Canada's population reached 30 million by the year 2000
Indicate whether the statement is true or false
TRUE
You might also like to view...
Active margins tend to be narrow in comparison to broad passive margins
Indicate whether the statement is true or false
[NeedAttention]
src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAyIAAAQdCAIAAAAtpGv/AAAACXBIWXMAACI2AAAiQgGZ4mWoABbey0lEQVR4nOx9B4AlVZX2DRVe6NdppifPMOScEQEJIkFURESMa3YVMKyypv3XNWfZdY1rDoirmFAyEhQBEVEEyZkhDBM7vn6hqm747zm3XnX1e6+bYeyBGfZ+4vC6XoVbt2q4X5/zne94Wmvi4ODg4ODg4OAw1/Ce7gE4ODg4ODg4ODwz4WiWg4ODg4ODg8MWgaNZDg4ODg4ODg5bBI5mOTg4ODg4ODhsETia5eDg4ODg4OCwReBoloODg4ODg4PDFoGjWQ4ODg4ODg4OWwSOZjk4ODg4ODg4bBE4muXg4ODg4ODgsEXgaJaDg4ODg4ODwxaBo1kODg5zBq01pXT2HZ6ywTg4bHOY/a+Pw7YIR7McHBzmDNki4eiUg8NmoPMvjiNe2zoczXJwcJhLPCHBsjs4HubgkCHjUp2kKv83xVGubRGOZjk4OMwZ2siTY1QODrMg+6uRZdvb/rLYjZ1BYse3tiE4muXg4DDH0Ijsc9tXT8eIHBy2Rhi21PVvSp5X5fdhjOW3P4Ujddh8OJrl4ODwj2Lql2xNFVGwBuAGRaTUZiNTSuR/WVdKbd4ioSmxZ8YP5kIcFh6daMKe1HmoGZr2YLBTMJ8ZYTQbfLpnbpGbbWBu2duyMC+Mr7WkxFc65tS8Uco8rKd7VHMPBm8cVRTeZ/PqtXgVw9dSmf+712ybg6NZDg4O/xDymUGlhVkQ4QOnUkrzs/kslCRAiTSZIY3YRfY7A7GZRnqY+cEstoZyMaKS9FR0+uGsuyQfz5PgB7NyMULs8LSmUzuQXCzBnDC79LQIRI6o5Xcw5+yqZTbkrvt9adV1+0zQtDutnGne9JNcmmc6z1xhpvHMNA+UcqkbhnPgU1MCnj3XUrXGmbF2mBYIpT7p+51p/rvP88zjn/kS0/l6+iPr8pLgvcAdAcdS3FyLMaRb1NP498juk71sM9+Ww1YBR7McHBw2H/mVI80V4n/3ZSKUgiXBrIWEKvOHziF3LOs8D5l58YB4BuUQeVJIgCgwI1wjWdvKZxc8iv9qfcVy58k0LjAGu8oqQmdcbtlUKC4flmtbVqe+YrTLzpsWGPtHMOOiq7pcd5YVekY6+CQX9bm6X6DCDDg1EgyJTIPjyzA1nvy1GOk+zpnu6ylAyten03cbu8qHQi2FYsxDdiUYlQTu1LyXwLns++yo1bYFR7McHBz+UWT8iREuYEVXwK6IlFIj2ZIK0oeSYLpwmuxXpx829ULmP1k0Nvt7zFdKQFDHrLeGxbH25bZFs2aia7qTAKWRMPicP8oSL0Y6OFP+chZti2iXQ7rRHTKH0aaO6EjnIKedZ8b56b59rmjWk426GbahFbepM0ZsQFRk+9Pc6Sx3f1J0c5brzoTNiBp2pVmkNfhswIzB4BkR3A8gMUoU5+ZPHw82n3n6ruZiWo51beVwNMvBwWEzka0W2WoqhPmtW5vFwPzqLRNYLTQEH6gyTAgJVkaz7OcnS7MISRiH/ZsCViCkLSwBDpRGoTLlVldkq+OmJ32yLORMsaiu22faOHPSsPt4ZsJmJK22KjzZ8Zs3CLRZIsHQI0GtUiuuuSWvu6XPY6OkrURh+tpAbtScyBBLzTExnuBfNG45VqaCd+xqW4GjWQ4ODv8QMpoFtInzicnRe+65p1FrapkyKghqtQhWR9KQdH6eZf0wi4/C/2oZggWJISqo0or5+SjFjIdTlcV6FKSVVEaGuPkfQMQ6wMHA163c3zS1fp5ZolRI2/CDgRCCTBGsJ7sEPtn1eabzz9V5ni7MFG3ylBI8iyAqWiiB+E+gJK8VIpr76z4185OjWelPnDI/5MtXLB2atwD/4iTcgzfN/lXKYlr52NhTME6HzYOjWQ4ODpuDLCiVcSwD3/cnxsavu+564vcUyr1KRqg+4ZaZ2APzS8KTNQQyC0qRa6lJ08p0DMViTKl6p0Ynp4VPf/vPR5LMdlSvM8uazAekhEkPF5nmHcBoWhSJNM7yqixfA+fhrNlsmsUvCAKz+Nl5QOXyNDHWU6DKmh1bmwT+yQJmG/KG+CjhmcgBslToeHJ8OH0W02sOtq1oX54nWeKexPH4eDMMw4G+Xi2Z1IZlJYZfeR7MgGX2xBGsbQSOZjk4OGwO7HqQTwIaCJUwRcOgZ68jnz9/xQ5J1MSlwCfT7X+mJMCsS0UeonsyyOx84OLCWDO5a1h4BuaCoNYyDCotMSOYSsyYlkbpPW6hyn6L8QklqaRCE7OAMUhpwv+VIMnx/Xf75qxYPI9nSOMHoLuWMmNX5srmQxzHdoEfHR0dH6+WSqWhoXmGb0mV0G6F90/JorhJxhabQGqfXDJuS8M8KdYiFkCKA3rXrREP2G4774iBUst9bUhy6xp5hran3/qRZUS89RdEmVdo3Xjt0gtvjSIRRZGWxNMhxNXMO0vT8DDJeWg5prWVw9EsBweHzUG+NsqGsux//WNl/pSaembFx6XEw1iQtkfYRYWlyTgw1mK8nWnNREfMdkm4JDoAfQ6HX+wVp0CbOJ5/WvQI9idwHvCXAJct2E9hWgbsJQijzHAsTBZpT5I4JsUim9Ae4zAqqOuCURDFOFfC0EHFmB9HQumkUAhwgQOVjBCiVPKXLlto7mnjxuFyuWzWyGYjDgt+EIBIPzd8BuPYDPFOGghEHpnOuEr1ScgvcaaUDcjBug0VeVk6CVig4YrpzqSVDIWRcKkU5jtRMyc5ZbqVidKpK4W2SSxtnixj2WKhSEtpbolytnHLAV4ceHbwzlDCPEUiKQpw8UBK3Aj3a6fnCQRbWKJoWb7EDVbYZ+fZvnVKK864xEtyvFOZO23qaNV6aRlOYH4S2PQPrDWrCiOj3Lz4jKuWsExnYSz8zPC9ogEYZDElRNSIzTMO4QYDQ+wZ9bv+ZuLCWlszHM1ycHDYTOgcSEvVPvVZ23WlixJraosmStnVbrof1QxaGSGFlKkwRaJtUrZf7tipsZk1CyiehhweDAkYio1vaSEVKo210InhIk0V9dLEkwIqu2BUwFDQMsL8T9lVzPcNc+JCAGuJ4wYl3PfCOBa+rxcsHDT0y+w0NjZmvi33FK1UK3drlp082TnGQB3ExoRulQvACg0nFPZeYZFneI9aUOZLieYU0jPsCrZAIaZgjOMcMKgcoMCZMDiHpWwwPDNLAjwxDZ2UhpYlQMIk1LXZPeAkdlcgOuarBBd7lRW9Pdm7evJQuqV+hztl6YUtv8cBtFEce1/TcrUpu6IJZoGB0OAW87DN9ED1Bk6j3d/8zkDACpUkGT/G++Up20/Pb0iYQK6Zyw6rTNBlVX3ChkFJ+k6K3GROu8HW4FWmYoyiqNFoUM4srP7