqR5yhcCeBJx5QeD33AF8zyLgNOwshxhD4MYEnHlB4G/cAFcrzWnYq9VEvhDYi4AzLwj8XvTxO5uA07CznbIAAjcl4MwLAn/Tzb9iWU7DXrEucobAHgSceUHg9yCPz0UEnIZd5JhFELghAWdeEPgbbvxVS3Ia9qq1kTcEtibgzAsCvzV1/C0m4DTsYucshMDNCDjzgsDfbNOvXI7TsFeuj9whsCUBZ14Q+C2J42sVAadhVwVgMQRuRMCZFwT+Rht+9VKchr16jeQPga0IOPOCwG9FGz+rCTgNuzoIDiBwEwLOvCDwN9nsO5ThNOwd6qQGCGxBwJkXBH4L0vjYhIDTsJsEwgkEbkDAmRcE/gYbfZcSnIa9S63UAYG1BJx5QeDXUmb9ZgScht0sGI4gcHECzrwg8Bff5Dul7zTsneqlFgisIeDMCwK/hjBrNyXgNOymAXEGgQsTcOYFgb/wBt8tdadh71Yz9UBgKQFnXhD4pXRZtzkBp2E3D4pDCFyUgDMvCPxFN/eOaTsNe8e6qQkCSwg484LALyHLml0IOA27S2CcQuCCBJx5QeA32tivX7++vnv37vXl5eXHz6dPnzby3I8bp2H7oXF+pR8/fnzr5/fv379++/bt/KTI4I2AMy8I/Buu5S8k7hL18v1yz32tdBq2LyLnVRvinkW9fH9eZkQWAWdeEHjRWnGO5v/w4cPr9+/f37yE2OcBebvBi0ECTsMOLubGZgT0gPLly5c3n/H0Hv2sh5i3G7w4jYAzLwj8yu0ZavzakKwMdfvlTsPeHkIDBQ49nNQeZBpIt9sUnHlB4Fe2RzzlxPfu+WknXA4J/8pwt17uNOytATRQXPwWGr+Nlr+RRmpDwt9A2l2m4MwLAr+yNULY4w9X44k9HxL4eOrh8Ag4Det5wmopAQl8rW9D4Gu9vjQW69YRcOYFgV/H+MeTe63pJfB8Z+kDdhrW94blEgJTAs+fKy2hus8aZ14Q+JXs+YpmJcC03GnYZM7LHQhI4PmKZge4G7t05gWBXwl96EmdP2SdD9Zp2PleWTGXwNB37fwh61yS+9o784LAr9yDoSeeoSFZGe7Wy52GvTWARoqr/VY69CDTSMpdpuHMCwK/QWvoaV3ft5fvNwjRhQunYbsA0UCR8bSev28v3zeQYvcpOPOCwG/UJhJ1/qmC5UCdhl3unZVzCYSoq5+z2M/1g/0+BJx5QeD3YY/XBQSchl3gliUQuCUBZ14Q+Ftu/TWLchr2mpWRNQS2J+DMCwK/PXc8LiTgNOxC1yyDwO0IOPOCwN9u269bkNOw162OzCGwLQFnXhD4bZnjbQUBp2FXuGcpBG5FwJkXBP5WW37tYpyGvXaFZA+B7Qg484LAb8cbTysJOA27MgTLIXAbAs68IPC32e7rF+I07PWrpAIIbEPAmRcEfhvWeNmAgNOwG4TBBQRuQcCZFwT+Flt9jyKchr1HpVQBgfUEnHlB4NdzxsNGBJyG3SgUbiBweQLOvCDwl9/m+xTgNOx9qqUSCKwj4MwLAr+OMas3JOA07IbhcAWBSxNw5gWBv/QW3yt5p2HvVTHVQGA5AWdeEPjlfFm5MQGnYTcOiTsIXJaAMy8I/GW3936JOw17v6qpCALLCDjzgsAvY8uqHQg4DbtDWFxC4JIEnHlB4C+5tfdM2mnYe1ZOVRCYT8CZFwR+PldW7ETAadidQuMWApcj4MwLAn+5bb1vwk7D3rd6KoPAPALOvCDw85hivSMBp2F3DI9rCFyKgDMvCPyltvTeyToNe28CVAcBn4AzLwi8zxPLnQk4DbtzCriHwGUIOPMyKvDhgB8Y0AP0AD3QZg9MfRqNCvzUYu5DYEsCISIcEICAR8CZFwTeY4nVAQSchj0gDUJA4BIEnHlB4C+xlX0k6TRsHySoEgLTBJx5QeCnOWJxEAGnYQ9KhTAQaJ6AMy8IfPPb2E+CTsP2Q4NKITBOwJkXBH6cIXcPJOA07IHpEAoCTRNw5gWBb3oL+0rOadi+iFAtBIYJOPOCwA/z487BBJyGPTglwkGgWQLOvCDwzW5ff4k5DdsfFSqGQJ2AMy8IfJ0dV08g4DTsCWkREgJNEnDmBYFvcuv6TMpp2D7JUDUEngk484LAP3PjykkEnIY9KTXCQqA5As68IPDNbVu/CTkN2y8dKofAIwFnXhD4R2a8O5GA07AnpkdoCDRFwJkXBL6pLes7Gadh+yZE9RD4ScCZFwT+Jy9enUzAadiTUyQ8BJoh4MwLAt/MdpGI07BQggAE/kfAmRcEnm5phoDTsM0kSyIQOJmAMy8I/MmbRPifBJyG/WnNKwj0TcCZFwS+7x5pqnqnYZtKmGQgcCIBZ14Q+BM3iNCPBJyGfVzBOwj0S8CZFwS+3/5ornKnYZtLmoQgcBIBZ14Q+JM2h7DPBJyGfV7FFQj0ScCZFwR+w9748uXL68vLy+uHDx9ev3//vqHnPlw5DdsHifVVRv9FH0Y/6sfpS/Ww1sT78vj69evru3fv3vx++vSpNHl1bJ4WcWEWAWdeEPhZSIeNP378+NbwziANe+r3jtOw/dKZV3mIbvSkjm/fvr2+f/9+9OFD4i5RL9+HLwm3RL1879ooL87LCTjzgsAv5/u2Uk3++++//xggBP4NzawXTsPOcojxA4EQ7Hjyjn4tDz3x5w+FsIn3uZ/L92ETYh8fHvEhUltTs/lhyP+sIuDMCwK/CvHjYg1JHohHC96NEXAadmw998YJ1J7ItUIPKXp61/X8oaDfAvT0Lpu81rHROs7rCDjzgsCvY/ywGoF/wDH7jdOws52y4I1AFuu3i3+8CNGuPd1n8R76gMii7tiUsXm/jIAzLwj8MrbVVQh8FYt90WlY2xmGTwRqX6/IqPyaRdcl8HF/6ANCAh/+HRv55ryOgDMvCPw6xg+rEfgHHLPfOA072ykLfhAYerIWnimBj/VT4u18CIQNxzYEnHlB4Ldh/cMLAr8OptOw6yL0uTo/hQ8RCOHlK5ohOm1ed+YFgd9w7xD4dTCdhl0Xob/V+vpk6slZHwLxlJ6P/NQ+5CuvdWyyf14vJ+DMCwK/nO/TSgT+CcmsC07DznLYufGQ2NawyDa+R89H/t5+qL/jw0N/TdKxyf55vZyAMy8I/HK+TyuHmvvJkAtVAk7DVhdy8YnAkGBnw3g6j/9iVU/3eq+n+PJ9rNXTutaU712bnAevlxFw5gWBX8a2ugqBr2KxLzoNazvr2FB9qH9uoDzrKT3OevIWLom61kjsdT/OEnXZSOzn2mR7Xs8n4MwLAj+fKyt2IuA07E6hu3OrD4GaOHcH46IFO/OCwF90c++YttOwd6z7jJriybx8ej8jD2IuJ+DMCwK/nC8rNybgNOzGIXEHgcsScOYFgb/s9t4vcadh71c1FUFgGQFnXhD4ZWxZtQMBp2F3CItLCFySgDMvCPwlt/aeSTsNe8/KqQoC8wk484LAz+fKip0IOA27U2jcQuByBJx5QeAvt633Tdhp2PtWT2UQmEfAmRcEfh5TrHck4DTsjuFxDYFLEXDmBYG/1JbeO1mnYe9NgOog4BNw5gWB93liuTMBp2F3TgH3ELgMAWdeEPjLbOf9E3Ua9v4UqBACHgFnXhB4jyVWBxBwGvaANAgBgUsQcOYFgb/EVvaRpNOwfZCgSghME3DmBYGf5ojFQQSchj0oFcJAoHkCzrwg8M1vYz8JOg3bDw0qhcA4AWdeEPhxhtw9kIDTsAemQygINE3AmRcEvukt7Cs5p2H7IkK1EBgm4MwLAj/MjzsHE3Aa9uCUCAeBZgk484LAN7t9/SXmNGx/VKgYAnUCzrwg8HV2XD2BgNOwJ6RFSAg0ScCZFwS+ya3rMymnYfskQ9UQeCbgzAsC/8yNKycRcBr2pNQIC4HmCDjzMirw4YAfGNAD9AA90GYPTH3qjAr81GLuQ2BLAiEiHBCAgEfAmRcE3mOJ1QEEnIY9IA1CQOASBJx5QeAvsZV9JOk0bB8kqBIC0wSceUHgpzlicRABp2EPSoUwEGiegDMvCHzz29hPgk7D9kODSiEwTsCZFwR+nCF3DyTgNOyB6RAKAk0TcOYFgW96C/tKzmnYvohQLQSGCTjzgsAP8+POwQSchj04JcJBoFkCzrwg8M1uX3+JOQ3bHxUqhkCdgDMvCHydHVdPIOA07AlpERICTRJw5gWBb3Lr+kzKadg+yVA1BJ4JOPOCwD9z48pJBJyGPSk1wkKgOQLOvCDwzW1bvwk5DdsvHSqHwCMBZ14Q+EdmvDuRgNOwJ6ZHaAg0RcCZFwS+qS3rOxmnYfsmRPUQ+EnAmRcE/icvXp1MwGnYk1MkPASaIeDMCwLfzHaRiNOwUIIABP5HwJkXBJ5uaYaA07DNJEsiEDiZgDMvCPzJm0T4nwSchv1pzSsI9E3AmRcEvu8eaap6p2GbSphkIHAiAWdeEPgTN4jQjwSchn1cwTsI9EvAmRcEvt/+aK5yp2GbS5qEIHASAWdeEPiTNoewzwSchn1exRUI9EnAmRcEfoPe+Pr16+u7d+9eX15e3n4+ffq0gee+XDgN2xeR7aqNfoz+nOrLL1++vPVw2Mf78ij7vebTsSn98n4eAWdeEPh5TJ+sv3///vrhw4eHQdCQ1Br/yQEX3gg4DftmzAubQBbbsZ5U30rUy/cRUL7kp3zv2tjJYzhIwJkXBH4Q37obHz9+/CH88QHA4RFwGtbzhJUI6AHkl19++fFbpoRZ93WWXfRtPso+Lt+Hbfh8//7967dv334sdWxyDF4vI+DMCwK/jO3kqmjy3PSTCzB4dRoWTPMIxFN4fH0Y5+jHIYHXk7ie3hVF6+N+CHjNR17r2Mg353UEnHlB4NcxHlxde4oZNObGDwJOw4LKJyCxjV7U6yGBj+vxQRBinY8s3iH2te/ls2/HJvvn9XICzrwg8Mv5Dq7MDT9oxI0nAk7DPi3iwiCB/JAx1ZPl1yxyKoGP+/lpXvfjLN8Rz7HJawg/vpoAAAmtSURBVHm9nIAzLwj8cr6DK6PR+XpmEM/gDadhBxdz44FAKbQS4bEn+FrPSuDDX+lTAbNvx0brOK8j4MwLAr+O8dPqoV91nwy58ETAadinRVx4IpAFVzdr13QvzkN9Wwo8X9Fkaue+duYFgd9wj4aeXjYMcWtXTsPeGsBGxUUfhhAP/Ux9157TyD099CGRPwQcm+yf18sJOPOCwC/n+7AyD8LDDd7YBJyGtZ1h+EBgSHhlpPvx9WI+8vf4+quU8d995L/+G0//+nrHscn+eb2cgDMvCPxyvm8r9cQUZ47lBJyGXe6975US8PwdvPpW1/RefVy+D4J6Wtea8r1r0/dubFO9My8I/ErWavChX4c1LCvDdLHcadguQOxQZE3ga38ZQKKufq71b9nzEvuctmOT7Xk9n4AzLwj8fK6s2ImA07A7he7Orb5KqYlzdzAuWrAzLwj8RTf3jmk7DXvHus+oKZ7M9b35GfGJuZ6AMy8I/HrOeNiIgNOwG4XCDQQuT8CZFwT+8tt8nwKchr1PtVQCgXUEnHlB4NcxZvWGBJyG3TAcriBwaQLOvCDwl97ieyXvNOy9KqYaCCwn4MwLAr+cLys3JuA07MYhcQeByxJw5gWBv+z23i9xp2HvVzUVQWAZAWdeEPhlbFm1AwGnYXcIi0sIXJKAMy8I/CW39p5JOw17z8qpCgLzCTjzgsDP58qKnQg4DbtTaNxC4HIEnHlB4C+3rfdN2GnY+1ZPZRCYR8CZFwR+HlOsdyTgNOyO4XENgUsRcOYFgb/Ult47Wadh702A6iDgE3DmBYH3eWK5MwGnYXdOAfcQuAwBZ14Q+Mts5/0TdRr2/hSoEAIeAWdeEHiPJVYHEHAa9oA0CAGBSxBw5gWBv8RW9pGk07B9kKBKCEwTcOYFgZ/miMVBBJyGPSgVwkCgeQLOvCDwzW9jPwk6DdsPDSqFwDgBZ14Q+HGG3D2QgNOwB6ZDKAg0TcCZFwS+6S3sKzmnYfsiQrUQGCbgzAsCP8yPOwcTcBr24JQIB4FmCTjzMirw4YAfGNAD9AA90GYPTH36jAr81GLuQ2BLAiEiHBCAgEfAmRcE3mOJ1QEEnIY9IA1CQOASBJx5QeAvsZV9JOk0bB8kqBIC0wSceUHgpzlicRABp2EPSoUwEGiegDMvCHzz29hPgk7D9kODSiEwTsCZFwR+nCF3DyTgNOyB6RAKAk0TcOYFgW96C/tKzmnYvohQLQSGCTjzgsAP8+POwQSchj04JcJBoFkCzrwg8M1uX3+JOQ3bHxUqhkCdgDMvCHydHVdPIOA07AlpERICTRJw5gWBb3Lr+kzKadg+yVA1BJ4JOPOCwD9z48pJBJyGPSk1wkKgOQLOvCDwzW1bvwk5DdsvHSqHwCMBZ14Q+EdmvDuRgNOwJ6ZHaAg0RcCZFwS+qS3rOxmnYfsmRPUQ+EnAmRcE/icvXp1MwGnYk1MkPASaIeDMCwLfzHaRiNOwUIIABP5HwJkXBJ5uaYaA07DNJEsiEDiZgDMvCPzJm0T4nwSchv1pzSsI9E3AmRcEvu8eaap6p2GbSphkIHAiAWdeEPgTN4jQjwSchn1cwTsI9EvAmRcEvt/+aK5yp2GbS5qEIHASAWdeEPiTNoewzwSchn1exRUI9EnAmRcEfoPe+PLly+vLy8vDT1zjmEfAadh5HrEOAt++fXt9//79j/788OHD6/fv3wfBlL1c6+OvX7++vnv37q3fP3369OTPsXlaxIVZBJx5QeBnIX02jmH59ddfX6OhdUTDh+DXhkM2nJ8JOA37vIorYwQ+fvxo96LEXX1bvo84Em6JevnetRnLmXseAWdeEHiP5SwrPTHFcHH4BJyG9b1hGf039cQuSvGgErZlz5Y+yvexPsQ+fkOIvo/DsVFczssJOPOCwC/nO7hSAq+nnEFDbjwQcBr2YQFvBgnE03d8jZJ/sxw0Tk/menqXbfYz1Nd6ig9bx0a+Oa8j4MwLAr+O8dNqPQnlJ5onIy5UCTgNW13IxScCeor+7bff3r4rH/vaMB5Gah8IWbxDwGs+sqg7Nk/JcmERAWdeEPhFaJ8XxYDoD1pjuDjmE3Aadr7X/lZIcKMf82+R6tEQ4fKIe7WHEgl83I91tQ8BxYu+d2zK2LxfRsCZFwR+GdvRVdHotSed0UXcfHUaFkzTBLLgZmv9dln7Xn5K4EO4p8Tb+RAIG45tCDjzgsBvw/rBy9ggPRjy5oGA07APC3hTJSCBr4lpPHzUntTDtvZ0rid4CXztwSXHC7spm2rSXJxNwJkXBH42Vm9BDExtkLzVfVo5DdsnmXlV6wGj9lXhkMBnIc/R8lN7FvJsk9c6Nnktr5cTcOYFgV/Od3RlDFLtV+HRRZ3fdBq2c0R2+TUhHxN+CXP5oZD7WOvLvs4PM46NXQSGowSceUHgRxFO34yG/vz584NhNHzt19QHI948EXAa9mkRF6oEaoJdfg2jr1Piehx6H+fa+7imp3WtKd+7Nj8C8D+rCDjzgsCvQvxzKELQ9VP7LnNlmC6WOw3bBYiNitTTtPqy/Mqw9pQvkdcaiX1OSaIuG4n9XJtsz+v5BJx5QeDnc2XFTgScht0pdHduJf41ce4OxkULduYFgb/o5t4xbadh71j3GTXFk3n5RH9GHsRcTsCZFwR+OV9WbkzAadiNQ+IOApcl4MwLAn/Z7b1f4k7D3q9qKoLAMgLOvCDwy9iyagcCTsPuEBaXELgkAWdeEPhLbu09k3Ya9p6VUxUE5hNw5gWBn8+VFTsRcBp2p9C4hcDlCDjzgsBfblvvm7DTsPetnsogMI+AMy8I/DymWO9IwGnYHcPjGgKXIuDMCwJ/qS29d7JOw96bANVBwCfgzAsC7/PEcmcCTsPunALuIXAZAs68IPCX2c77J+o07P0pUCEEPALOvCDwHkusDiDgNOwBaRACApcg4MwLAn+JrewjSadh+yBBlRCYJuDMCwI/zRGLgwg4DXtQKoSBQPMEnHlB4Jvfxn4SdBq2HxpUCoFxAs68IPDjDLl7IAGnYQ9Mh1AQaJqAMy8IfNNb2FdyTsP2RYRqITBMwJkXBH6YH3cOJuA07MEpEQ4CzRJw5gWBb3b7+kvMadj+qFAxBOoEnHlB4OvsuHoCAadhT0iLkBBokoAzLwh8k1vXZ1JOw/ZJhqoh8EzAmRcE/pkbV04i4DTsSakRFgLNEXDmZVTgwwE/MKAH6AF6oM0emPrUGRT4qYXchwAEIACBtgkg8G3vD9lBAAIQWEwAgV+MjoUQgAAE2iaAwLe9P2QHAQhAYDEBBH4xOhZCAAIQaJvA/wdZeMilmXniAwAAAABJRU5ErkJggg==[/img][br]Which equation could represent the total weight, in pounds, for [math]n[/math] loads of crushed stone?
[size=150]Members of the band sold juice and popcorn at a college football game to raise money for an upcoming trip. The band raised $2,000. The amount raised is divided equally among the [math]m[/math] members of the band.[/size][br][br]Which equation represents the amount, [math]A[/math], each member receives?
Tyler needs to complete this table for his consumer science class. He knows that 1 tablespoon contains 3 teaspoons and that 1 cup contains 16 tablespoons. Complete the missing values in the table.
Write an equation that represents the number of teaspoons, [math]t[/math], contained in a cup, [math]C[/math].[br]
The volume of dry goods, like apples or peaches, can be measured usings bushels, pecks, and quarts. A bushel contains 4 pecks, and a peck contains 8 quarts.
What is the relationship between number of bushels, [math]b[/math], and the number of quarts, [math]q[/math]? If you get stuck, try creating a table.
