Finding the Percentage: IM 7.4.12
[url=https://im.kendallhunt.com/MS/teachers/2/4/12/preparation.html]“Finding the Percentage”[/url] from IM Grade 7 by [url=https://www.geogebra.org/m/gus8ffvr]Open Up Resources[/url] and Illustrative Mathematics. Licensed under the [url=https://creativecommons.org/licenses/by/4.0/]Creative Commons Attribution 4.0 license[/url].
Table of Contents
- Lesson 7.4.12
- IM 7.4.12 Lesson: Finding the Percentage
- Practice 7.4.12
- IM 7.4.12 Practice: Finding the Percentage
IM 7.4.12 Lesson: Finding the Percentage
What percentage of the car price is the tax?[br][br][img]data:image/png;base64,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[/img]
What percentage of the food cost is the tip?[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAXIAAABwCAYAAAADm/u2AAAgAElEQVR4Ae1dh1sUydP+/pPf3alkFHOOeOZ0BvTMWRAVc0YURRHjgWcEzBn0BHPOEVDwzCgiggFFDGcAvPqet3D2lmWZXURgZqh+nmHZnZ6errdr3qmuru7+P5IkCAgCgoAgoGsE/k/XtZfKCwKCgCAgCJAQuSiBICAICAI6R0CIXOcNKNUXBAQBQUCIXHRAEBAEBAGdIyBErvMGlOoLAoKAICBErkEd+Pfff+nr16/0+fNn+vDhAx+fPn2ivLw8DdaWuK6o36ePHzVbR00CJ5XSNAJ4Ds0PLVdWiFxjrQPFAWE/e/aMonZH0dw5gTR/XhBt3rSJ7t+7x4qlpSqjvq9fv6bI8HBau3oNPXr4SEvVk7oIAt+NQG5uLuv2s4xn9M8//2ju2TMXTIjcHA0N/A9ifJKaSr979aQ6NWpSh7ZtqWO79tT39950/OgxzSkTeg6PU1Ko+2+/cT0vXriouToWp1kVC6w410he/SKg1t7Pnz2jeYFzqXOHDnTo4EFN67UQucZ0EFbAbP9Z5OroRAuDgyk7O5s+fvxIKY8e0ZfPnzVW23y3SkpKCnXr0oU6tGlLF85f0LTCqwGYl5tL9+/dZ8zxgEsyNgJo47S0NLp7545VnX369CnNnTOHvLp1pz3R0exC1CoiQuQaaxn4xKu7V6WaHtXpw/v3rDxaJhVY5CDyrp27UHsdEzkwTn6QTL29ehJ6FVodj9CYuuq6OtDdWTP9qU+vXlZJOicnh5IfPKAL589T1uvXVsleKwAIkWulJb7V41VmJrk5OVOTBg11QSZGIXIQ98oVf1LDevXp/LnzhJ6RJOMigBf3mzdvuBfZs3v3Ip815NOyIaW0kBC5gkQ5f75/946SEhMpevducq7iQLVr1KRdO3dS9O4o9s+9fPGCawilAum8ePGCrly+TAdi91PU7t20d88eOnXiJKWmptKXL1+sKh+uhZWB7uSZU6f5GtwPZVy9coVePH/O11kqLr6DsFMfP6azZ85wnXDd0cNH6PatW/QwOZl6du9RLItcKfPevXt05vQZloHliN7D7pnUx6kmGZAXx8uXL+na1at0YH++zHuiounkiRNcL0uZkR84Zb7MZGKO3RdjukdsTAxduXyFB5SRB3gcOXSYvLp1IxcHR1oQNJ927cjHHl1qy7LLWVXk9iVEAO0ZHxdHK8LCqKqrG3k2a2Z61v7au5efQ+gPesdx167R4YOHuNeJ35DwLCTeSKQjhw/zc5j5TS/37f2LdSx23z5+nt6+fWvV0i9h9a1eLkRuFZay/REKcu/uXVq2ZCkNGTCQHH6pxIQCd0X337qSzwhvSkpMYjIDEd++fZtCgoOpd89e7Jvu1iV/oBGujWmTp9CFc+c5FNBSClx78cIFmjF1GnVq1546tG3H12Ogsl/v3lzmndu3C1knUFwQKK5r82srate6DeGe/fv0pdG+vrRu7VoaPmRosYgcoZUYQBo10pd6dO3G5UFelD+wf38ma9wXCWSLiJ3FISFcT2CC+0Petq1a05RJk+j82XMcrqnIzC+e1FQKDppPXTp2os7tO/A1kLl5k6aM6+6du5ikjx87TiNHeFPt6jUY+1aenuwqwn3wgnr/7r3ppaKUL5/6RQAEu3jRIurUvgM5VqpMVV1cTe2NoIKNGzZwez9NS6PpU6bSr81bMEFDD5HQW4NeNWvUmHbu2EF/LFvOz2ivHl6sYy2+6deaVavoWUZGmeiOELkG9BFEjhAnWImHDhxgi7xerdps/YKUYRW8yXrDb3dYsOP9xlJrz5YUMNOf9sfE0vlz55gUly1ZQq08W1K/3n0o8cYNVjiUjQPEduvWLerT63dq3rgJLV28hA7uP0Dnzp5li3z2rAAmxXFj/OjO7TsmVHDtkydPaMSwYVTLozrf8/ChQ3xPWLEYkAWhdmzbzm4ixwOBHkTL5i2oe5ffKDI8gstDXWL27aPtW7eybxL3Rnpw/z5NHD+eZfOfPoP2x/4n8/Kly8izWXN+qf198yZhwBLX4aUFfEDOQXPncrnA6fixY/ygBs9fwBYVHkr4+HEOuKE3tGbVau4lwMWCFx/KUupiAkb+0S0CMCLi4+Npy6bNVM3Vjdq0/JWfNbT3pYsXObAA7Q0inzZlCuspeovmRL4gKIhqVK3GL/qxY8bQpo0b6czp06xHWzZt4igz6N7ypUsJcyxKW3+EyDWmjuimwUferHETk+IoVURXb/PGTUxOUydPpvSnTwsoCAZHI9aFU6N69WnyhIkcAwsFwoHIl3F+Y5mMEe+NspTESvv0KfnPmEE1qnlQ+Nq1nB/nQXRLFy+mmh4eNGXSZHZv/PvNUsb57DdvaMmiReRUuQq1b93GZtQK7vXq1Svq0bUruTo5E14KeEDwu7UEEt2xfTtVc3OjiePGU9qTtAJ5IdemDRupfu065Dd6NL17947PY3ISHrSmDRtRZmZmgWtwn08fPxXAAHKOHzuW3J1d+GHEd0nGRQD6hl4ujBPookLS5hLbIvJqbu7cgwSBw12jJJR9+dJlatygIbVo2pSuJyQU0j8l74/6FCL/UUj+oHKKInJY1A+TH9JIbx9q16o1++0syQ/fM9LT6bdOnalOzVr0JPUJW+K4Fj51Dzd3avtrq29kXJA4kefYkaNsVY8YOox93/jt/fv3hMEg+I7hV7QkXRBefFw8W7L2RK2gzL3Re/hlg64oXgSWcihQ4vdHjx4xwaJ7C2vdMi++Z2VlUfs2bbiLDPxwD1hB9WrXYYI/dfIkW9X43fJ65V5C5AoSFeMTelBSIkd0WYC/P4+1mKOGshEqPHP6dKpZzYP+DAuz+qIwv6ak/wuRlxTBH3x9UUQOAkWMNsgJRJv25EmhO0OB0G2E7xqW5eWLlyg3J4eJDYOSsPS9unYr0lWAuFm4MGDFYiAH98SLoUvHjlweJipZJpAj/PuN6zew6VpB/VCfUT4jyd3FlbZu3sKEa1mm8h33Bwk3qFuXfL196HHKY+WU6RNlwmpHrC9i75WXDX4LX7uOu86IcQ8JXkgXz1/4L0bcogcgRG6CtEL8A70pKZGjx4ceMHzulgn6hMF4uG7QE8Z33LO0khB5aSH7neUWReRQhBPHjzNZgWzhUrBMTJS5ueQ9fAQT7/at2+jzp89M5PD9gcgxQFqUzxeTj2bPmkW1qldn6xf3RCQNegCw5uErt0wg8kcPH/LsN1sWOeqHLihmrcLCv/X336qWCoj84IEDLDPcPkXKnJNDgwcMJDdnF9q2davpoXmTlUU7tm3nAVL0UDDoiTEA/IaXlrmFDlnFtWLZusb9/qOIHH529FotE/QJRgieuQF9+5l00jLfj/ouRP6jkPxB5agROQbqYHVOmjCxQISGcmuFyH19RrKbYduWrWzxgrAwkMhE3ssWkQewDx5uDCgjBk0RGeLhXrVIIses066dO9tlkecTuRe5ODrR/fv37SbyAP9ZqjIPGzKUX16w8lFvJYH8EYmDAdKJ4ydwBAJ6HPCnw48JbJCEyBXEKsbnjyJy6BvGpiwT9On0qVP8zPXv21eI3BIgo38visgV1wosS4T6WbOOFYu3b+/erECXLlw0+Ybv3r3Lv/Xo1r1IixwLdSGUr0GdunTowMECrhWEaMHnbplAhIgqadG0mV1EDgUfNGAAv5DwsoArqKiEshEnjgiekd7evKaLZV7IjB4GQijxkou7lu/HV/LhPMrBfdLT03mW3oSx49h3iXU0EGeOJESuIFYxPn8UkSMw4G12diHQoE+YA4LnZoyvrxB5IYQM/kNRRA4ySk5OJp/hI6h1y5aESS1QRvOE7xj4wyg8/HcYKMR1ODDYiSiRdq1b80pu+M084VpY/HCPIJY2ISGBr4P/DyQJVwgmBFneEy+YpKQktoZtuVZwP+Rfu2YN1a1Vmwb17/+fz9q8Mt/+Rx3hthnn50dNGzWmqF27Ct0f9YGVj5hgEDleRopsOGdZX+S9fOkSjyNgLCEhPp7vphA53DPnzp3jB89KleQngyAAvYDeKlEraH/LZCtqJX+wcxbrnLme4X8Mdk6fOpWfQ4T6Qu/N81jeq6TfxbVSUgR/8PVFETmU4OM/HwkxqhjIRGw0QgjNSQvKuHrlSh4QHT54CFubuA4HLFK4ZLCGC2a0mSsWyoBVsWhhCJe9dvVqnlCE65CPfccuLuw/R3gf8ivlYnlPTIrg8EM71lrBdSBbTPyBqwdx8eZ1UcpVPiET4soR3z1/3jz2R5rLjGsR942eCmLk4edXrsW5rxYPEH4DeQ/o25d9lwgNQ8J9EN6IOh09clS1p/CDm1yKKwcEoCNwCSLWu27NWtzeit4o1bFF5Bg3gpvu2tVrJosbZUDHYHRhdjZCgSX8UEG0An0ykTu78KQdKIR5gpJgvW+4BuBumBMwmy1W5EN0Cbp5nk2b8XohN5NuFiBIkN/jx4+pcYMG1KRhQyY/KDIIDMvQYs1zKPTQQYMJ1yoJ98zIyMj3k7u508L5C3i2Gu4J63/dmrXUsG69/JmibdpyZAiuUUsg18iICH6IEO0C9wnKQ13Qc0DPAFPqlXLgRsLEDLyEEO6FCTz5MmfwOuiYqYlzmP2pvGTgbsFEjQ2R69lHjvywxpEHA7p4CCEzXkRIOI8ol0b1G7CsmMma8yWHXr96xefU5JFz+kQAOtKlQ0c2EkKXL2cjAToCQwMJRK7M7MSSFNBbJOgpJgRBh9CzhAGBZS6gS9AjDHJiJjHcKnMDA9n1xxeW4h+xyEsR3O8pGotmQQHgc4ZSWCYQVcqjFF7qFtYErHPlgDWJiBBYANYiU1AeyByj6MirXIdPhElhuj3CFC3vi3vevXOXoz5M17i4cD2xuBcm5KAngHXT7VmPHASN+v21Zy+TuanMb7LgJRU8f76pt4H7g8znBQbyGu3m+SEHpvgjugYPmEL+eCAxVRquEvP8+B+4TZ86jXFE2Ui4DtfPmDaNqletyvigHfCwKla+ZVvId30jgLZHNBfGhFydnFhP4GqZPmUK6wMim6APrVp4UnRUlEkfFSKHawXT8MeOHkO1a9Tg5wH6pTxbCxcs4EgrRSdLEy0h8tJE9zvKxlt99apVTI4KyVgWA8UAUaH7hoW1VoSGsTWJ5TbffVuox5ry4DeUiUiOhPgEjoHFtXCNwJ9uToRF3RPdSKwS+GfYCl4PBSvIgZSx3CfC+jDz0p6k1AXXXrt2jWVAXWDh38RUewuXCPLjN/jpo3bt5vxwqWARL3N3j3JvyIlJQXixhK9bZyofkTwPHjywKivuAQwQqYP4YMiI2H1gjXOSjIWAolMvnr+gndt38MQdtDsG73EOzxJ6i1s2b+b1jRQdUIgc41AI8X2b/ZbXsd8QGcl6tnXLFp7nYanDpYmeEHlpovsdZUNZQEJFkbhSpHk+JT8+8buicEpey0+1ay3zmn9Xu045Z+veluUp15nLoMhhnhf/q+W1dt+i8hdVvrV7oAxrZVvWTb7rEwGlfc31T2lvfCq6ovwGKc2JHOGHWLnU/Hrlf/NrShsdIfLSRljKFwQEAUMhUIDIt1iPIy9rgYXIyxpxuZ8gIAjoGgEhcl03n1S+OAigW4mQR/iXJQkCekYAuoyxHOgz3CYgcgzGY0EsjLmYryRaXnKKRV5eyBv8vlB4RM/cuH7dpr/f4FCIeDpHALqM+Q4IJsBqnSByDLRj7R6EyX78FsJanmIKkZcn+ga+N5R95YoVvFa5tUWFDCy6iGYwBEDk2PoPa/xjHgKiUbB+D5Z9RhQVdL28kxB5ebeAQe8Pl0rYH6G8WUVZbXdlUChFrHJGAMS9fds23pnr7p07ZL6xSjlXzXR7IXITFPLPj0QA/kTMlvMbNZpXOYRVI0kQ0CMC8I9vXL+BRgwdynMMtKjLQuR61Cwd1BmTcbCfJjZUxqQdLSq/DmCUKmoAAUw4Q+/ydy8vXg5ai7osRK4BRTFiFV6+eEELsNN44yYFdiA3oqwik7ERwPLNQXPn8eBmdFR0oSUstCC9ELkWWsGAdcBSsbP9Z/Eu45s3bdKk8hsQdhGpFBBA5NXcOYE0sF9/Xp7C2k5VpXDbYhUpRF4suCSzPQig64lRfqyUuHBBMK9ZgpUSJQkCekMAMeQnjh3nlUaXLl5MIcHBVjd1KW+5hMjLuwUMdn8oPnyKWA1xRWgob+IwZ1YArzJnMFFFHIMjAF2GARIRHs7jPdhwJHD2bB7z0ZroQuRaaxGd1wehWtgfFHtsYk3v/A2dA3h1OeyagodDkiCgBwTQs8QqoVi//uzpM4SVPpctWUrrVq/R3NLGQuR60Cgd1THr9Wv2I8KtgsiVvNxcOnb0KM2YOo135tHiiL+O4JWqliECr1+/5s1aFswLImx5CCPl1KlTbKRgDAjftZKEyLXSEjqvByxtxNtittt4v7G8QQVEwu/YZXxOQAAtDllEz58/F6tc521t9OpDZzGh7fSpU7zLVHxcHOss6/KHD7xuOTaNeJKaqhldFiI3ulaWgXxQcFgnUHifEd60Jzqat0lTbo3zaWlp5OvjQ+sjIk3dUvwuSRDQEgLQSUy5T0xMJL/Ro2lPVBRvpGxeRxD4tMmTeb0VbAWIXmZ567IQuXkLyf/FRgBKjHAsuE969+zFMePWdtT5mveV7ty+Q4P6D6CQ4IWUmZnJ5F/eD0CxBZYLDIuAuS7379OXd7yypsswWrBv7LgxfhQYEFDmuwFZa4BiETkeOhwQWA7BAJbL3zdv0qQJE6hd6zZM5vCJF5WgO3CtTJowkePL90bvoc+fPokuyfNksmq/98VeUm4COd+9e5f36OzUrj0dPXxEdTEs3A8bhc+e6U9e3brxYD786N/Li0r9i3p2bP1eLCLHgwvrC4MAN5OS6Mzp04SHEfvdyVFxMMC+hpgggY2eW7dsSevWrKE3WVmmh1FN6aCw0KPjx47R8CFDybNpM5o4bjxPgRYdqjg6hLaO3h1FRw4dpqtXrvCO9VjXG+MsIMPiJEWncH16ejqHvB4+eJD3s7WlU/m6PIc38G7l2ZJWr1zF/IY6oFy1hPPId+XKFRo1ciS1bN6CfH1G0rIlS+ziQ3AnngNseI4gAQQHFFd2pX42iVwBCaE358+do7mz5/D6GV7dupOvtw+H5mBUV44KhEFQEGGjWTyAIGV7lF5ROOUT1+BadFEPxO7nzY5FhyqQDs0LosCA2eyeGNC3H3Vq34HJEOT+5MkT3sTBFpFCl6BHiPU+cfw4l9WxfQeegTll0iSaFxhok5cWh4TQ5o0beZ4DNj6HZW7PfRU9VuoAXUa998fG8svAHl2eNXMmjR7pS927/MZuydDlf/ACc1hwrrh1UCVyFAYf0d83/+a1BoYOGkwR69bxjut4c+K8HIJBcZUOyi96I3qj6ADIGBs2YJxl7Bg/GuXjQ0cOHzYNipuTpvn/uC796VNatHAhk3fMX/so6/V/PUOl/OJ+mt/Drv9LyIPg0lu3blHQ3Lk0YugwdusUd9chVSLHm+Hypcu8oDqmWqc8SvmuN5ZdYEgmQUAQqNAIgJixCcm+vX/RGN9RtG3rVnr1LSrEEhiQ86vMTApZEExTJ0+mjPSM7+oZWpZbXt8hOwg9Zt8+djmePXOWjWjIaU8qksjRVUhKTOSJHOFr1/G+dMqbzZ6CJY8gIAgIAsVFABwDUrt69SqN8xtLu3fu4iUfLMsBP+3Ytp3du68yXxXbFWFZnha+K7LDdz529Bh6mJzMhrM9dbNK5AAyIyOD1xdYErKIuzj2FCZ5BAFBQBAoKQIKoR09coTG+/lR3LVrbK3idyR8gp9+79mT4uPi6d+v9lmtJa1XWVwP2TDoiZnQmHOB/+1JVokcF8NHhRl6KY8eGeJtZw8YkkcQEAS0gwBcDSvCwmj50qWE9e1BcjgwIBkZEUHTJk8pQPDaqXnJagIZ4+LieM4FXlj4bitZJfLnz55zeBm2N7KnEFs3kfOCgCAgCBQXAXgGHqc85siOq1eumkgbARg9unbj8TvkMVoC52J8csSw4XTs6DHVeHZF9kJEDmBu3LhB3sOGM4hC5ApU8ikICAJljQD4J3j+AlofEcEDofnknkItmzWnd2/flnV1yuR+kBm9jo0bNnK0IEjdVipA5Cjg4z8feZJPgL8/vwmEyG1BKOcFAUGgtBAA/5w9e5bXPcFMShD5rp07OarFiNa4giPkTrx+gyfdIb7dVipE5Ji1uWhhCO3etYtBs1WAnBcEBAFBoLQQAKFhMmKfXr3o7p07bKliIg0m8RiZyIEnehy/tvDkZS1s4VuAyAFMRno6+QwfwVPwxRq3BZ+cFwQEgdJEAByEUEPElZ85fYZjq4cMHMRLzBqdyCFfj65d6XpCgk2ICxJ5Xh7HLmIgAWtISxIEBAFBoDwRAJHn5ebR/HnzaE9UNK/11KVjR0q8ccPwFjmIHMugHD50yGYTFCByvPmwDi+WcBRr3CZ2kkEQEARKGQEm8rw8XphtzapVbGDC3ZCamlohiHzWjJk8KcoWzAWIHHGbWBjL19tbiNwWcnJeEBAEygQBWKY7d+ygP5Yt41meTRs15glBRnet4CU2b04gbYhcbxPnQkR+6uRJXi9aLHKb2EkGQUAQKAMEQNiHDh7k7QKx5net6jWY0I3OUZBv1Z8r6c+wFTZRLkDkiF3EsqInT5wQi9wmdJJBEBAEygIBEBqWiMXGx5h1HrkuvEKERkPu6wnXCZOhbKUCRI4L4SfHzClJgoAgIAhoBQEYmeAlWOfY3AZcVRES3N05X3JsilqAyG3mlgyCgCAgCAgCmkNAiFxzTSIVEgQEAUGgeAiYiBzz+d9mZ1P2Gxxv5BAMRAdEB0QHylsHsrPpw/sPNlndROQI76nq4kqOlSqTwy+V5BAMRAdEB0QHylkHwMfDBg+xn8hnTJtGTpWrUO3qNXhnc89mzXmFMawyZqQDcjVp0JCq/PwLv7RaNG1GRpYVu9TX8qhOlX/6mVwcHLltjdSelrJAXrQtjuZNmhhKdwvJ2qw51atdh2WF8dWiaVND6zKeVXdnF6r88y/kWq0GedRrTB71mxj2qFanAVX5pRI/u7aY3GSRg8hhkWPJyPT0dHr27JkhDyzUjt3fnas4UN2atSgtLY0nFxhVXrTlgqD5bFm1a93a0G2LNoS8ro5O/NJ6cP++IXVY0VXo8tbNW1hWEJyRdRmyPn36lHr3+p0cKztQj9nLafzRmzTh2C3DHj47TpOza1Wq9L+fbPE4FSDyaq5utCI0jFcYQ3iPEQ+ELyUnJ7Py169T1xTSZERZIRPCtsJCQ7n30alDR0O3LeRF+KybkzOTOcZ7jNquStvGxsSQq5Mz4dlVwvOMKDOeW4TiDRowkJyqOFKfxZE0M+45+Se8NN4R/5Jmxr+kcUeSyMXd4zuJPOw/Irf5GtBhBnMib1CnrmnXER2KYrPKysOuEHnnb0Ru80IdZ8CLi4ncyZkH7nUsis2qQ5djY2JZXnMit3mhDjNAl/GSHlyAyF+Qf0KmMY/4lzReiLxoTRUizysaHAOcqWhEvj+2IJGD8IyYhMjVW7Wwa0UscnXEdHRWLPJsHbVW8asKo0SIXCxyaI4QeU6OYaf7CpELkRf/9aDNK8QiV28XIXIhcnUN0dlZca2Ia8UQfnPxkaszj/jIxUeuriH6OSuuFRnsVLRVLHKxyBVdMMSnWORikYtFjjhyGew0BKFBCPGRi4/cKMosPnL1lhSLXCxydQ3R2VmxyMUiF4tcLHKd0ZZ6dcUiF4tcXUP0c1YscvW2EotcLHJ1DdHZWbHIxSIXi1wscp3Rlnp1xSIXi1xdQ/RzVixy9bYSi1wscnUN0dlZscjFIheLXCxyndGWenXFIheLXF1D9HNWLHL1thKLXCxydQ3R2VmxyMUiF4tcLHKd0ZZ6dcUiF4tcXUP0c1YscvW2EotcLHJ1DdHZWbHIxSIXi1wscp3Rlnp1xSIXi1xdQ/RzVixy9bYSi1wscnUN0dlZscjFIheLXCxyndGWenXFIheLXF1D9HNWLHL1thKLXCxydQ3R2VmxyMUiF4tcLHKd0ZZ6dcUiF4tcXUP0c1YscvW2EotcLHJ1DdHZWbHIxSIXi1wscp3Rlnp1xSIXi1xdQ/RzVixy9bYSi1wscnUN0dlZscjFIheLXCxyndGWenXFIheLXF1D9HNWLHL1thKLXCxydQ3R2VmxyMUiF4tcLHKd0ZZ6dcUiF4tcXUP0c1YscvW2EotcLHJ1DdHZWbHIxSIXixwWeWgY4WHAG9CIx9evXyk5OZlcHBypfp269OXLF8JvRpQVMqEtw0JDybFSZerUoaOh2xby5ubmkpuTM7k6OlH2m2zDtitkhd7GxsSQq5MzVXN1M7QuQ9acnBwaNGAgOVVxpD6LI2lm3AsyBGknZBaUI/4l+ce/pPFHksjF3YMq/e8nm+ZUIYs87I9QBgwEYMQDD/qDBw/IuYoD1atdhz5//swPvxFlhUxQ/j+WLycHEHn7DoZuW0VekDiOrNdZhtRhRVehyzH79rGsVV1cDa/LMLoG9h9AjpUdqPeiCJpx9RmTOQjdcMe15zTucCK5uFUrPpHDkhk6aDBFRkTQhsj1hjzWR0TS4pBF5FS5ClV3r0oR68IJvxlVXrTlkIGDyOGXStSofgNDty3aMDI8gl/STlUcaNWfKw3brpAVejtpwgSWFy8uI+vy+sj1FBEeQa1b/koOlaqQZz9v8poTSl6BYYY9ukwOIicnF6r808/2W+Sz/WexQoDMq7m5k4eBD3cXV3Y1wN2ALqmRZUVb4iEHkTtWrmL4toW8kBWH0dsWeovnldu2IuiyqxtzFOR1cnAiZ2c3cnEx5uHs4kbOzq7ck0Yb20om18rNpCSaPGEijfcbS+PG+Bn+GDVyJI3xHWV4OZW2RE9L+b8ifPr6jKww8g4fMpTGjh5TYeT1Hja8wsgKPt62dastHicTkdvMKRkEAUFAEBAENImAELkmm0UqJQgIAsFRjmUAAABgSURBVIKA/QgIkduPleQUBAQBQUCTCAiRa7JZpFKCgCAgCNiPgBC5/VhJTkFAEBAENImAELkmm0UqJQgIAoKA/QgIkduPleQUBAQBQUCTCAiRa7JZpFKCgCAgCNiPwP8D0m8682K0r9EAAAAASUVORK5CYII=[/img]
What percentage of the shirt cost is the discount?[br][br][img]data:image/png;base64,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[/img]
A salesperson sold a car for $18,250 and their commission is $693.50. What percentage of the sale price is their commission?
The bill for a meal was $33.75. The customer left $40.00. What percentage of the bill was the tip?
The original price of a bicycle was $375. Now it is on sale for $295. What percentage of the original price was the markdown?
To make a Koch snowflake, [br][list][*]Start with an equilateral triangle. This is step 1.[/*][*]Divide each side into 3 equal pieces. Construct a smaller equilateral triangle on the middle third. This is step 2.[/*][*]Do the same to each of the newly created sides. This is step 3.[/*][*]Keep repeating this process.[/*][/list][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAbEAAACqCAYAAAAjtnFdAAAgAElEQVR4Ae29h3tUR7I2/v0B3/397t67jiSbjAhKSEI555wzEhJIQhJCIgslQASTDAZEDjY5B5NMzjkJMAYbsAkOeNdhvbvedMP7PW/LA2IYSTOjSWem+3nmmZkT+vR5q7qqurq6+v9AFomAREAiIBGQCCgUgf+j0HbLZksEJAISAYmARAA2q8T+8Y9/YMeOHYiJicGdO3fwP//zP5IdJALtRuD7779HTU2N+PC3LBKB9iJA2UQZRVlFmUXZJcsLBGxSiZEpvv32W3h7e+P1jp0xfcYMfPPNNy9Qkb8kAnog8L//+7/YvHkznN0GiQ9/85gsEoH2IEDZRBlFWUWZRdklje4XiNqkEvv555/RsHgx3hnghLBRtXD28sXhI0ekhfOCL+QvPRB4+PAh0jKz4JGSIz5pGVngMVkkAvoiwFEXZRNlFGUVZRZlF2WYLE0I2JwS++c//4nGxkYM8vJBdOUMjPnkGhwiElA+djw+//xzyRcSAb0Q+K//+i80NDTAKzoRgxs2iQ9/8xjPySIR0AcByiTKJsooyirKLMouyjDKMllge3NiHJpPnjoNvTz9Mf7oLUy58S1yFm+GW0gk1q1fj7/85S+SLyQCOiNw69YtBIVHInrsFFSe/Ex8osfWi2M8J4tEQFcEKIsokyibchZvErKKMouyizJMToE0IWpTI7G//e1vOHL0KFx8A5Dy3lLUNz7D1Jvfo+b8A3hmFyKnoAjXr1+X8xi69jYbvp5zXnT51NbWwS0qEcWbj6L+xnfiU7L5qDjGc7xGzo/ZMKPo+OrkFcoiyiTKJsooyirKLMouyjDKMso0Wy82o8TIFGJoPmYc+ofGoOb8Q8EUZAx+CtcfhHt0IubMfR9/+tOfbJ0v5PtricB///d/4+rVqxjg4obUGUtQc65J2KiMIx7jOV7Da2WRCGiDAGUQZRFlEmWTSk418dVDIcPKx4wTMs3WjSObUWJ//etfsWHjRjj6BiJvxfaXmIKMMenKU4SMrEZ0ShpOnz4to3+06Wk2fg2Fx08//YShw4bBLT5dzFk0Fzb8zXkMnuM1vNbWBY6Ns4xWr8/IQ8ogyiLKJMomdb6iDKMso0yjbLPlYhNKjIKDQ/OsvKFwS83D5Ktfv8IUZJKyXWfgnpiJspHl+OWXX2yZL+S7a4EAXTlHjx7Fm526YOjqXZh05ckrfMVjPPdGp844duyYdP9ogautX0LZQxkkZNGuM6/wFGUVZRhlGWWarU+B2IQS+/XXXzFr1iw4BIajdOtxjUxBxmCQR+K0RfAOi8THH39s631Jvn8rCNAwevr0KSKiouCZVYjqs1+0yFc8x2t4Le+Ro7FWgJWnhOyhDKIsokxSH4Wp/lOWUaZRtlHG2WqxCSVGCzg6JR2h5TWYdPXVobmKKfg99tB1+A8pRVJyMv74xz/aKl/I924DAboG163fgA49+mDk7nOYcr1lYcNz5XvOiWt5D++VxfoRoFuQyoVRhtp+vv76ayQkJgoZRFnUXDap/6YsC62oFbLtk08+0foZbAtdkNYSom/1SuwPf/gDKkaNhkdSFir2XmiVKcgkk699jbzl2+EWHI4VK1ZYf0+Tb6gzAgzQuHHjBvxCwpoMIw1uxFcEzpWn4lrew3tlkIfOsCvqBq4NZCBZSUkJhpeUoKS0FCWlI1r9FJeWIj0jA/08fIUMoixS5yP1/5RplG3+gYEYXszntP4Mni8uKUVZWRkWLlxoFWsYrVqJ0W2za9cuBMQmInl6g8YJUnWm4P/KE3cQOaoW/oFBePTokQzyUJT4MH5juT5nzvvz0NvDF2MOXnu+VEMTL6mOMTSa1/Ie3ivX+BifTuZ8Ao0Urg/sP8AefT39EFo0GpFlE1v8RIyYAPekLLzWoROCR1QKGaTinda+GfSRPK0B7zq6oI+HL1hP68+phFdaLnrY9cO4cePwr3/9y5wwGeTZVq3EHj9+jIzswQgcWqYxcqwl5phy/RuUbjsOp+BITJs2DX//+98NArasRPkI0AVz6PBh+IRFIn7yPLEerCU+Uj/O9WO8h/eyDmtx5yifqoZ/AxrQnI4YM3YsujoPQvGmI5hw7PbzhfCqBfHi+8QdMY3hnlmAXt7BKNl6HJRB6vzT0n9GwHoOHo7e/mEYvumw5mf8tgCfI7f42jlwcB6Ic+fOWYWBbrVKjJbQ8uXL4R4ejdylWzDlmvZMQWapPnsfSVM+gIOLq0zxYvg+rtgaHzx4gHETq+EYkYDxx25rLWhUAoj38F7WwbpksV4EOMpheih7J2ckT1uEqjOag38YaViy9Rg69ndC/OT5Qvao+EWbb8o2yji7wEjE1s5tcX6WRhSVqWd8mhiFWYsRZbVK7P79+wgMDUPEqFpMOP6pzsKG7p9xhxvRPzASo0aPBrfVkFFl1itwtHkzhtSv37ABnhExyJz/kc48pRJIvJd1sC6ZcUEb5JV7Db04M2bMgL1/iIiMVp/nopzh9AVHUnYBERh7uFEr97SKl1TflHGh5bXo4RnQ4tx/5YnPEFc1E4Fh4bh9+7ZyQVVrudUpMSoaWhjTpk0X7kAOzWmBqIity/eky48xuGEj3u3VB6dOn5YCR415bOkv+Yodf0hBEdwzhqL63H29eIr8x3tZB+tindI4sl5OYoTid999Bw8vL8SMn/rK6L3u0iMMXb0br3frJWQNZY4uMkp1LWUcZV0f/3AEl1ZisojCbkqrx2vonuQCaSalnj17tlW4EVVcY3VKjFFB9+7dQy+7fmLCU5VzTEVsXb9rLz6CQ1QyBufl48HDh1LgqDjHxr45YpozZw4GRcVj6Icf6yVomvMe62BdrFOOxqyfmdasWQNn3wDkrdjxPNkCR2Gj9l2Cc3ymkDGUNc15RNfflHVJ0xbhje69f1v28WIKZfyxWwgsqEBSSiqePHliVYBbnRLjPjsFBYVwCI0VQ3NdGUH9elo4pdtPijU+23fskFnurYr9tX+ZS5cuISIuASFlVW2uNVTnIU3/ucaHdbFO1i2LdSPAtVnR0dEIGlaO0QeuCGVVc+Eh0t9fjde79xYyRl+PUXP+ojuyX3AMXBKzny/Ap7JMnbkMvpGxWLdundUBbVVKjBbtyVOn8NpbHZC3cqfGNEDNCa7tby5W9c0fiajEZFy7ds3qmEC+UOsIcF6jvLwcHomZQthMvfnCTaMtD7163TNRF+tk3TICtnUaKP0sXcZckOwZGILkGUsw+cpTEWTRLyRGyJbWFsu/yjtNScs1HWeaM472/r/X30L+ql2ou/xYKE23+AyUlZfjhx9+UDqUr7TfapQYmeSrr75CSnoGXJNzRCQQLRBNhNbnGENT7Tz9MH/BAhHk8QqS8oDVInDgwAH4hEUgZUYD9J2z0MRzrIt1sm4+QxbrRuDPf/4zSsvK4JeRJ6IJoyZMQ3d33xYDMTTxTFvHKPMYBUkZOCA8ARX7LiJy/DREJKbg0KFDVrnI3mqUGFP5bN66Fd3snX5bZ9FyGqC2GEHT+cnXvhG7qgbFxOPIkSNWNTFq3aKjfW9Hy5VZFPxyijD6wGUYZhSmsqSfiTpZN59hjVZy+9C3rrtpaF+8eBGRCUnoGxgpohGjKmeAskWTzNH3GEd1DPLo0NcRQaUT0M/TD+/Nmo0ff/zRugD97W2sQolxTRjdfBHxiQgoGmNwplAxExcVusamYkJVtcjkYZUcIV/qJQTWrl2Lgf7ByFu+zWDuaRU/8Vu4f5ZvE8/gs2QxDwKMIuQyGhqozCtorIhRzo1NmjwZ7/TqA4eoJJ2SMDTnm7Z+UzFSFr7Z0w7hUdFCefIdjVG499nJkydFFKaxntFau61CiTGEdd6CBejrHYCRe84Z1KppzizMKJ0ycyn8YxOxceNGmXGhNc5S+DkaRkzGGhwahrARla+ERjfni/b+5gJoPoPP4jP5bFlMi4Dw5GzZAh9fX+zbt89o6Zi4/OeDBQswwMtPyJLWstS3l68oCzs7uKK0bKTI42gMRBmHcO7ceQQEBmLevHlm2dtM8UqMq+IPHzmC4NgEcGhuiAif1piHAsc3pxi5wwqMxhjGYDZZp24I0BqfP38+7Dx8MWLbCZ3SALXGP5rOcQ0Pn8Fn8Zm2vsmhbpRq/9VclnPlyhWER8egq6MLYuPiRW5LYxgTTApM2UEZok/GF03809IxykLKxKCYBBw+fNjgipmj1YcPH2JEeQU69XWAvfNA3Lx1y+TGveKVGPMjTqiuaUrlc6TRaKOw54zS+Ay5S7bAOyYJCxctklFl7ZchFlcDDaM7dz5DfwcnxNXM1jkN0HNeuama+2r7m2nO+Cw+k8+2hsSsFkfYFhpENyI9OT1dvZA2eyU69uorttlhIIYhCyNQKTMoOyhDphow8Kwlnht3pFHIRspIykpDFrpGd+zchf7uXiLBejc3b0ysrsazZ8+M5o7V1H5FKzF29E2bNsM7IgZpc1YaX4H9JpSYcSFsVB1CoqKtKn2LJgaxtWO0LinUqmtr8a6zh0hZZsgo15aEDZ/B1EF8Jp8t05yZhvM4CmMyZv/IGERPfA815x8iZGQVvP0DcPfePYNuVcLsLJQZlB3tyfjSEg+1dJyykTKSstJQxhHnvpgXMiM3T0RC1lz4ElkL1qF73/44e/acSY17RSuxL774Ajl5+XBPzzcpU5BZmC3aPTYF4ydMMBhjmKbbyqe0hsA//vEPnD9/Hu/07I3sRRt+S9/T9kiqJQGiy3GmCuIz+Wy2gW2RxbgIcKftseMnoH9IjMj+Xt/4nchl+Haf/pg7bx64H6EhCpUHZQVlBmWHLnzR3mtFmrP0fCErKTMNUThKXdTQADtPf7HjB9vIRMb9Q2MxtGi4SG5trOAY9fYrVonRX82UPe6R8WJxnymG5s2ZqWmNzxI4ug4SWxqoAyv/KxMB+vjZCfuHxRkkM0dzntHmNzN58NlsA9sii/EQ4GiCGSw8w+nJWfU88S5D1Jm+yd51EC5cuGCQQBtue0JZkTJjiUHXGmrDU5SNXABNWUmZaYi5PkYjRiWnihD+Fwu1n6Fowyd4t78Dtm/fLna1Nh71XtSsWCV29epVRMYnILyiVrgAtCKmDnMUbdVH90/F3ovwzshDVlaWsJpNZXm8IJ/8ZUgE6OPftm0bejq5oGDtfpPMWbzCZ43PxLPZBraFbZLFOAjcvXsX2Xn58M4ZjqrTn780Oqo68zn6BoRjbOVEfPnll3o3gDKBI2rKCMoKygxTuKfV+YpuUspKykzKzvYUjk4rJ06ES3QSRu2/9BJu9CZ45xYjKSOr3c/Rto2KVGIM6+SupF5JmSjefMQsTEEmYUqX/JU70NfFTewgbSh/s7bEk9cZDgEKG641TMrMhnduiaCtuiAw1X/yFdvAtrBN0jgyHJ1VNTHUfe7cufCMSRIp6tSjmqlouIOFk28gtm3frvccD2UCd5enjKCsIG1NxUfNn8P3oaykzKTs1DfpNHlx586dCIpLQsKUD54nM27+rLKdp2HvH4p58z8QG4OqMDfWtyKV2NGjR+EZFIqUGYvBCcXmAJr0d+MzjD9+GwEFFQgNC8O3335rkKG6sYgt620ZAe7C+8HChXAMDEfp9hPm46nfvAVsA9vCNrFtshgWgcuXL4vMGZFjJ4OjLk1ygxGjbim5yB9eglu3buncALrtKBMoGygjKCtMPe3R/L0oKykzKTspQ/Upjx49Qm7+UPjnFmPsJ9c04sbRWMSYyQhPTBHPMfYCaEUpMVoBzFKfO2QIfDOHNuUcM0GYanNGUP/NyczSrcfR1d4ZK1auxC+//KIPb8h7zIgAO9mxY8cQlZyG8NGTzDIXps5XnBtjW9gmts3YgsCM8Jv80XTRMsjCWwtPzrAP92JQRBwWLmrQuW9TFlAmUDZQRlBWqNPZpP/FFMgFITspQylLdRnlM5Jz5cqV8I5OQPbCdeCO0i21n25TJrceP7EKDJ4xZlGUEqNlwwnDAe7eTWmAzDQ0VyccLZzwUZPgExCIW7dvy2hFDRzLjAi0Zk+dOmVxH1qlJSPKMCg+XcxZqNPXXP8pCNgmto1ttETsSFPS1hyF8oDzM7rismnTJvS2s4PX4CIRDcpNKVv60KXIPIfBYeHYvHmzTs/atXu3kAmUDWb1GDWLBWBAGlOo9XPzxKpVq0S6KG3xO3jwIDy9vOAUmYC02StaxIxYMpBkUHo+XDy9sHDhQp1wO3v2LO7cuaM1SylGiamG5mHhEQgqHGX01e66CC7608cdvYmuzu6YMWuWyCGmNQVs5EJmKigqKoKHjx+C45IQmpRmER+2ZaC7B/q4eiCxfgGMmQZIF57itWwL28S2sY2WhhtpSZqStuYoDJhglJy7uwd8Q8IQkpCiFU+5BYWhS39H9PYNgX1kYpsfZprv7uwG9+Bwreonb3PdGTNYUCZQNqjPuenKC4a8nplC/IaORNfu3eEdHKo1br5RcXinvyN6ePiLDPltYdfLJxhdndzEvKK2/T0gKhY+fn6or6/XmqUUo8S4LmHFihXo0s8eI3aeNmoaIH0YhkyaNHURXLz9cOrUabnGR40Fv/nmGyHwerp6IrZmtpg0p5Vr7k9M9Sx0cXSDW1oexh252aJ7RB+eMMQ9bBPbxjayrebGS/V80pC0LCwsFCma1Mhtkr90b3Ek2G+APRwiE0XCA1X7zPmdMe9DBJaMx2vv9kDi1IUWpcDIkyLN2Y5TeKNHH6GMUmevsAi+ypz/IULKJuKd7j3EKFFbJlKEEiOzcpGeg5MzoidMB7fhNoSAMHQddRe/EtbdqLHjRFiuLv5mbQmm5Ov27t0LbmUTX/c+XqwtMc1CYk20Zhtiq2ejb1AUBjdsskieYrvZNraRbbUU3EjDwOh4kKbmLMygPm/+fHSyG4BR+y9bAD7PMHr/ZXgPKRWyoPbiVxbJV5ShUROm4227ASj/+LxF4Dbm4FWx83VYWJhO+UMVocSYgqd+6jR07O+EylN3zRZSr0kQqh8bsnwb+rp5YuvWrXJuTE26UeBMmz4dfbwDX1lfoo6jKf5zzqmbmw9CR9WaPOOLLu/HjAtsI9vKNutyrzGu5dog0pC0JE3NWWgoMlefs7MzwsqrMfHUXbPiw+CN1Fkr8I6zOygLjIG/IepkyD1lacd+TggqrcSEE3fM2lbixhGs4yAPsXmnLjxl8UqM6zm42t3O0Rnpc1dh8jUzR/g0myTVxEy1lx5hUNoQ5AwrELnFdCGGtV/LCDtmQIhJTkXA8LGov2HYjUs10aOlY3y277By4U4p2ngITDfU0rXmPs62sY3cqZdtNjdupB1pSFpaQtQk58a2bNmCbv3tUbT+oFmjALkZpUvSYLilDgFlgbl5p7XnU5ZSpnbo64CCj/aaFbfS7Sfhm5GHYQUFOmf6sHgl9uDBA5SMLId9WBxqzj0w6zqL1hji+bnGZxi+8RAGhkbj/XnzYOhM2EpXdAw7Xr3mQ/R29RApap7j1oZxYMjraIUWrj+Izg4uSJ6+2CwZX3R9H2ZcYFvZZrad76BrHYa4nmmFSDvS0FKWk3A0xrYkJiUhYEgxRh+4YhZsSKOIsVNgFxghZIA514RpRevGZ0KmMs2ZR3YhRu17OfuGVnUYoN/WXHiIaG4ZExkNrt/TdRrGopUY13Ns3bYNDl5+GLJ8u+UrsN8ISj84Jyjj0jJx+vRppesdg7aflvu9e/eQmTtEZL+edOWpSelK4V936RGc4zPhnJAp1hpa8ihMJUjYxoq9F0Sb2Xa+g0kVWeMzkFauyTmCdqShJYzCmjMnd2Ue6OWLrPkfwhxzUUNX74FDVDKCR0w0y/NVvKLTd+MzIVu7uvmIwJhaMySP4Fo8n4R0seO1PnvpWawSoza+ceMGMvOGwjOrANTWOhHHABZCe543YscpeCdnY9yECQbLhN28wyr5Nxn1wMGDsHN2Re7SrSbNFD/pyhMMXrxJuFByl21VjrC5+b1oK9tM9w/fge/SHh7V5V5mYSCtSDPSTh9hY2yepdFbUloK37RclG47YVIlX3nyDnzyRmBgQibY93XB1tzXUra6ZxZgYGIWSrYcMzFunyGwcBTSBufqlRWFPGWxSuzHH3/E/AUL4RoWI+YDzE1oXZ9PAcPcYkFxiSKCy9KsVmMLlNbqp4HCdDwjRpajX1Akxh+9ZZIwZM4ljT10Xbh7PLOLmiazzeSW05WfxPXcc+zEHbDtdFnxXUwxP8blI6QRaUWakXa6unxa4wdDnrt48SJComMRXzO7xXRSemHfilFMfLiXVr+QGCRM/sCkxoWh3oVzroyAZcSiejJkQz1DvR7ixq2HfGMSsXzFCr2XJVmkEqPA5yLGuPRMBJdNVCRTkGAM+Q3IK0XOkDyzraUxpIAwZF2cjOeW8L3s+iJt9nKTzEsxyi95xhK80cMOxVuOmnUiW71Da/ufUVxsO9+B72KKzRU510MakVakGWlnqYVtmzJlCnwTMzBszccmMY64ls8pLgNeOcWiz2tLS0u6jkY3Za1DVAryV+0yCW40jNyTc1AyskLsP6YvT1mkEmPC0/GVlXBPSMfI3WcVNTRvzphc08NFl+4hkVi7dq1MDqzGpXRJ1dXVYYB/qKAzF2E2x8+Qv1ULPJlFILB4vJhTMmT9pqyL82F8B74LXVfGxo19kDQirSzRjajGVvjss8+QnJ6JwMLRRg+5Zx/ngubefqGir1vCOj59eZF0dopNg2/+SLFBqL71aHMfcaIR5hMWhT179rRLNlqcEuMojAsoA6LjET9pnkncJdqAru813HI+bGQVfP0D5GhMTdqQ1lzj4+DohLjqmUbtOHTDRU6Yhg79HDH++KcWHVLfFq8xyIPvwHfhOxlzjU/lyc8EbUgj0koJbnEmR5g+fTr6e/lh8KINRh1VjDvSiK5u3gguqwL7elu0s+TzdE1T5tKtSPco3X3Gai9TcXEt3Zhx4/HkyRM1yaDbX4tTYhyFpaalwXtwEcYebjQaiMYijnq9jCAbvukIHPyC8d5771nsXIJubGPYq5cvX47+Ht4oWLvPKEYLrT4mJe3q6iU6qTqNlPqfAofvxHczxgiAQo00GeDhDdJIKYXh9hUVFfj3378Gh+hk443GGp8heGQVenoHiT5u0mjRVubo2sPPlLkeWYVid3EaMO2pq8V7G58hbFQd/u21NzBy5Eh89dVX7WIti1NizI/oHsY0QBsxxYiWQIsAG4E5OG+RRJeDnZ3Ycp7JjGV5gQC3hAiPiEDI8DEYc+i6wTvO6INX4Tt0pEgDVH3mC4PXb0peav4svguT2PLd+I7NzxniN2kRPHwMwsLDxbYdLyhm2b+4CaV/VBwGhMfDLiAC8ZPnGxwbGg1cV/V6995IrF9okrlJQ9C0rTooc7MXbUQf/3DE1c41OG4c3TEt15s9+8IpPh0DBnmCuwq0Z0Nhi1JiDx8+RGBICCJH1xnVtdQWIQ19XhDuwBU4hcejtLTUYhaJWoooootq9+7dcA8IQcb7qw0acs/Q8NSZy4S1nLVwnaLdiOp8Sbci34kjAb4j31X9Gn3/sy7Swj0gWNBGCW5E8jMjJ9MyMuGfV4rhmw6LYAXiM+rAZYNhQ0yrzz0QiZn7h8Zi9IHLRnW96UtDfe/jCCy0ohbdPfxQsd+wC6C5JY1HZgH6hcSKnabd04Ygr7AIt2/f1lscWYwSYydh+n23yHgM3/CJUdwj+hLVEPdxMj6nYSO6dO+Bk6dO6b09uN6UtvAbuaSioLAIAYMLwO3NDYE56xix/aQQNtzbqKUdfA31LHPUw3fiuzHTPd/VUG0gDUgL0oS0UUKhDKEnxzMiFjmLN6Hu8mMUrN0vQt/p9jPUNjusN3/1bvxnl24iRJx921C4W0I9HGUyMwuXDDAbv6Fwm3T5CYZ9tBevde2JrA/Wggurme7KPTJeZDfSN2jIIpQY3WuNjY1wHuSBlGkLUWVFLh8VU9JfzuSkznEZyM7JxePHj+X8WDPJyHVHzG4SFpeImKr3BIOrsNP3m50kYtxU9A+Nw7APPzbpIk5926zrfeQrvhvfke9qiIwLrIM0IC1IE0tdE9aMfcRP7nQRGBKKqDGTngdZcM0T5w7fcR4E5jVsb7AC8R7zyTURxce+zD5tDXNh6nxHGcyoy84OrmIBdHvnXIkRg2Cc4tLhFJsu6ENPArPph46sQnx6Fs6fP69OUq3+m12JsYNwInbEiBFwiUnBqL0X281o6gSxlP+Tr30jEpT2dByIbTt2mD0DuFYcYsKLyAd1kybDJzHDIHkVC9cdEBP7TAMk8m4aYb7TEniL78Z3ZBAD37m9baIV7pOUIWhBmiihMCJx2rRpIjkCc5eqhC6VVvmec7CPSIRHZqFQ8u1ROpzfTp+7WuyoIZINXzPespD20rE99xM37phgH5WEQWn5wn3aHtyorDLnf4QOdkw2vO+lNZrMEuKTko2x48frtUu42ZXY3//+d5w4cQLd7fqJYA5z5DxrD7F1vXfKtW/gPWQE4lPT0XjzZrvWRyhBuOjaxqtXryJ1cC4Ci0aj6qz+QRh0szHggfkRizcfabdg15XOpr6e78h35Tu3x21KzAOLxggakBZKKFRgN2/ehPMgdyRr8ORwZJn5wVq81asfmN9Q33RdVIyl246L3QTYh9mXTU1nUz6PsphBHm/2sEPeyp2YdPmxXu9LdyTXM9KQ8Bw8XOTgbP4edMcyuxF3dT506JDOI3+zKjH6sOlWy8weDJfEbLG/jcVnfjaANV+26wx6DfJGw5Kl4JICWV4gQKNm2bJlcA+PEYlJ9bH+eA/z/PUJCEf85Hl6d77mHc3Sf1PA8F35znx3fXFjom1iv3TZMpAWll7oyfnpp59QVlYG58gEkcH+lXdnuq7jn4qkz44xKcKtpY9bkQEP3F2byxrYhy2dJ9rdvt/2HBuYkCVG+U1pznRfO0aXa9yk98W6MM61vkKfm9+L5NYBucXIzsnROdesWZUYtynZsXMn3urWE8Vbjln8Xo5D0PwAACAASURBVGHtZorfFCCJGD5mMoKj43D8xAnQkpTlBQKc2ygsGQGX+Ay9RhWcB2E2cffMYRaxiaSh+Kateuj+4Tvz3fXJf8cRHDEvKC7F559//oIgFvyLivbMmTN4q3MX5C7Z0mImFqbrGr7xMP6zc9fnQQVt4dn8PEdhHI0wZyX7riZB3Px6a/nNPccom197t4eIVmUKMl3ejbgNXbNH4BZaXtMibsw6k7NkC5x9AkTIvS7RsGZTYmzkp59+irDoGJHmxNqH5uqEH3/sFuz8QlFVUyvCgi1YTpi8aQz0YdaWgb4BYtM+XQQGr02dtRxdXb1FpnfV3Ig6/tb4n+/K7PZ8d2KgK27cIJGYE3slrGXkKOzp06dITk2DQ2QSKk/cEXMtFLyaPnQrMrybKaJG7j6nEz7M8+dfOAq9fEPAvmuN/NPSO1E2MxVVH/8w4RZkQEZL16ofn3DsNgKLx4msJgyI0UQX1TGO9IKHj4WHh4dOEbFmU2I//PADFjY0oHN/R4w90mjSPaXUgTbHfyFsZy6Dd3i02JVWF8vD5FrFDA/kep/aSZPRzdVL+9FY4zNxbRcnNwSPqAQ7kDloa85n8p357sRAzI1pmaWf1xJrYk7slVC49cqOHTvwb//+OwSWTEDye0uQOntFy5+Zy8Qo6v/+52uInvgeJp6+pxV/0PWYOmuZcNWmzFyqk/IzJy8Y7NmNz4SM7tjPsQm3U3e1w63xmTBCO9kPhGNMqjCsWqNPysxlIkCpwzvvYs6cOVqzoFmUGAU2gzl8QsMRUzXTYOsQDEY0A8x7adMW+oo9M/KRX1CE+/fva000W7iQLtZLly7BJyhUhI5rM4dBiy5s9GT08PAXmd6NmRhXG/qa4xq+M7PcEwNiQUzaagexZXg+sSbmSnFv/+lPf8KaNWvg4+ODoPBIhETFIDS65Q/PB0dEwcXVFT2cBzUtu9AiKxDdtNwMlOvxJp4yUiomE8mctnihpfMMzoiumimSTtOtqk1/ZEYTz/Q89Lbri4DgkFZpQ7qRPkHhEQgJDcXUqVO1FnNmUWIM5phYWwv7kGhwG4OWgLP242QETsJ7xSRiwYIF7Uq9ojXFFXQhF9k2LF6Czv0cRYqf1lyDdHmUf3web/XuL9LlWONaQ237A9+dKYOIBTFpzVVPTJkGiBgTa6UsbCYbU9myvZxD1eXDSMbQiEiElY4Xe7K1hivn0qImTMOAsPimgBktlF5r9Sn5HGU1kwP7F40Wa+VaexcaTxyghMYnCU+TLvShQa+LN8DkSuyf//yneCnviBikz1mllUZvDSyln6NLI7y8GnEpaWInawXpGKM3lULqi/v3ER4VDb9h5ag+e79Fg4c4+uSXifmO0fuvPF8npHT+0Kf9TYrpisCCmLTmNiOmxJYYE2uljMLaw3z0BG3duhXe4VHImLvqpTVL6niXbDkqcjCGjKxqFUf1+6zxP41uymzmo+Sca2tpzriw3CMuFZOm1INTR8YsJldid+/exbDiEuFGU/rWBYZgVM6NcXGpV0I6qqqr8euvvxqT3oqrm6lotm7dhnfs+omFvJrWqtRdeoxhH+7FW336I/391S1GqBmCXkqpg2tviAUxITbESL3txJKLo9/p009grG/aH8UxFSC2lRlWWIiAwYViMbQ6NvzPdVJ+BRVgWD77qC6BMprqs4ZjlNmD0vLEZ2QLywyIW+DwsUhIzwJ32jZ2xheTKjEK6AULF8InNknvtSzWwAjq78DV7En1C+AdHCbS/ChRKBirzewAtORSUlLgnTVMuH+aCxP+ZgZ35g4cEJ4gUpY1P6+Ota