dnir7QFw0a6uHo1kODg6biXy60EIish3yK8ETipPymaxZdpYKghgcV0RKpoTAU4Xu2jqkWvagrSDHcqx0tIpKqg1VkUA7ZMxIkeiaLCmPFKiO7TJuFlQtcf3WdnEzi1+1OhkEQVjwBYJS6fnmK9JsNjkLPc8zH5Ik6evrs+nUzjzp5swytfyMtTRhrbMRXxPZSjZJnAAPlWE2WqNtLR5+MEyL2QpNClUAGKHRzPIzcMPXyDBIgrqyEC31lRVcZ3K0NMOrzM6Ewz4SA0seXtoGe7YobFKYZlGrjsmcli1tK4DNMtQ4d4ymucf0hQBzUgjsocu8mSB8e+Df0LoA2AyG+rwWgbcBKnt+aWYPw4f464T24J0i9tcAgTQOYqL2uik/hqtzDexN4f6qY/zMhhJtrBReLd/zGMfqXZb/lSYXSnTYquFoloODw2YizyFsXIHgL+Otr9vtQDv5U9ctbVfJIgH2s1CkgJWBFNYzYFoUIzqZcKp1QtRgZakkjEnYUWlsCSRBmJWAiJ3opqaNRCyojJvFzK6yRE8ji5biGCKFyVFidiuXy4ZR4XYWRYnHIV9nI1hmO4bcpi2B2Vr75GYY84M2wWeuLoATwlKN+TpJW7krXMsxsca0Srkhmq1iMAxmhRrOaIMq3D4PpBF4dyyRkEM1N84hcQi0g6TnQHJpV3dQpynF4bPU6XwSJFtA457UTf0j2MQJbNst5d/IRzGYBPE8CE6ZSZBmBoQG6iMp2rohm+T4gkBUFXi6R6Q08+ApDbE+DI6afyuCSVc8m3kDGWoENTInm8gGjzdKfaljitSWw27Sxs/ge3MJNaOvm/kzjuMoisxADc2yAa2M+GbPheSUji6stXXC0SwHB4cnja7LmE125KNZeXQWA27KyTv3TBd5aPCG6itCyXQqNm1UrW2WPcg0UakV4xjC8BRVgaKrI7Zrz6P7V6qR5DboRczyy7ghYSDUIQnBhFpPpWRJpD2p7/tSwDptKJf5sV6vVyoV68iaXwVJbiGc5a67T1pWKUlB+oYkyQyFSi1gVVdIm6i9Fijf8EtgDECUtKdJ0lIXEZ4mtrRNZulUFKRalvUUeJq50zR+QzDuNcWD0bnK0BABBGXqRuBwM5t0BlvUOceTncb2Yk/DsbIgkC2KgAduJtRMp0DRoK9UExg8RosoTiwxsw3BKuBhwHkYiPswYY2pTPiR41uYoCcDJFUNYzVHIbtKkLyStAiVYvyPSqJmC0TZ0Rq+DhJ4ShLuwcuGsJnc7O1y1Grrh6NZDg4Om4l8aiajWXndSZ795DM4JJdEawtWte3WdiqCbaLNZwgMtOic1mmHn3QYeFZiRcW6lShMk20QgoAIjhICzB95U+rVcSBo4+D+YY/oBvY3tEZYGt25bA6y8xbSxByEI3izEUPtIeFjY2M9PT2+71n9Ta58bCqg8uRmGDolg/rH97wg8IXQcRwbqsk0bC+VQnO7zabEkBVMexCAPL/ZxBJIojxuayJ9ZL9TajFwVCfM8wQO2zf8IEmUFGmnxCDwEmF+jFu3CaEUKSAGyKkfhnBrcSwwkIMZMZTYP6n72mxgjnKma6muX7WSrRiZI7xY9GzTHqviQvcEnagGKPoV9QJdDAvNBvyyYCiRkioIue8HUZQksWQcooCGSXOuC4WCOWGjEXkeK5YL+NrbxCKHyZSooCd+oeDFkfkY20JIQ92DoBjFk2Dea6gS6fo7SStwK4R53MzjUmbsXWVhY5L7WzMHM+uwxeBoloODw2YiU+3kP8+Ur8lvafuwideyJwHpOuOtE7bq7zpOpaZtYZkm3l40gY5xXhMW7XifntXLivUBJhsqSDXvJO3NnC7q2kqzlNUd52MJYeiPDE+MjIxZOmOWXkNYuGfYiWcDD/kb34zlsJWVM8MJJqp1kIJxz+YzDYMaHZsolc01A+BVYHpA642G+TYIYZA9vWXOezasf3x8fNyQv4ULh8x5qhMTnPlSJz2VCvd7161ZY74dGBgYWrhQNKNavcqYmhhveuAC5mmIXUEkxjJacBYo8YlqDaw0fMNUZUsHxjcjUPcPQnfxgJ2hnTZOu5kQc0txXN/wSA335SC9IqrSMwDSJ2whyAOtiBgd0cWSZwmuYZj1Zk1UWU8ZtHdYGyHMzHi+nqg2DNspFJkQdP2GYcO3rBlbpVIeGhqKQbweadqcGNfcN0zJzCHngflFJB4bE8Wyh0WfM7dYxF8PzCtkXidP+ELZSJbs9Ph12PrhaJaDg8M/iuw/+mYRykezWr9tpyti19RehjZG0pZxyz5gKIJwm/7DL/KnTYVVMw/VHgGaHC0nRDDoRc8bepwkwZgucIKViIqgUJzRNLlmljjNOHhlYXNGmsvX8PHx6uRk3Xwsl8ulUoExL46b4FOKPgv5UNbm6t8hYtQ32HfjDXefctJpb3jTyz79+XdXx6qG8pR755122ic3blh3wYXfqlRK1aro7Rv4wme/8pfr7zz3vC9wFoyMj3z9K9/+7SV/KhQNvZDLVyz4xKfP3HGn5cPrx+cN9Y6OVc/67Fd/d+UNld5CdaL54pOP+Nd//ee+eX0To9WTXvTP73j3q/7pda+uToykVXWQMVT9fZX7H3j4pBPefviRz/7W9z8SNZqJYXfQYpI8ZdGs/IVmn9JOFbx5Rnfes+pj//H1RlTzvQL3WH9/z19uuO3klz3v8194b7MhSpXSl/7r+x//8Dd+/uv/Pu74I8fHNvT2z/vYh7/4tS//5Oz//c8Xvfjw8ZFxxllPpfeuux940fGnH/f8w7713W+d8+NvfviDX91zrx2w+oKOjY48/4TnfuCDb+zr71+9evVLXvCuz/73vx533JG1aq3U0/PZT339Pz/3owsu+/rhRxw8PrqRdS8dSFWGNgIpZXeOtXnxUYenHo5mOTg4PDm0ZdCmxbGyjN20hZflDyQk6/g71Uq5Lf2Rp2L5hYQpFSnupf5PrT6GyKtSIbxVIKWWpGDogGsRWkTY5Ql6LMImxUg/TYaT8n3VwRXFeiCUZIqCQN6yoswgADI+LWMklpXuM0aEiNevGzX0q6+vt6enhL5TqlAMPGtwijZITyqtkwmZp8gBegUQ0nfhBZeNVut//OMtDz/46JKlQ1HN7ObVo+YVv7/ha185+73/9i+cDhMSjIxWVz2ymvv91eq6Fz7/9KhBvvjf71m6bNHoyNhZ//njFz7/LZde8e3td9i1MTn2guPeZs7/xS99YPHihQ8/9Mg73/m566+77aLLv1kqBvc89Pj4RBNaGFEBHlyGj9jH5JUv/e0N64c33nTLXX+/+d59999ZxHWNdHRT7u4fg0rDigxzuASU5kJyCszG0zSmysc4pBmKRHZsZ37K6cqgVqvusHLx5z93piQJJ/6ipfN/cPZ55/780sOfsz+D+JyYGBn97aXXGWZz8cW/P/b5z/V5YO7ZPOKR6uiF519laBbK382r55//6ytXrXl4YnwfQguPPrI2ihpf+vK/S5F4fnD9DX87460fWb5s/ptPP02JNfeseiSqJUT7Xsg2rhn+3ZV/bgpxyYXXHn7Ec3zuSWmlclh4Qa13hs13p9UkZgcgWEJn1nSZOrDz9xCHrROOZjk4OPyj6EwdzlQwaPdBJ6juXz3BhUgqZqHoO8pbG7PztB2fP6FqFRtqdEAyqxXzNWkU/jy2cHHwIMjKCc8PmrZsV4MggPK6qbgUiue9YqOe9