Select [b]all[/b] the samples that are a part of the population you are interested in.

Sample: The prices for apples at two stores near your house.

Sample: The days of the week the students in your math class ordered food during the past week.

Sample: The daily high temperatures for the capital cities of all 50 U.S. states over the past year.

[size=150]If 6 coins are flipped, find the probability that there is at least 1 heads.[/size]

fall 20 26 25 24 29 20 19 19 24 24[br][br]spring 19 27 29 21 25 22 26 21 25 25[br][br]Find the mean number of cookies sold in the fall and in the spring.

The MAD for the fall data is 2.8 cookies. The MAD for the spring data is 2.6 cookies. [br][br]Express the difference in means as a multiple of the larger MAD.

Based on this data, do you think that sales were generally higher in the spring than in the fall?

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tS7gnePZ6EQIUwGeDMeKxIkJ1+DxRrlwHEWN8ywETpi3zDbDvUeh3tX0b/QDLaDlfSoUaOMX/Z/YJ/j5iiLE1t4F1EnEt5NzLL5VBf6BQOofVXu1E5wjgdkCDxWBDjmiDomTpxodyHi3xL3PSPWIBsSxMMp7hRxi20FEQoA6DhpEZyw4YR7KBNJAnnRsZlJmMliE8R+VhX2ILQ8MGXGPp7FkSY+BhaNLQxM8A1xXBwxS1aSCJtZv9BObBCi/91M6E+7SAfXhb9yBf9wuiczCc9zjDozdkK9K+CE0/sTbV04qRErx0O9q+hLiDGHV8L5BE3BBn+o/4YQ8rH6RrgqmoQ2hbIZjR2UlbjvObGOtoFa3l8ISIT1V2u1NYrA/xCQuK9i/T+s9JcHEJAI6wEX1QVFwBUEJO4nXayxZEcsEUfQNCkCEmEVIUXArwhI3E+6WPsVeG1XbAhIhI3Nqj6lCHgfAYn7Ktbe78O08lAibFqBoY1NKwQk7qtYpxUdvN9YibDeb4F6qAjEhoDEfRXr2HDVp1xCQCKsS9WqWUUg6QhI3FexTnoXqQN2BCTC2svqb0XATwhI3Fex9lNv+6AtEmF90ERtgiLgiIDEfRVrR9g0M1kISIRNll9aryLgNgIS91Ws3e4BtR8VAhJhozKmhRWBFEJA4r6KdQp1Zjq4KhE2HTDQNqYnAhL3VazTkxeebbVEWM86ro4pAplEQOK+inUmAdbH44uARNj41qbWFAHvICBxX8XaO32lnkTwn4lUkBQBvyKgYu3XnvVpuyTC+rTZ2ixFIPr/njVeFv0oBsoB5YByIPEcCDdmBYRB4vF/hAhXmd5TBCQElIMSQnrfrwhI3Fex9mvPp2i7JMKmaLPUbUVAREDivoq1CKEWSCQCEmET6YvWpQgkEgGJ+yrWiewNrUtEQCKsaEALKAIpioDEfRXrFO1Yv7otEdav7dZ2KQIS91WslSOeQkAirKecVWcUgTgiIHFfxTqOYKupzCMgETbzNagFRcCbCEjcV7H2Zr+lrVcSYdMWGG247xGQuK9i7XsKpFYDJcKmVmvUW0UgcgQk7qtYR46llkwAAhJhE+CCVqEIJAUBifsq1knpFq00FAISYUM9p/mKQKojIHFfxTrVe9hn/kuE9VlztTmKgIWAxH0Vawsq/eEFBCTCesFH9UERcAMBifsq1m6grjZjRkAibMyG9UFFwOMISNxXsfZ4B6abexJh0w0PbW/6ICBxX8U6fbiQEi2VCJsSjVAnFYEYEJC4r2IdA6j6iHsISIR1r2a1rAgkFwGJ+yrWye0frT0IAYmwQcX1UhHwDQIS91WsfdPV/miIRFh/tFJboQhkREDivop1Rsw0J4kISIRNomtatSLgKgIS91WsXYVfjUeLgETYaO1peUUgVRCQuO9bsT5y5Aj17t2bVq1aZfpq5cqV5loCJFEde/z4cePPv//9b9f8e//9900diWpTPOrxSv/Eoy1qQxGIBgGJ+74V671791KWLFlo6tSpBq8pU6aY63379kWDn2tlDx8+bPwZP368a/717duXrrrqKvrqq68Ig0NwWrBgAXXs2JF++OGH4FvmesOGDdS9e3caM2aM4303MiXCulFnOto8ffo0TZ8+nTp37ky33XZbAATbtm0z/d60aVNq164dzZo1K+C+XriDgMR9FWt3cBetuinWmzZtossvv5yqVKlCzZs3p/POO4/69etn+XTq1Clq2bIlFSlShLJmzUrvvvuudY9/DBw4kPLmzUuFChWie++9l7Nd/5YI67oDaVDBxo0bqV69elS8eHHq1q0bTZw40Wo1JjNlypQx/JgxYwYNHjyYsmXLRp9//rlVRn+4g4DEfRVrd3AXrbop1gMGDKBGjRrRmTNnjB8Q5wMHDgT4BPHG6iNXrlyOYj1q1CgTQmrWrJmKdQByqX2BGfWll15K119/PR06dChDYzBwY5D+66+/rHsY8O+8807rWn+4g4CnxHrr1q104403Uv78+alUqVI0evRo0+rt27dTzZo16aeffqJrr73W3AdBtmzZQvPmzTP3QKBWrVrRwYMHLaQgKNWqVTPkqlq1Kr3zzjvWvWjDIBC0IUOGUO3atalAgQJ04YUX0rfffmvCB126dKHy5ctTvnz5qG7durRo0SKrHiwl4evixYupTp06lCdPHiOUv/76q1UGP1asWEFXX301FSxYkOrXr29mKgjThAuDzJw509SHZxo3bkwIW3D65ptvCDMfp3TTTTcRRDaSFEqs+VkVa0bCH98jRoygcuXKBYixvWVjx44179P+/futbHAe4TBN7iLgKbG+5ZZbqEGDBrR69WpatmwZLV++3LR+586dJn5bsWJFggBjWQZxvOKKK6hGjRo0bdo0Gjp0qBFxO2kmTJhAS5cupR07dhjhh/hx/DVascZAUKJECTPLhF9Y9mGwQHr11Vfpt99+o82bN9Ojjz5KhQsXtsj+8ccfG4GGn++99x7Nnj3bhB9wzQl2MNi0adPGDEjwGyGKcGINIUaYAoK9Z88eeuWVV0w9WMIiwX7p0qW5ioDvSZMmGdvASorRq1gHQOf7i1q1apmQGCYgmOAgHPLhhx9a7cZ7g/fwhhtuMO/oP//5T7rgggto3bp1Vhn94Q4CnhJrzFrvv//+DC2FGEG4nn32Weve8OHDTd4XX3xh5d11112GYFZG0A/Msvv06WNyoxFrCCzqX7JkSZDFjJfs65w5c8zNyZMnm2ftMT3MtmEP4o6EF+P888+nkydPWgaxaRNOrLHSeOmll6zy+IEX7R//+IfJ+/HHH+m7774LuM8XCH9gUxCDT9GiRWncuHF8K8O3inUGSHybgdVj7ty5qWTJkvTaa6+ZlSPeR/Dwk08+sdqNyRR4gXx8MCHR5D4CnhJrzJhBAuwyIyzAiYXVLnjz5883RFm/fj0XIyzhEGbghBk5Yq8QMRAQGyEPP/ywuc02IzkN8swzz5iZPNsN/oavHTp0oIsvvtjMdkFgzI6R+JQJRJwTQiAogzYgYRn54IMP8m3zjXghyjiFQdBp2PjDSQ7sxvMHM+k77rgjwE64C4SMMLvOnj07vfDCC45FVawdYfFl5po1awznOPzIjcQqD3scSDhKCp5h0oPJBt4NCDzePU3uIuApsUZTQZgWLVoYAUHYAImF1T6LXrhwYQaxRkwa4oKEDbNKlSqZXWvEurEh0qRJE3MUzW4zErHGzBeEdUoIsyCEgWNwWAoC0FAiy8+jHMog5o2E5WbXrl35tvkOJ9a7du0yz6NOiLn9w2GeAGPCBY7nASunpGLthIo/85hX9r0PtPSxxx6jsmXLmkbj5E/Dhg0DAEAeToicPXs2IF8v4ouA58SamwcBwa40UixizeEHPMsJMW7YtduMRKzfeOMNypEjB+HIW3CCkNvjz/hjm2jFGvFw+GZP33//fVg7iIsPGzbM/kjMv3v06GFWBE4GVKydUPFvHkJj2Ei3J8StsYpDwuoR+zL2hJAJVmfgvib3EPCUWGO2jKNDR48eNSc72rdvb1oei1hDhCGaiP3CJuKyuEa4AoltRiLWOEaHpR9Oc+AvHRHzxRIQm3OYdeB0yO7duw1ZO3XqZOrhTRkOg9g38oJn1ji5Ad+wWQPCYwMToZFzzjnH2twJtvP888+bM85oH/zBrAaxRLQVCeege/XqZX4H/3PzzTdTz549zYYn/MfKYNCgQcHFzLWKtSMsvs3EXhDOV2N/Bn8ohZAIQm7gHxLOXWNjm//yd+3atVS9enVzisu3oHikYZ4R6xMnTpjjcBAo/KEFjrvx8TYW1mjCINgsgShBBEGu1q1bE8T/9ttvN9CzzUjEGg/AF4RREPfGByIGoYRoI0SSM2dOKlasmBHJypUr08iRI009wSKLzGCxRh5OueDoH14MLDkRn69QoYJ1fDHYDjYjsZmIY47wBfVjVsSbljj+Fyp0M3fuXLPCwK4+Vi/2zSPjtO0fFWsbGGnwEwM/zuFjAEffg1/2eDQmUg899JDhG/aBwNe2bduayU8awJPUJnpGrIECZoeIm9kP3GcWHWwyYmYcrwTAEA7B4MIJfkMk7ac5+F403xhgcNY8moS6cfQPgw9+czp27JiJn/O103f//v3N4OJ0z6t5EmG96neq+YUVGngO8XZK4D/+cwPaH07ouJMnYe3bv2B0B87Usoqdffupm1TwXiJsKrRBfVQEYkFA4r6KdSyo6jOuISAR1rWK1bAikGQEJO6rWCe5g7T6QAQkwgaW1itFwD8ISNxXsfZPX/uiJRJhfdFIbYQi4ICAxH0VawfQNCt5CEiETZ5nWrMi4C4CEvdVrN3FX61HiYBE2CjNaXFFIGUQkLivYp0yXZkejkqETQ8UtJXpiIDEfRXrdGSFh9ssEdbDrqtrikCmEJC4r2KdKXj14XgjIBE23vWpPUXAKwhI3Fex9kpPqR8GAYmwCpMi4FcEJO6rWPu151O0XRJhU7RZ6rYiICIgcV/FWoRQCyQSAYmwifRF61IEEomAxH0V60T2htYlIiARVjSgBRSBFEVA4r6KdYp2rF/dlgjr13ZruxQBifsq1soRTyEgEdZTzqozikAcEZC4r2IdR7DVVOYRkAib+RrUgiLgTQQk7qtYe7Pf0tYribBpC4w23PcISNxXsfY9BVKrgRJhU6s16q0iEDkCEvdVrCPHUksmAAGJsAlwQatQBJKCgMR9FeukdItWGgoBibChntN8RSDVEZC4n0Gs8YB+FAPlgHJAOZB4DoQbcDKIdbjCek8RcBsBCIQmRSAdEZC4r2KdjqzwcJslwnrYdXVNEcgUAhL3VawzBa8+HG8EJMLGuz61pwh4BQGJ+yrWXukp9cMgIBFWYVIE/IqAxH0Va7/2fIq2SyJsijZL3VYERAQk7qtYixBqgUQiIBE2kb5oXYpAIhGQuK9incje0LpEBCTCiga0gCKQoghI3FexTtGO9avbEmH92m5tlyIgcV/FWjniKQQkwnrKWXVGEYgjAhL3VazjCLaayjwCEmEzX4NaUAS8iYDEfRVrb/Zb2nolETZtgdGG+x4Bifsq1r6nQGo1UCJsarVGvVUEIkdA4r6KdeRYaskEICARNgEuaBWKQFIQkLivYp2UbtFKQyEgETbUc5qvCKQ6AhL3VaxTvYd95r9EWJ81V5ujCFgISNxXsbag0h9eQEAirBd8VB8UATcQkLivYu0G6mozZgQkwsZsWB9UBDyOgMR9FWuPd2C6uScRNt3w0PamDwIS91Ws04cLKdFSibAp0Qh1UhGIAQGJ+yrWMYCqj7iHgERY92pWy4pAchGQuK9indz+0dqDEJAIG1RcLxUB3yAgcT+lxHrmzJn04osv+qZzIm3I6tWrqXfv3nTo0CHzyKeffkovv/xypI9HVO7hhx8m2E12kgibbP+0fkXALQQk7qeUWPfq1YsqVapkYXXFFVfQ008/bV379QcGqSxZstC2bdtME7t27Uo1atSIW3OPHTtGTZs2pc6dO9OSJUsy2D1z5gyNGzeOOnToQHv27Mlw/+OPP6bbbruNrr32WurTpw/t378/Q5lIMyTCRmpHy8kIHDx4kDBIv/POOwGFP/roI9PX6G/+zJ07N6CMXsQfAYn7KS3WTz31FH3yySfxR81jFt0U66+++opKly5NDRo0oCZNmlD+/Pnpm2++sRBYv369GRiKFStmBowNGzZY9/BjyJAhVLx4cRo6dCh9+eWXVLt2bapTpw5B4GNJEmFjsanPOCNw3333Uc6cOemuu+4KKHDLLbdQ48aNCZMC/syfPz+gjF7EHwGJ+ykt1vGHy5sW3RRrvJR9+/a1Gn7gwAE6deqUdb1p0yYaNmwYLViwwFGsy5UrR//4xz+s8j/++KMpt2bNGisvmh8SYaOxpWVDIzB9+nQ699xzCcIcLNY1a9akKVOmhH5Y77iCgMT9TIv19u3bCZ37008/mWUwZmbNmzenLVu20Lx588y9vHnzUqtWrQjLLk5nz56lwYMHU9WqVQmztltvvZVgi9Pp06dpwIABdHUHQscAABSeSURBVMEFF5iZH0b4bt26BYRBYBM2kBAigB+LFi1iE2Z2h7ypU6eavFh9tQz+/eOXX34x/pYtW5aKFi1Kbdq0MXc2btxo2lmiRAkqUqSIeRHsberfvz/h895771HFihXNLLZ9+/Z0+PDhgComTZpEl1xyibFx880309tvvx02DCJhOXr0aFq5cmVAHbjA7LdAgQIWhhkK2DIWL17sKNbAAKEPTrNnz6Zs2bLRn3/+yVlRfUuEjcqYFnZEYO/evVSyZEkaO3YstW7dOoNY4x1esWKF47Oa6R4CEvczLdY7d+40LzHEZ9SoUTRx4kQqX748IZ6MuOq0adPMEhkE6N69u9VSbJhBSJcvX26E/e677zbCzctnCHPhwoUJ8bNly5bRo48+Srly5QoQ6+rVq9Njjz1mbEIoEdedM2eOVQdsIQ9ihRSrr5ZBIlq6dKnxA/5+9913ZpD64osvTBEMGO+++y5t3ryZIOh169Y1Axg/jzaUKlWKGjVqRJgtIw4MXDAQccLAArF77rnnDDbDhw83ghouZh0Oy3379hkMMCg4JcSpCxUqZPru5MmTTkVMXiixhn94fuTIkQYbDDLPPPNMSDvSDYmw0vN6X0agbdu2ZrKBkrfffnuAWGNPAlzDHgTi2R988AGdOHFCNqolMo2AxP1MizV37rPPPms5ixcYHc4ihhtYamEWjQTRhPBC+DhhUwoihdn4jh07KEeOHAEbH5g9QvzsG4zRinUsvrJ//A0fWrRowZdhvydPnmxwwAYeUpcuXQirjF27dlnP9ejRgypUqGBdV6tWLeDlwQ3E5kOJtYQlnseSFrFnp4RZPeyjP1A3RNkphRJrlL3nnnuMf/ARMesjR444mYgoTyJsREa0UEgEsBmMCQNm10jBYg0+4cQVPohp586dm66//npiDoc0rDcyjYDE/UyLNTodL+nnn39uOYvNCOTZBWLEiBGUJ08eUwZLZdxH+KBdu3bWB5sdb731FvF9zFDtqWfPnpkS61h8tdcPwmbPnt3MiO359t8zZswghC6w0siXL59pJ4dCMIOGINrTm2++SVmzZiUMRkePHjW/MZuxJ9gEXk6nQRirUFja7YT7jb7CIIQBE/Hp4BRKrLFaQJsWLlxI2KyEWGNAxYw+liQRNhab+sz/I4BJEEKO6CdOwWLN+fyNsCI4AZHX5C4CEvfjJtb2WTRe3GCxxvEgzN6QcIIDAvX+++/T+PHjAz7r1q0jxGzxPI/+DFE4sf7jjz/MMwgvcAoOg7BYR+Mr28I3z8xDEff111+nggUL0pgxY0z8HS9FKJFluwjRoAx83b17t/kdvLkTTqwlLLmeSL4xYFSuXJk6duyYobiTWONkCHwPPj2Cvg0+DpbBYIgMibAhHtPsCBAYOHCg6a9zzjmH+AMhxgQE1zypCDZ10UUXmf2i4Hy9ji8CEveTItbYvMBLjk1Jp8T37aKKctdcc03ImTVmvSDeoEGDLJPY5EQ9HLPOrFjDMHbQncQM9zDD5Bg6ruE/6neaEbOTdrFGHjYmn3jiCb5tvp9//vmQdhirUFgGGIrg4rLLLjPxyuCiTmKNgQLtw9KZEzaGcZTPvunI9yL5lggbiQ0t44wAVjtr164N+DRr1oxatmxp8uyngNgC4tXYk8CJIE3uIiBxPylijSZDeGvVqmU24nANouAv9Tg1bNiQqlSpQqtWrTJ/uQeyQMgQXuBkj1kjD/YwC0AYBks+kBAxN4RWkOIh1vjLQQwKr732mjnFgUGC/caGKo7CHT9+3NSP88YQMwwaSAiDBP8xS7BY9+vXz4RPMJuG7VmzZhFOXISzEw5LiCeWuhMmTDA+2P9BvBobghgM+GQA9gqwbxCcnMQa7UIMvlOnTqb/4C/wwUwN5WNJEmFjsanPhEYgOAyCvsfmON5HTDIQpsTgax+QQ1vTO5lBQOJ+0sQaIQUQAXFqxLKxdK5Xr57VVggBTk1ApCC42J3G0rpMmTJWmWCxxhnf8847zzyDUxYQaYgR4uVI8RBrhCteeuklc1IFPuMDgUZC2AOzENQNP1iIMeAgRSLWEDzM3CF4GBQwAOHUCXDgPYBgO+GwxHFJ4IvYcnDC6Q8cI8RJEfiN45NOf8GI55zEGvloM2LUaDM++AObUGGi4PqdriXCOj2jebEjECzWTz75pNncB/fA7fr165tTSbHXoE9GioDE/UyLdaSOhCoHwUC8OfisMZeHEEVzugDLtt9//91s1rENt74x8wg+T4z6gzdGY6kfbUbbo0mhsMQfumCQCZcwMDptLIZ7xn4P8fatW7fas2L6LRE2JqP6UFQIgEfYjwj1TkZlTAtHjIDE/aSLdcQt0YKuIoBwi/1IoauVhTEuETbMo3pLEUhpBCTuq1indPf6z3mJsP5rsbZIEfh/BCTuq1grUzyFgERYTzmrzigCcURA4r6KdRzBVlOZR0AibOZrUAuKgDcRkLivYu3NfktbryTCpi0w2nDfIyBxX8Xa9xRIrQZKhE2t1qi3ikDkCEjcV7GOHEstmQAEJMImwAWtQhFICgIS91Wsk9ItWmkoBCTChnpO8xWBVEdA4r6Kdar3sM/8lwjrs+ZqcxQBCwGJ+yrWFlT6wwsISIT1go/qgyLgBgIS91Ws3UBdbcaMgETYmA3rg4qAxxGQuK9i7fEOTDf3JMKmGx7a3vRBQOK+inX6cCElWioRNiUaoU4qAjEgIHFfxToGUPUR9xCQCOtezWpZEUguAhL3VayT2z9aexACEmGDiuulIuAbBCTuq1j7pqv90RCJsP5opbZCEciIgMR9FeuMmGlOEhGQCJtE17RqRcBVBCTuq1i7Cr8ajxYBibDR2tPyikCqICBxX8U6VXoyTfyUCJsmMGgz0xABifsq1mlICi83WSKsl31X3xSBzCAgcT+DWOMB/SgGygHlgHIg8RwIJ/YZxDpcYb2nCLiNAARCkyKQjghI3FexTkdWeLjNEmE97Lq6pghkCgGJ+yrWmYJXH443AhJh412f2lMEvIKAxH0Va6/0lPphEJAIqzApAn5FQOK+irVfez5F2yURNkWbpW4rAiICEvdVrEUItUAiEZAIm0hftC5FIJEISNxXsU5kb2hdIgISYUUDWkARSFEEJO6rWKdox/rVbYmwfm23tksRkLivYq0c8RQCEmE95aw6owjEEQGJ+yrWcQRbTWUeAYmwma9BLSgC3kRA4r6KtTf7LW29kgibtsBow32PgMR9FWvfUyC1GigRNrVao94qApEjIHFfxTpyLLVkAhCQCJsAF7QKRSApCEjcV7FOSrdopaEQkAgb6jnNVwRSHQGJ+yrWqd7DPvNfIqzPmqvNUQQsBCTuq1hbUOkPLyAgEdYLPqoPioAbCEjcV7F2A3W1GTMCEmFjNqwPKgIeR0Divoq1xzsw3dyTCJtueGh70wcBifsq1unDhZRoqUTYlGiEOqkIxICAxH0V6xhA1UfcQ0AirHs1q2VFILkISNxXsU5u/2jtQQhIhA0qrpeKgG8QkLifcLEeNmwYffbZZ74BONaGjBgxgiZPnmweP3LkCPXu3ZtWrVoVq7kMz/3+++9Ut27dDPlez5AI63X/1T9FIFYEJO4nXKyrV69Ojz32WKzt8c1zl19+OXXs2NG0Z+