38JwZ0KxITYkOMmuPC34wG884chuTkZIGxsYWNsXhEn3r5rlxYG5aQgtjqWRoNHy6M7ukVKBbiWnPGF136BPmGUyDcISBqwnSNuNFoGhgUjmXLl5skK5FJldj169dFpoqQEZWobkc2Bl1AV8q13FXVJyMPwwoKZJZ7NalEF9fx48cxwMUNOYvWv5QfkOtWmM6GOd64rXpr82ZK4QVDtZNYEBNiQ4yar/FhuDmxJKbE1hbciGpsJbaXqa2bBI/4NJFXsTnuTC81MDEbrim5it5dvvk7Geo3ZXdQaaXIwMEgoub1Mrv/oNQhyC0oxJ07d9QhN8p/kykxuiomVlXD20B58ZoDZw2/meE5d+kW9B3ohn379ilinY5ROLKFSilkS0pK4JGQgbKdp8RcKn30TAPkEJ0C94xhYG5Ka+AFQ74DMSE2xIhYETN+iCGxJKa2qMBUbEZ3V1JmtnB/qVLeUflnL1wPhobnLN0C9k1D0sQa6qJ71Sk2Db7DKp4blRylDW7YhP6u7ti/f7/JMr6YRIlx6M5V9V6BwUiYPN8m0gDpw6iM/gnIL0NoWJiwEm3JvaMSKq1937p1C64enkia8oFISMqghNjq2SKdzYgdhtuGRB/aWfI9xIZbwRMrYkZrmRgSS2Jqy4UZP5hiy9E/WCSmpYLnmjkuUfDJG2HT0dOt8XRTmrP56O7hLzJyEDdOi/TxCUbF6DFiEbqp+MokSowRiWlpafDOyBM5sloDx5bPcS1G2c4z6NCjNz788EMZ5KGhFzBTuVt4jFjjQ1dZ36BIhJRXvzTfY8s8pOndaSETI2JFzLh1CzEklrJApNjKKygU7jEqMG5B8nrXnmJfO0PtpaWJLko/VrH3AtxSh6B/WJwwjpKmN6CnXT9hGJky44tJlNjOnTth7+6F3CWbWw3LVDpRDdF+WspR46fC3sEBX375JWQmj5fF7KNHjxAZEwuP9HyxALVfcHSba1YMQRel18GUP8SKi3aJHTEklrIANLL37t0nZFTkuKl4q3c/sfibfVHpdDdm+xlin7N4s8gOEzl+Kt7q1Rdz5r6v13Yq7eFDoyoxusN+/vlnBIeEIKR4rMgebQtZ6tvDOPTHU+B0G+iOaTNm6JzRuT3MoIR7//Wvf2H16tVwdHNHF0c3YTW3tpi3PbSwpnuJEUcYxIzYrVq1Si6u/43hKaeePHmCcRMq8fvOXfGOk5vogzJI6PvWlTg3ujzcCL9hFXitS1e4DXIXhrcpR2EkoVGV2N/+9jcsXrwYfd19wEWDXP1uTYLBWO8y6cpTJE1fDCd3T5y/cAH/+Mc/lKBfTNbGs2fPIjg8Ai7JOaITGYsO1lYvBQ4xI3bEUJYXCHBHjZ27duH/f/1N0C3GPmht9DfG+3A0VrzpCN51GIicnByThNS/oFrTL6MpMVrM9z7/HM4uroieME37JK4WnkPMGIygXifnMKpO38OAkGiMHD0GX331lTrdbPY/+YqGkVdUPLIXbZAh9Tr0FxF1t2iDwI4YEktZmhBgHysbNRp9AyNE32MfVO+X8r/mkRnnEaM5BeLohHv37pmcr4ymxLjZ45T6qejm4ik2qpNDc80M0FrHYJjvQL9AYSHaUjaF1gQr157EJCaLVF0y44vuPEXMmOaMGJpqHU9r9LSEc+xbHIWxr7HPtdYn5blXeY6yffSBK0LWU+abeqNfoygxhq2eP39e+N6TZyyWIfU6WMvNO0nNhYcYlJorFg7evn3b6OlbLEGgtNYG8tWU+np4xiajYO0+GZGoB19xhEHsiCGxJKa2XDgfxr6VW1Ak+hr7XPM+KH+/qrQ0YcKQe8p6zrdS9puSrwyuxMgUjHoaOWq0SBRZe/FLKWz0EDYqRilcux8DgyNFhnH67W25XLlyBW7ePkiq5zoxGTmm4hFdv4kdMSSWxNSWC/sUs/e7hESCfU1XLOX1TUqOxhFlPZMDU/ZTB1AXmKIYXIkxmOPjj/fCbqAbhizbKpmiHQqMHYRbGgQUjUF8eqawcEzFGKZgPm2fwXdmcEvR8OFwT0gXu/JK4aGdhdwSTtzZmFgSU2Jrq3zFUUN8WqboY9rsvdYSnvJ4Ez9S5lP2UwdQF5iiGFyJcWiePjgXLonZre5jJImuvRBiXsWBUYmYUFkJWxyNMS3SyZMn8W7P3shbsQOTrsg0QO3tP8SQWBJTYmuLqafYl9inBkYmomz3WWlwt9PgJk9yKQdlP3UAdYEpikGVGLcLX7xkCew8/FC85ZhkCgMwBRmD+e/i6uYiMCZe5CQzBWNYyjM4QuBaw7CwMPjmDMf4o9xEVUaOtVeJEUNiSUyJLTG2tdEY8/uxT7Fvybyb2hvVbfEeZT91AHUBdYKxi0GV2OnTpxGbmoGQsonSWjaQAlMxDKN//AYXISd3CL7//ntj84XF1M9OsGHDRnTq2QclW47JtYYG5Cuu2ySmxJYYm0LgWApjsQ+xL7FPsW+p+pn8br8y4yifOoC6gDrB2MVgSuwPf/gDqmtqMCg2Vc5ZGFDQqDoVBU7WB2vhHRkn8iragtXMlf/c1twvIBAhZVVNwRxy/Y7hBG7jM4EpsSXGxNrU2RaMLeA01c++w9yk7EvsUzIJQ/sVl0pOqb4550pdQJ1A3WDMYhAlRqbYs2cPQuKTkTBpnhyFGUGJkTnGHb2JiIpqhEVG4eHDh8bkC4uom8w/5/156OHiIdcaGomnVGt8iDGxNrbAMSRjUe5wwTbXJeny+fTTTxESESH6EvuUSvDKb8MpM47GqAuC45Owdu1afPbZZ1p/uGD6m2++0ZpVDKLEmHcsv6AQ/rnFGLX/smQKIwqcgrX74RoajTlz5li11cykrOfOnYNXUAhia+fIzBxG4ikKbioyYkysiTmxV0JhO7lge+zYsaisrkFV3aQ2P5U1tcjKzoZjQBjYl2QSBsMpLnUjgLrAP2c4nN3ckZCSirTc/DY/yVmDkZScgrlz52rNgu1WYoxqWrNmDXyi4sXQXDKF8ZiCTDLx1D2xF5SblzdoUVprlvvHjx9j/MRq9AuMQFNmDhnMoS4kDPf/mcCYWBNzYq+EwqUB3Kewa7fusPP0g19OEQLzR7T4CRhSgv7+ofjPtzsirnaO6EuGw9C4/V6J7aQuoLu2U39nsT8bM91HT3yvxQ93EPDIKsDbnTqbVonRrRURE4vwkVUYf/SWHIUZ0WImI3NRYfnH5+EcHocxY8eKkHtrmx/jav8dO3diUFAY0ueukjxlZJ5SCUhiTcyJvSkzLuirMMn3X3/9NbIH54ich2W7zqDyxB1MPHX3lU/lyc+ES9opLh19g6JEH5L5EY2veKkTgsuq0Mc/HKP2XWq1L084fhtRYybB1z9AJ0OqXSMx+qNnzpwJt/DYpl1R5aR7q0RSCYv2fnMb9cEL16NL9x7g9upKcf9oI6womO7evYthxSUYGJ8BmQbI+IJGxY/EmpgTe9JACcYRR2N0gXZ+tytyGjaCfUP1Ps2/mW29cN0B/L5LN2QtWIfaC19qvK75PfJ3+3lPpDn7aJ8wHEJGVovkDZpwZXANF0q7BISIbYK0kRWqa/RWYmRwTsDZOzkjqX6B2NlTU+PksfYzgiYMaVk6RacgK3swvvvuO0UIHBXTtfZNodTQsFikAeIOxJreXR4zDk8RV2LOFEwNDQ2K2QKICXzLy8vhEBItrP1XRliNzzDh2G04RqfAISoF7DuSh4zHQ+rYcnPRxPoP0MHOXkSuv0Kfm99j9MGrCMgbgZjYOJ23c9FbiXEurLi4GC5RiSjfc14uQDWRy0fFIEyRU7rtBH7foSM+3rsX1pLlnrn84lPT4V8wSka5mpinyFuMKiP28alpismryHlhzuP16mPXlFfz7BcvKSmOzrIWrMW/v9lB9BmZXsp0CqxJXj0TOmJAeDxcU3Ix5fo3L9GH/5OmLYJ3SDg+OXRIZ4NcLyVG9xU31evaszdyl25G3aVHLzVKJWjltxGZpfGZwN0nrwxRcfFiVKwE909rozAq4gkTJsA9Pg2lW49D7gJuRP5pSUE2PhPYkwakhVKMI65vmzv3fTgFhKJow0HU3/hOyCRa/UzbZhcYCZ+8EU2ySk57mFxeU0fkLNmM197tKUb7dO+q9MOI7SfhlZyN8ooK/PLLL62JCI3ndFZiFJRcS5KUnAzP9HyxdknT8FDVQPltPEFE3DkK7jHQHQ1Llph8Hx+NHNWOg4cOHUJIbIKIHJOGkfH4pq0+Sezja+cIWpAmSikcjYVGRP4WZNa0/otBHjHVs9DFaRDK95xDfWOTcmsLA3nesPxHWcU1eW5peegbHI0JJ+6IILW6S48RWl6DmOQ0MTDSxxDXWYkxaebWbdvQpXdfFK0/KLfxbsmiNdFxJtyMGFePwMhoEW6s1IwLXKw6JC8fAbnDReSYFCKGFSK64skIWNKCNDH1Jof6Kk3y/rp16+ARFoXsBesw6fITDF2zB338wxAxbqpMSG4imdQSr0268lTojDd69EHa7JWoOf9QBARyb7vZc+bqNQojr+ikxMgkDOaIjI2H37By0Qjp8jGvsCHDMPebfXAUaidPwdOnT/WVAWa7j9bXli1b4BkaJdaVcF6mpY4gj5uG30gDrvEhTTZv3qzzPIW5mImZHnLy8hGYV4K8lTsRWDJeuBJH75f5Ec3edxqfCZ1B3cF9xxgt6plZgMFDC3Dz5k29WUYnJUaLbGHDYuG+Kt97AVNufCuFjZmtGzIm/f8pM5fCPzoeO3bsVFzIPRVvRHQMwkdUYuyh65KnLICnyFekBWlC2ijFOKJBxOz0wXGJGBAaK0K72TdUc2RmF+QWQltz4UCdQd1B965Lcg6cfQOwbv16/Prrr8ZXYlwTxmCOwMgY4b6S82CmsYi1Zbbxx27DPSUXRaVlePDggd4MYeobObpfuHAhHP2CUbiOaYBejlzS9v3ldYbnR9KCNCFtSCOluKp//PFHESTwescucE3OAfuG5A/D84e+mFJ3cArkdx26IHdInsip2B65o/VIjCvjayZNhp1vyG97OlkOKPqCaW33DV60ET4xiWIfH663svRCofjVV1/B2dUN8TWzRJYFa6OJ0t+HgRGkDWlEWilBkZH3p8+YAQe/YLBPKJ0G1th+7mXX3cMfo