PSUS4BCIiLrOB+GIUkXyCnX+E1E29TBAEjSWymteey+y3/7p+9+6yM/PPu8837z+zPPfHtUW0tIUgz8fffc7VvfPO/wIw569nMO1SQKg6BvoNf8h/0bX/vZ6kdHbrzxx4tX7KrlCOX7/fSAvQ457PX/+72LPvzpA779zW+uXrPh+j+es3yl+XZs5c77/OwX84857q3nnvObV//TSwf6yqHvM5KAGywpKJWYOy6WeybHN/76F5d/4az3X3nVDT/56YX7HvRJqcbMDlCyucWtsxgwJ5D2GyINdHr+/OLqxybHq35fL40Ta7+KpupcU8kJnUawLHM1T7xYKOy1747AnL2htY/e+/Uv/eTDHzr9JS87eXJsXU//4I/PuSRO1Nk/+cxnPvXdB++9Z4edVxKtYhHvs/vuq1atuu3mu/fed+dmTU0YovmXO1csXVEIoFyTUzawYHDn3ffXOjZPfqfdnvvl//7fW2+7j6qAsrivUoYqVEbCoPKLX/zCvB4/PvsTnz7r7Hc+8sDi5UsmR2sk/X0AXjCbos2/DzY8nL1+DtsiHM1ycHCYG7RFuWbaIf2wWasGxaY3ZpH0piepdGud7xR+WQIoMeCl6ZR5JSc6kizgimObOGXDRrkT2nq0zlJ5Db17/aiZxLEolvy+/nIcx/mQ3jRCOWM3oe53l31Iw2Dg3dDz+6surdebr379y2/6652XXviHM898rV8Ev4CN64df9/qTR0fHz3zPF/5wzY/84mKzzPvANScv+M3vXveGExYv3258dFWhVPK58IsL//ynn8lksja+6vs/uPCt/3zy0pU7To6tAX+K4OE999nr1JcdbRjbq151ElLYNAiH/pzKcBselG74/Z8eX7PudW8+ZWIy+tHZv25MrO3p65us1tlTYU+KiUuMk0qtAuYPzWOPPxaMjon+voDTQKoYJw9sKYBjWZqVWuRPTalUamJ8slwpqXjs1Fe8e899dv34p/41ro9i8JJddtk1u+663UtPffHHP/6dC877/ZkfPN0cODZRO+aYZ1Un4osuuW7v/fYpVLxf/vKi8erEC088avXDj1FGwAe2GW9cd595IQqF4IYbLq4UCy9/+fGEjRMdGjIvKbNGD5f+9o/77L3rS1918oc/+s2LLrz2bW9/raIJS/PpYHyKdhJTHiR6yn81FzBufeWI17YCR7McHBzmEjP91z9Ln3XKlfICmlnOYCExacLZNN4z9ZkS2yqGtPwntQ1iaZZ6wbeujDWEUhCfosUU1R6IsshU4ga6HAqBRXYg1vJ9bpZpxqCKsFGPNmwYDoJgYLBi9kmSBIsffWRmOqNoT9Y9Mj8zU/RON3/8k4tf8YoTCdnujHe89oUnvOXaq/92xFHPgpmQPEmiT37m/33/h8/56Me+9pnPfR38SD2e1BurHn70Xw94g7mTvoGBC8674rxfXV3uCXoqpUMO3f+45x26Ye3I7nvswkgAxhCMQwkiLe6y6+6XX3p9DPeCRXIQZkltDtBsTJ199oXPe96zfX/3N73pZd/+xrmXXXLtS191EieRooLqLavNslWfxBqvE64U9ZmgTDWbXIGBlWQcFOsQJVUx+FyRaRxr6g3R2g8MSSu+57QPr12z4fzzv65JZNDTP3jXbXfdf/+q97/3bVSvfO3rXviTn1x82jtfUSovMhPQ09N73LF7fOpz33vPv7ymWBm87Io/HvPcQ3lAH7z3AUVEZbD3kTXDb3jDh7ihU4zfcP3NO+66Ytc9d9JEUCCphvoJogdvuunKVQ89+pnPvZeSZS9/+Qk/PPv8t/zzqR4PlEzQqZ9AYQezVYS8ddc2Rehk79s2HM1ycHCYM8zIsWjWTa89PrQp