The data show the number of free throws attempted by a team in its first ten games.
[size=150]2 11 11 11 12 12 13 14 14 15[br][br]The median is 12 attempts and the mean is 11.5 attempts. After reviewing the data, it is determined that 2 should not be included, since that was an exhibition game rather than a regular game during the season.[/size][br][br]What happens to the median if 2 attempts is removed from the data set?
What happens to the mean if 2 attempts is removed from the data set?[br]
The standard deviation for a data set is 0.
What can you conclude about the data?
[size=150]Elena has $225 in her bank account. She takes out $20 each week for [math]w[/math] weeks. After [math]w[/math] weeks she has [math]d[/math] dollars left in her bank account.[/size][br][br]Write an equation that represents the amount of money left in her bank account after [math]w[/math] weeks.
[size=150]Priya is hosting a poetry club meeting this week and plans to have fruit punch and cheese for the meeting. She is preparing 8 ounces of fruit punch per person and 2 ounces of cheese per person. Including herself, there are 12 people in the club.[br][br]A package of cheese contains 16 ounces and costs $3.99. A one-gallon jug of fruit punch contains 128 ounces and costs $2.50. Let [math]p[/math] represent number of people in the club, [math]f[/math] represent the ounces of fruit punch, [math]c[/math] represent the ounces of cheese, and [math]b[/math] represent Priya's budget in dollars.[/size][br][br]Select [b]all [/b]of the equations that could represent the quantities and constraints in this situation.
[size=150]The density of an object can be found by taking its mass and dividing by its volume.[br][br]Write an equation to represent the relationship between the three quantities (density, mass, and volume) in each situation. Let the density, [math]D[/math], be measured in grams/cubic centimeters (or g/cm3).[/size][br][br]The mass is 500 grams and the volume is 40 cubic centimeters.[br]
The mass is 125 grams and the volume is [math]v[/math] cubic centimeters.
The volume is 1.4 cubic centimeters and the density is 80 grams per cubic centimeter.[br]
The mass is [math]m[/math] grams and the volume is [math]v[/math] cubic centimeters.[br]

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