/evZQlSxaaOnVq3No3Z84cKlmyJE2bNo327dsXYHfKlCl0//33U9OmTalz5860YcOGgPvLli2jDh06BHzeeOONgDJuXUiEdavedLF77NgxwkShdevW1KxZMxowYAD99ddfGZoPTnTv3p3GjBmT4Z5muIOAxH0Va3dwF626JdZnzpyhNm3aGKFu0aIFXXTRRdSwYUPLn4kTJ9L5559Pffr0oeHDh1PNmjWpUKFCtHv3bqvMK6+8QhUrVqSuXbtan0S9tBJhLSf1R0wIPPLII1SnTh168cUXaeDAgVS0aFGqX79+gC3k582b1/Di3nvvDbinF+4hIHFfxdo97MNadkusv/32WypYsCBhts5pz549/JMQcjl06JB1jXLnnHMODR061Mrr1q2bEWkrI4E/JMIm0BVfVrVz507CgM7pyy+/NKs6rKY4jRo1yoTkMPNWsWZU3P+WuJ9UsT5+/Dh16dKFypcvT/ny5TMx1kWLFlmoTJ8+nW6++WZasmSJmQ288MIL5t6ff/5pSFSsWDEqVaoUDRkyhJ544gnzzQ+vWbOGbrjhBipSpAhdcskl9Oabb/Itx2/U1aRJEzPTgE3E1pHmzp1LDRo0MAJYrlw5evzxx+nEiROWjebNmxPCCog5Fy9e3HwGDRpk3ccPhCHat29v7lWrVo0QUpDEOpz/a9eupddff53Onj0bUA8u4DfaLHW8/cGLL76YevbsaWXddNNN9Oqrr1rXifwRjd+J9Muvde3atcuI9YwZMzI0UcU6AySuZkjcT6pYo+UQhd9++402b95Mjz76KBUuXNiKoX388cdUokQJqlWrFvXq1YtWrlxpZgW1a9c2AoxZJMS0cePGZsn21FNPGTC3bdtmriFcmFXOmjXLXMOeU4IPOXPmpOeee46WLl1KCxYsMAMEyuI3nseMBPVBkO1iXKVKFSpdujQ98MAD5n6/fv0M+SHgSJjFXHrppVSjRg3jK/xFrDhXrlwhY9aS/4j5I8a9bt26DM3Bszly5CAMIqtXr85wPzjj6NGjlDt3bho9erR1CwMKQif33XcfvfzyywGzdKuQSz8kwrpUbdqanTdvXkguqVgnlhYS95Mu1nY4IKwQIWyOIeG0BK4hGJwggtmyZQsQKghpnjx5qG/fvqYYlvGI19pTjx49zMzZnoffmPUiPvfSSy8F33K8xkqgXr161j0I25VXXhkwy8Xg8uCDD5oyaEPWrFnNgMQPIT6cP3/+kGIt+b9lyxaaMGECm8vwPX/+fDNAZM+enTCAQZBDpeeff57OPfdcOnz4sFUEgxwwxyoCgyVi3Bs3brTuu/lDIqybdaej7WuuucYM7E5tV7F2QsW9PIn7SRfrFStWmFMHWIpj+Q5xZiGCMOMaSzVO2Bi78MIL+dL6rlChgiXWOLIGEW3Xrp31gYDidERw+vrrr00df/zxR/Atc42QB0IOjRo1IoRBMAOvXLmyVRanWyDg9oR6r776apP19NNPE3wLTpdddllIsY7G/2C7fI0ZPUI/wPS6667j7IBvzKoww+cjhAE3/77AYFamTBmz6nG6H+88ibDxri+d7SGsiJXs+vXrHWFQsXaExbVMiftJFWuEHDCrxYwYS3o4C3EeP368AYTF+uDBgxZAEMaqVata1/zDLtYQ/latWhk7sMUfp6NxPHvH7Nwp4WQFQh2zZ8+m/fv3E8IclSpVsoo6HUVEfBqhGSQcjUOZ4BROrKPxP9hu8DXajpk9ZuP2tHz5cvOiYudfSjhBgFMjiUgSYRPhQzrUMW7cOBP+wmQlVFKxDoWMO/kS95Mq1hBexHI54aSCJNZvv/22md1u3bqVH6MdO3aYEw0cBoFQY5MskoS4rr1O+zMclrGLPDYyoxFrxMMRE7afdcZpDMx4Q52zjsZ/u79Ov7FxivYh3s8JQo0jWxzj5/xQ3wgpRYpnKBuR5kuEjdSOlguNAAu106ai/SkVazsa7v+WuJ9UscZGWYECBcwZXwh1p06djLB8+OGHBhmnmTUaVLZsWRM3XrhwodkARNyNZ+h4EJuCmE0i9oo/AkCCoNuPsJnMv/9p2bKlic3iGBPCHgcOHDAxWpRHfByhDJy8+Pnnn81sFGeQOUkzaxyNwzlmCDDCORhkMPOGWOMPT5CC/yhG8n/mzJlGPJ1i0Zgp33333YRBDb8RurGHQdAGCHXbtm3pl19+sT68FMZmL+qHbfyxBE7aAMtwMzDGIh7fEmHjUUc62xg7dixhLwN7NPb+3759ewZYVKwzQOJqhsT9pIo1ToAgxIA4MI7hQVwQDx45cqQBxUmscWPTpk106623mhg0wg0QWQgo/siD06RJk4yoQ2yx+Qgx//TTT/l2wDfEGac5MANGecxE+/fvb8oMHjzY5OHsMk51wEeIHSdJrFEO4odNOtiFcOPUCTYgIdpIwWKNvHD+YwWBEx/BoQ08hyN/ODmDuDc2DnF+mgcs3McxRPgR/OF9AISF4CMEGh8cq0Q/JCpJhE2UH36sBxMR9Glw3+P6oYceytBkFesMkLiaIXE/4WId3FrMWCHaJ0+eDL4V8TVICMHHn1YHJ8yOMWs4ffp08K0M16dOnTIDAWb59oSwhX2T034vmt+YVUfih92mk//ADPHzcImPCIYrE+oe7OMIYDzaHKqOUPkSYUM9p/mKQKojIHE/6WIdC8CIM/NfYeH7ySefNLNIScBiqStVn0HYh49AplIbJMKmUlvUV0UgGgQk7qekWGOJj5gv/jgGf22IGHYqClM0HZkuZSXCpgsO2s70Q0DifkqKNUIJOPaH/9Tq4sWLA2Ky6dfF/mqxRFh/tVZbowj8DwGJ+ykp1v9rnv7yGwISYf3WXm2PIsAISNxXsWak9NsTCEiE9YST6oQi4AICEvdVrF0AXU3GjoBE2Ngt65OKgLcRkLivYu3t/ks77yTCph0g2uC0QUDivop12lAhNRoqETY1WqFeKgLRIyBxX8U6ekz1CRcRkAjrYtVqWhFIKgIS91Wsk9o9WnkwAhJhg8vrtSLgFwQk7qtY+6WnfdIOibA+aaY2QxHIgIDEfRXrDJBpRjIRkAibTN+0bkXATQQk7qtYu4m+2o4aAYmwURvUBxSBFEFA4r6KdYp0ZLq4KRE2XXDQdqYfAhL3VazTjxOebrFEWE87r84pAplAQOK+inUmwNVH44+ARNj416gWFQFvICBxX8XaG/2kXvyNgERYBUoR8CsCEvdVrP3a8ynaLomwKdosdVsREBGQuK9iLUKoBRKJgETYRPqidSkCiURA4r6KdSJ7Q+sSEZAIKxrQAopAiiIgcT+DWOMB/SgGygHlgHIg8RwIN84EiHW4gnpPEVAEFAFFIHkIqFgnD3utWRFQBBSBiBFQsY4YKi2oCCgCikDyEFCxTh72WrMioAgoAhEjoGIdMVRaUBFQBBSB5CHwfyh7cSL1YcOfAAAAAElFTkSuQmCC[/img][/center][br]How much money must the school pay to the candle company?