1Gr6JTBqYY9uNY2mLV5lt7b4Sur/bsViaWNDDHxJCm0XQU2l2LAqxYqVmFTYTSUbSdqlUcPSJxOJXglApGqTjY0bR8IwtIWEYNwArC+1jszCV7YssY1czoK8MEu3fJb65vXddtO9f7rhlu2WLbzsku89/uja0bHJy664+oijDyckJkybH7Ua+vIX3/PW0z753jPfuGDBfLS2IlLqOLYMCfKYgwPllTsv++W5l199zU0nnXS455NqtUaUZNay3Pxby2p13At8xrWZGW45KhhBgVNXpbf06KOPXnP1X551yL6XXfiDkdGN1Si67PI/nvLKkwh2LNrSwOdLbBdFO+eh780f4mvWRCsirxSyuKkxZkSx+BG8sejUrMrW/Js9RLG84vvf/c63vvfLKy/7zrwFiyeGN6DVO7v8t3946IG1N/311nVjI48/uu7WO+75+833HnLELubAyWbzmOcfeeb7/vvWm+/cbc+d7rht1ac/9e6f//xyLQPz8k2O1pYumveFz79XCuH7XhQnH//IV89408d+ecEXC4USAz99z7ykV1x6zeOrR274098eefixjes23HLrnbfcdu+BB+43MbbRjNtQLKViOl3FZ71J4DXOJeXJk/nL4rA1wNEsBweHucEs//Vv1RrOVma4ib+vYw6FeFCj9cSNmPGENH9iu0VC/14mBQ+4iAUfiYNKqZbIrKlwypOwZhBqDBknk9V6FCXFYrFWq5ZKhSAoNA0acaFQINPygzTXhPiJZ2aWfeDqpHjRpdcM9vdqzn7w7V9VBnv22munq6666f0b1/TPXwH+V5BVHDv1Fa+48MI/vPWtH99nvx1Ds9QXBo484uCf/vTSV73u5Ea99txjn/P8Fx5H6IJV966+7Y77uN9/5NGHXfibP7z5n08pBH6zGfdWSkpMXHX5tccdd5gfhqhdw6YxzMeBMOKVr7z8AvNp3mD/979/Xk+ldOCeu13/51sfvP/e7VYurdfivGn+FkHLNiJVWRkqyPxFC8JHHpOPPUZ225kFXArCFRVIu2nGscj0uGllcOieO29635lf/M/Pvf+IY4+pTaynnHicNOtjl1x23f777/q3W2/7/e+unz9//tJli88//+pDDn8R8+jE5CQPdzj00L0uuOTav//93oGhnuXb7zcx/hvNErT+j4Oit+e++2gCDiGMDn3k4/Soo990/z2rFi5bZC7NPMNaRy+//E8HHrjHX/5828To5OC8ytDQwosvvPLAA/cB+w9oQ2nfn1b7n1Y4s/MvheNY2xwczXJwcJgDZL9n55eBNl+GzqOebCiLoMrKEC2vpVbPH5kFrqYNIFfPqDCmBb7nwLQ4pcp8myi+UQQ7kVqNeizXxxpq6AUUD1JsMBdF9XXrNhqS19/fVyyyOG6CMSdLG+xEUWQYmEYbUKRHU1GHTb/HtqkrlUrVseFfnnfZm9/ysg995P0iGuNhcO/t9x1++OsuuvDaf3rT21J/V9KUuv6lL77/5Jee+fUv//X4Fx5GdPCe977xuOe94b8+8/X3/vs7kHn4F5z3/a9/49yTTz6GkOCd//LKY45609e/eM4Z//q2Shk68338/33m1jvv/cEPPw9ZVZmUyr1E9/T09SA99rRu/vDsC04+9fgvffVjRNYpD0fWP77/vq/++U8v/7ePnEn0mk1/fJuHqVwz/ASq80SKniLfcTvv/vtqjAQ771RggkhBMWwqOnwfQAEVhsV1j6//57d89J9e/6J/ed87CWmUKyXIh5LeSy+54PZbH7jgkq8eeNAhOhmn3vyvfeVr//3FH336s2/vKRR1Ai0LTzn5eZ/9z7OjyeT1bzqZkUqjWeNg6Q4NDqEvJLxcASWReT1v/PPfC0VWqVS0AD4/f6jvj3/4030Prrn6qu+u3G1PJico7/vcp7/0g+/+6owz/mlgsFKfrFnz0qnQ7PRXoi2r3jYzW3LiHeYAjmY5ODg8dcjn0Ui3WvTZ82v4bZpcUxRySKggSsNaCpMuWk0dnid9rcSThVl3Y0KZp5giNLJRoRj0WtnAsDk0tb1NkkRU+nrNZScmqki6fEOlsG80twX2ZlMcg216yP22MW+GBN4exYLgp9//+X13rXrVT1+kDZdKoC/1Lnvtuve+O3316+e89k2v2Tg8tnEEdNb1sbV9C7f71/e/+aWnnLFu7YimY4c+54CvfuOjXzzru9dcd+uK7RauXbuBcn308w4ZHh7Vycghhx70rW999HNn/fCyK/+4cvsV99/z8OrH133vu5/dbsedJsfW1GuxOfC2v90+NtEwPKGn4C9ZNu+uu+76/GfebSa43mgwLQaGtj/8uft+5zs/O/2MV/YOlGrVxibe4+ah9c5oqagH7wDXVClBdlhRMjN/173NZkL22rkY+iRKJIe4l7QZRjwKOkKaP4Ni5ZNnfua6G/6ycqflHzzzQ+buCFNJJPc/YLdLL712p12WHnjggc3JjYqIkl99wQlHfuB9Z5199sUT9YaAUsbm8Scc9dFPffeOe+5/6UuO1LQ+OjL5yONrCQ2V1nfdc+87z/gPJaS5Zr0q/nj9Xz72sXctXLrD6kfuXr1+/fCGye/98Oe777Zix113iSbXSe0VK80Xn3jkv//Hl350zq/f+953UBLjrwAqK5CcJjfM9evMz4bDtgJHsxwcHLYUUkFM6vPZ7raVD/M8GU8HlmgSQqM4aEansTfdVP5QteRNLed3cPhMP6fjAcMtJSXYb6lRmYxrv6ZaRl6tYRjy5Pu+/VEIqF6TUlYq5UpvkUI3FcO7Io/3JFIYnlcIQsZJs9mE+Jf0aKv0rtXZmYAfwaY148vyYhAnazYXL1743e9+avmKJY2JUaiw1EQ2a5/65Ltvu/WeenX9h/79rYPzerUYpixoTmw48YXP+ek5/wWBt3pdJOpNbzr1uGMO/sUvrhgdHd1hx2WvfvULpKQ3/vnmWr3JePO1b3z5wYfsff75V1UnouNOePbLT30hXKW2QSry5S//vwcfeNTMQd9gH9heMLZw4fxvfe0j++y9W3PST
Rotation time is ________
A) intended use of wood B) intensively managing forests for human benefit C) intensively managing forests for plant and animal benefit D) the average interval between types of forests: evergreen or deciduous E) the average interval between successive cuts
How does the burning of fossil fuels affect the environment?
A) Greenhouse gases are released that raise global temperatures. B) Sulfur dioxide is produced, which contributes to acid rain. C) Particulates are released into the atmosphere, which collect on ice caps and glaciers to absorb more heat. D) Increased carbon dioxide in the atmosphere leads to ocean acidification. E) All of the above.