8eNF3zVHlmllRLjKGznzp3wDIlAysxlkiks1CVQff4BAopGi2SbTIxqyYVuH4bTVldXw847UPMiVQvF2RqFSkvvRKuZ6YJII9KKNNMngsyUvEjeT0hJE32BfaKld5PHzTsQoS6hTqFuoY7Rt2ilxJgfcVjRcLHiXaYBMi/h2+p4RRs+gUdsMiZOnGjRVjOZlpO5//H73yN74XrUXZRrDduirbnOkzakEWlFmrVH4OgrqLS9jyNF8r57TDIK1x+UCsyCDUHqEmZRoW5pz9ZSbSoxZuZYtGgR3MNjkLdih4jtN1dnks9tW4HWXfwK8XVz4RsSigsXLmjb901+3bfffov8YQXoFxKDylN3JV9ZsLDhaIw0Iq1IM9LOUgt53jc4VPQB9gUpM9qWGebCiHxFnULdQh1DXaNPaVOJXb9+HUkZWQgqHte0s64FdzZzEcOSnkvGYDZv38yhGDJkCP72t7/pwxdGvYdZID7+eC+62fVHwboDLSYFtSRcbb0tTNVEWpFmpJ0lZvIgr5PnyftlO89Iw0gBsrr63H2hW6hjqGv0Ka0qMTJqVXU1vJMyQTcVBaStd2YlvD8zLjDLvYtvAHbv3q0PXxjtHs6ncM4iOSMTXoOLUHf5sUwvpQBhw/WgpBVpRtqRhpY2N0ZeJ8+T92XGF8sdgTWXodQp1C3UMdQ1+hhHrSqxkydPIjgmTqSg4erq5g+Xvy2bScZ8cg1BBeWIiY3FDz/8YDGbZzL8eeny5ejn6YfizUclTylBgTVrI2lG2pGGpKUlFCYAJo/HxsUJnifvS/lk2fKpOX2oW5jmjLqGOkfX0qIS++mnn5CXPxT+2cOEe6r5Q+Vvy2cQZlwYvuET9B3khdWrV1vEJoecdOdOvBEJyQitqAP3EJK8ZPm81JxGpBlpRxqSlpYQcs8NPMnj5HXyvMz4oiyeIn9xCoS6hjqHukeXolGJ0U3Aobmbf1BTGiC6fJpZY/K3MpiEa3wix0yCu6eniP7Rd+JUF4Zq7VruezapfiqcQmNkfkQF9yfmVSQNSUvS1JyFPM3INncvL0SOniTXGiqUryZdfix0DXUOdY8urmqNSoxZ6iOjohCQP0JkfuYD5Ed5GHD32rJdp9Ghdz/Mmj3brO4fhmXv2rULAVFxiJ74ntiBV/KU8niKNOP+XKQhaUmamjPkni5N8jZ5vGznabFjs+QrZfIVdxmgzomIjBQ7pWhrHGlUYh9++CG6dOuGqPFTkbd8G4au2ik/CsUgt2EjXBOz0G+APW7dumU298+zZ88wfPhw9Hb3QeqMxZbFTyt3IG/5dgxZvk0kjWXiWEv5iDYt346hK3dYFGakIWlJmpK25ih0ZZKnydvkcfK6NrIqf8VvtF6xQzs6r9jRxBukgy5yYOUO5C7bKsLI88hjlsJXqvdZodv75K/8DYcV27V7Fx2fQ11DndOlazdQB2lbNCqx0tJSODo5YYDTQDi4uMmPgjGwd3FFfydn9OrdG3v37m1Xok1tmUrTdQyfTUtLg12//hbHT30dnfFm53fwuw6d0bGfIzoNcLaID9vCNrFtbKOl9UXSkjTVNzRaE5/ocoxJY8nT5G3yOHldG4y62/XF7958G2/0sNOKzm/17offvd0JHd/tplX9qjbYOTji337/Gt7o3hsd+ztp9SxT8B7f59/feBvv9OylNWZ8p9797fG7N9/C6916oaMWfeTNnn3xHx06oXP3nlrjRp1D3UMdpG3RqMS+//574We+f/8+5Md6MGD4qi6+Zm2ZSJvrOPnORbJfWCBPffrppygbORK9PXyRs3gTKvZesIgP28I2sW1so6X1RdKSNCVtzVHIy+RpXXHhRp9UwCEjq1G67USbtI6pmQ1Hb3+8N3OmTs86c/asmKtzScpG8ZajbT7HFHxHl2vC5Pno/G43bN++HZ9/8YXW73Tp8mW4uLrCe3CR2BesrfaGlNfA1dcfS5ct0/oZpCXnOKmDtC0alRhDVjlhKj/WhYG5FBiZkc+m+8cSeeqf//wnTp06hejkVPgXjBLrobjZqDk/XJPFtkQnpYqwY7bRErEjTc3NV7riwhEc80C6Ryei4KO9rdJ5/LFbGBifgYLhxUIQa/sszhP+/PPP2LhxI97o8i6KNx8Ra9fMyVN89ogdp+CRmIn8/Hxwg2O2U9t3YmLlpUuXwiM8WgRhTL76tEXsKvZdhHN0MipGjwH3eNP2GarrqIO0LRqVmLY3y+skAtaCAAVOw5IlcPAPxfBNh80ejcs2sC1sE9smi2ERuH37NqLiExFWXo2q0/c00psLcZNnLIZfdBy279ih8z59FMSM3oyNj4dvbjHGH72l8TmmivbmeqzE+g/g4R+Ic+fO6QXo48ePkZ07BP5DSjH20A2N78M9w7iTdnhiCjjqpWIyZpFKzJjoyroVgwBHE0xum5WXD/eM/KZMImYKV+YojG1gW9gmc450FENAHRtKF+jCRYvgE5uMnMWbNWYjGnPwKuxDotu1YzpHOp988gn6DnRD7pLNMFc+RyrkwvUH4J2QjtraOr0yYxBiKqRt27YhKC4JSdMWadz/j6M9x6AIzJ77vk5uQR1J+PxyqcSeQyF/2DoCdK/s3LUb9p4+IqrMVBay+nMY0cY2sC1skyzGQeCLL75AftFw+A4uwrijN18aVUy53jSaCI5uyiKh72iCBgjn7QqLiuCZnIWRe85pVJjqPGDo/1wzGlZehbiUNDQ2NrYLULoHx1dOhEdSFso/vvASblxo7jesAvFpGbh8+bJJMgVJJdYucsqbrQ0Bbvw4fEQZ7MPjRcJrU+YL5bOYEJXPZhvYFlmMhwAV05YtW+AXHY/UmctAxUXlQTqM3H0WvQd5Y/HSZQYZTdB9RzdeyrRFqD57/yXBb2iFpV5f/Y3vkLt0C7xjEtHQ0KCzW1SdAnSTHj9+HBFJqQgfM/mlDClMEt3X3RsbNm0ymRtcKjF1Csn/No0A3UwUOP0cByJt7ipMuvzEZAKHz0qfu0o8m20wV9SfLTHAkydPUFldg4FRSRA5F39LdOw7dKSYM2NUqC5BBi1hR7diXV0dPONTRWQfFYu6sjHW/wnHb8M7qwBDi4rB0achCheZz5v/ARwDw1G6/YRQ/FwE75KYjey8fIM9R5u2SiWmDUryGptC4I9//CPqJk1Gd1cvjDl0HZyoNpaAUdXLZ/BZ3d28xLPZBlmMjwAV1NGjRxEcE4+oCdNEBCGTHHfq2Qc7du4yqDuXCjEyNh7hFTWoOvO50XmKvMXRZcp7S+EbFSdGnYbMdXnt2jUkZw2Gd04xas4/wJBl29DNrh+OHTtm0i2gpBIzfj+RT1AYAuzodOX17NULcdWzTOL+oYuJz+Iz+WxDChuFwW/y5jID/oKFC9Hd2U1sCzIwLgNpGZkG3/yTCnPhwoXwjIrH4IaNJpkbY0Rk/6BITKyuEaHuhgSXSxW2btuG7vZOyFqwDr28AlE+apRB3K+6tFMqMV3QktfaDALcYHH58uXoZu+MEdtPwpjuH9bNZ3Szd8KyZctMasXaDEFbeVEGXzDYISI2Dt3cvPHam2/hypUr7Z470vTIp0+fImdIHtxTh6Dy5GdGH41xziogMgYnTpwwSpQrFyZzt+/fd+mGjp064969e0YPqVfHVSoxdUTkf4kAIOZBuCVEUEgIggpHGXWND61lPoPP4jMNMQcjiagbAowC3bVrNzp16YJRo0YJN6IxljYwmGTFihVw9PZDQv0Co47GGDn4tp09ps2YYfBRmApdLoA+f/48HJ2cRSLmv/zlL6pTJvuWSsxkUMsHKQ0BCjGm5nFgyP2SzWCGAtUclqG+WSfr5jP4LGMITqXhbo720nBgIuOtW7eKoARjuXP/9Kc/YfSYMXi9Q0f0D43F6AOXDc5Tqrkwr5xikXszPiGx3WH1LdGE/PrLL7/g7Nmzwv1qDgNMKrGWqCOPSwQAsX0NN+rzyy5A+Z7zBhc4rJN18xmWslOyrRKeiosjMn3XhGmD2759+xAanySi+AaExyOsou55aL+hKZ+HVwAAEsFJREFUDCOmlypcdwAd+zkheEQVHHwCsaihQSgbbdqo6zVUXByRmcsAk0pMV4rJ620OAUZb+UdEIan+A7FflaGEDfd7S6pfAP+IaBHRZXPA2tgLc6Q3JH8oAvNKUPDRPsRUzUIPzwCUbD1uMOOIa9yYRssxJhUDE7LEHmvBIyoRn5ElRkvmUjTGJLVUYsZEV9ZtFQjQXVJZWQnvpCwUM69i47P2C53GZ6Iu1sm6+QxZrBcBjlaYDNhLJM/9SGwyXLL1GOwjE+GVW/LSguH2GEl1Fx+JSEFu/zJ09W6xZICZ+r0SM1BdWwtrXLohlZj19hv5ZgZE4NKlSyKVTtjIKoOE3DOknnUxPQ/rlsW6EeCi6rDIKERW1GDs4abEudXnHiBj3hp0sh+IYR/ta/d6REa5jtp/Wcy1uWcOQ9XZLzD15jMxlxtf9z5C4hJBd6Y55q2MSV2pxIyJrqzbahCgz3/+/PnwiEpA/sqdqG/UP+MC72UdrIt1sm5ZrBcBzrXNmzcPzv4hKFi7D/XNFs+PPngVA5Oy4RCVLIyj9qQ5o2HEvcLe7jNApM2acv2b5x6Din2X4De4SLgzddmrSwlUkUpMCVSSbbQIBO7evYuhhcPhnpbXrtEYhQ3rYF2sUxbrRYCjHi5et3dyQtLk+Ziotu0LE+YWrN2P/+j0rlgAzR0M9HEnMuNL8aYj6O0bguCyia+E7nOUljn/I+HO/Oijj6xqNCaVmPX2H/lmBkaAAmnTpk1wCwpD+vtr9BI2FFC8l3WwLmtz7RgYcsVXx0XzY8aMgX1gOCr2XnxFuZAfmILKO7cE3d39hKtRn9FY5Yk7CCmrRhcHV0w48alG3pxw/FPhwvYPCBT7nCke3N9eQCoxa6GkfA+TIMC5jaqaWvTxDUblybsahUVrljTv4b2sg3XJYr0IcDfuy1eu4O1OnZG7eBOYIFcTbzC/4ej9l/Fa116Iq3tf51H+lBvfIbthI3p6ByFpWkOL2WV4HaMiXUOiMGPGDKsBXioxqyGlfBFTIMBs5NyGwjcsElGVMzRa1poEFY/RwuY9vJd1sC5ZrBcB7uqckzsE9mFxIuCi5sJDociozF7+fCncjEGlleg2yAcl2463qIg08dboA1fAQI5+ITHg75frfvlZDCpJqJsLZxcXfPbZZ1bhCZBKzHr7kHwzIyHAifEFixrQ09WrRReRurChAqM7iffwXmubXDcS1IqtlsE6NFQ6dOyEd+xd4JKYiUGpuS1/UnJg5xeKf/vP1+A3rFzrNGfM+BI/eR7e7NEHnfo6wC15cMvPSM0V5+38Q9Ghc2fU19cbdWG3qYgnlZipkJbPsRoEmNGBCWOj4hPhVzgak660nY6K1/Ba3sN7jZkVwmqAVvCLcJTNoJ2q6mpMqp+KKTPew5T3Zrb6mTx9BkpKSjHA0xc5izdpleaMiaO9krMRl5iIuslTWq1f9fxJ06ZjSn09du7caRW7JUglpuCOIptuPgR+/vlnbNq8BV0HOIqosMlXv9Y438ERGc8xcozX8h7eK4t1I8DMGByN0aWoy4ebVmZkZSNgSDEq9l1skafIV3QbhpRVIT49C4cPH9bpOcwewjyO1pDBQyox6+5L8u2MhACjChmYkZSSCvf0fLGthqaoMh7jlhu8htfyHhmRaCSiWEm1Bw8eRGB0PBLrF4iMG+quafG/8ZnY+8wtIg7z5s+36YwvUolZCePL1zA9AgyfZl7Fd3v1wZClWzQKnLpLj8Q5XmPqHW9Nj4h8oiEQ4Ahp7Nhx8EzKxIgdJzWmOas590AYRrkFRbhx44YhHqvYOqQSUyzpZMMtAYG//vWvGDZsGNzi0kSYdPPRGH8zdJrneA2vlUUioA0C3NokLi0DIWUTXzGOyFe5S7fA3ssPmzdvtvmML1KJacNR8hqJQAsIMKUQQ5X79OuPlBmLUXPhy+fzGMxSz2M8d+fOHauYRG8BBnnYwAhwPm3u3LkYGBKFwrX7n/NU01zYl+jjH4pRY8eBOyvbepFKzNY5QL5/uxHgHNeUKfVwDonEcGa5v/m9+PA3j/GcnAdrN8w2V8Gnn36K3GGFGJiYhbpLTemomHeTC5odBnnizJkzMsoVgFRiNtc15AsbA4Evv/wSvgGBCK+oEYEcDOYIr6gVx3hOFomArgj8/e9/F+5C16AwZC/aIBZAV576DJ0GOGHWnLliJ2pd67TG66USs0aqyncyOQJcF7R69Wp4RcYia+F68fGMjBXHZGYOk5PDah5IA2h8VTX6BkZgzMFrCK2ogU9gEG7fvi0zvvxGZanErIbd5YuYG4HHjx8jJy8fLjEpcIlJxeAh+eAxWSQC+iLAubFjx4/DIyAYPnll6Gw3AKvXfGjTIfXqWEolpo6I/C8R0BMBznsxC4K7j5/48LecC9MTTHnbcwS+/fZbzJozBx279UREVBSePn0qg4SeoyPnxJpBIX9KBNqPALMzzJ49W3z4WxaJQHsRYIoyprDKz8/Hxx9/DGbHl+UFAnIk9gIL+Usi0G4EmMbnj3/8o/hYQ0qfdgMiKzAIAnQrfv3112Cwh+SrlyGVSuxlPOQ/iYBEQCIgEVAQAlKJKYhYsqkSAYmAREAi8DICUom9jIf8JxGQCEgEJAIKQkAqMQURSzZVIiARkAhIBF5GQCqxl/GQ/yQCEgGJgERAQQhIJaYgYsmmSgQkAhIBicDLCEgl9jIeWv/jItZffvlFZGSQ6za0hk1e2AIC5Ke//OUvYj3QuXPnRNZ78pdcLN0CYPKwVghQNnGx9PXr13Hp0iWR9f7XX3/V6l6lXGR1SozrKW7dumXU7M7MhffgwQMsWrQIo0aNEkyiFILLduqHwFdffSXWful3d+t3cd3P999/j6VLl6KmpgaTJk3CuHHjsGLFCpGdofW75VmlIsD95biVijGVytGjRzF9+nTU1dWhtrYWEydOxNatW8V6M6Xipt5uxSoxKqs///nPYjTEHXZpsdLqYGLMsWPH4g9/+IMglMqSpeKhpUvrlgsGmxfWxVXxPM7zZC7uE9VS+eKLL/Dee+8hISEB7u7u+Pzzz1u6VB5XEAKkOXmJO+uSt8hPVDDkD2bh4LbxFDiqkTfP8bfqevKQqvA3z/Gb/MRrWlqoSh598uSJEDJbtmzB8ePHsWrVKkRFRWH37t2t8qLqefLbchEgD5CfyAPkBf4nzbkP3ZQpU4T84HGVrOI3+YyySCXb+HbkN8oxFW+xThWftvT269atw5o1a7Bv3z7s378fU6dOFXKLGUCspShSif300084efIkPvroI3z44YegtfHs2TPh2qMlS8WyYcMGsd8OmYMfKrdNmzYJgnKb+J9//vk5DSmceP7EiROiPgoSKqaWso8fOnQIDQ0NYiQWFhYmldhzJJX7g7Rmsl4qDSqQ9evX4+LFi0IRXb58Gf7+/hg5ciT27t0reIUKj3xInqGQ4PXc/4m8xsL8djxHg4c5FFeuXCkECY0rCiH1wudzNKYqVHiJiYmYP3++EGSq4/JbOQioDKCrV69i48aNgq927NiBR48e4YcffsDixYvh6+srZAnTSVEhkTd4fs+ePWIHBPIbDRzyG881NjYK1yB5kzxHGUj+pMLTVHi8udF1+vRpxMfHC4NM0/VKPKZIJUaBkJmZKYRKRUUFJkyYgCNHjggLNjg4GD179gSPUxjRH3z48GGxPXxhYSHKysqQlJQkGEc12goJCUFqairGjBmD0aNHi7qzsrJw//59jTSllcQPFWl4eLhUYhpRUtZBCgq6XNLS0sRInnzCET2FDXfY7datGyIjI8VoiVYtjSDyYWxsrOCZYcOGISUlBefPnxfChlYvzxUUFIjz5MeAgAAxomNaqrYKvQa8ny5Fdc9BW/fK85aBAJUOR1uUSSNGjBB8QH6goUTFVlpaio4dOwoeqaqqem6IFxcXizyJ5eXlyM7OFnKJPEOemDFjhuBR5lGkyzkvL0/Iru3bt7c4YqcSo7z68ccfhSFP44hzZNZSFKnEaElw/oCEpQVLAnHYTct4wYIFYrisskx4jIxTX18viEhG+OSTT9C9e3fxn9aSg4MDioqKhNVMxUZrZ+jQoaiurm6VzlKJtQqPok7ShUc+oeVLdw75irzD3xwh0VjhiEtVrl27Jqxo3kdhRSs6JydHuIfoFdi1axf8/PywcOFCYQmTrzjid3Z2FiM88l1LhedomWdkZAhDqaXr5HHLRoCyhu48emuYDJq8pHIRsuUHDhwQI3yO1lWF0xRUeJzXJw9SxlCRcSRHHqOnydHRETdv3hTnKQMppwYPHiymUFT1NP8+e/Ys3n//fcHfVGDc9451W0tRpBJbsmQJYmJixLwUFQ6VGDu+JiVGYcORF60bMhQ/s2bNQufOnXHlyhVBTCoxuiVZDwstFhKaI7TWilRiraGjrHMM1KEwiI6OBt3JdAdS6LCoKzGOjOgW6tq163PXI/mKIzFaxnfu3BFKjP8ZaahSWLzPzc0N27Zta9VFSJ7mfBiva+72VhaisrVUFHQxu7q6Cs/QqVOnnhtGREeTEuNon8YUZRzdhZRVnHvnSI1KjMEZHPXTw8RCHmWgRm5urnArakKdco7yjJ4GGkY02L/55htNlyrymCKVGOcVaAGToHQD8pvRY5qUGH3AdMsMHz5c+KDph/7ggw9ExA7voYVMJUbBRYuahfMaZAwKnNaKVGKtoaOsc3S5UJGRD8grNHzojuYIX12J0cKm0cPRPPlJ9Zk5c6awmClgOBKjy/vGjRsvAcE5EM5jUCCpF/IfFWBycrIwtliPSpGqXyv/Wz4CNF7IPwxtp4coPT1deHjocqbc0aTEBg0aJJTUvHnzBF9RVvFD97RKiXFutvn8Kd3bNJ6oJDUVlZeK95w5c0bwNyOrraUoUomROTgsp9AhAek7njNnjlBidN/QclG5E2nVknk4r8GJe8598MNtDRh1xrqoxBiooRIsHKKT6aj8WitSibWGjvLO0XIm7Rnks3nzZuH64/bwdA82dyeSbyhUevfuLSxtFU/xm3NoVIhUYnTdkEdUhcrP3t5e8CzraF74n7xKxUcFSf5UGVXNr5O/lYUA5QtH4BzZU5lxSQ4jEmmgUIlxnrR5dDNlF12GNH5UfMVREw10lRLjaEo1kmL9a9euFa5sbea5OM/PuX+O7KylKFKJsbNzfQU7Oi0LTpBybQ2JTN8x5x1o0VIg0RfNwA+6E8lEJD6jfzjEJgOwUImpBA4Zh8xFRqEia61IJdYaOso6R+VD1w95gzzA+asOHToIPiNf0aAhj1GpUaBwToIuP1rMvIdCiWHLvFelxHx8fERwCHmVQowuoqCgIDGp3nyEReWpMrZKSkpEkBLrV7VH5eZWFqKytTRCyA80iih3yAcMGKqsrBTHGb3KKQsaPJRTNGSWL18uDBke4738UMnR+0Q+VM2JqaIcqewo22jI85rmhR4lyijypUruMUKbbm4aadZSFKnEGD5PFyJ9vIzQ4W8OpSk8qLwocBhZRncQCcuJTQogWkH85n0coqsECSdK6WeePHmyOEelyPmR5haSJoJTETLikUJMFmUjQBpyNE4LlTxCw4c8RIVF1w/dLwz2oRDhKIzzpgydpwAhr/AenuMcGC1vCiEqLEYlMqiI1wwZMkQEh2gSNowu8/b2FteQp/l8fuiqpIKURXkIUB5xdESeoozih0YKw+epkDgqIs/QFcioQxrlVHScByPf8BxlFY1pHuc9rCM0NFQoQsorKi9GVDMCm3zavPB6GllUmqyH9XEURq8UlaO1FEUqMVqttEQ4mc7Oz+ANlbVK/y8tHE6K8ptCiEKFyo2hrTzO+S76pZuPxGgB8XqO5HgdQ2NVSq4lYtPNdOHCBcFcLV0jjysDASol8gQNJH4oaOh+VgkG/ubojBYs+Y28Q5c1PQG8nnxFvuE8Ky1wKjGG61Ph8TddPryfIz51viJ/0mBiIIf6hwaYutJTBqKyleQdzkPR2KGsomzhHL2KnpRVlDM8TplEHuQ9NKgYQU2+4siJoymeUykxGuOMoiWvcA6X4fp0VasX8iG9T5SRfD7r4ppaegWsqShSiRmaAHQnMqRZFomAoRCg4mLIPYWULBIBQyBAJcYRFUdWnCqRpQkBqcQAeHh4CCtZMoVEwFAI0FJmqHRbLmlDPU/WY/0IcLQ1bdo04brmiF6WJgSkEgNEFgVOpMsiETAUAnR5030j57MMhaish25nBp0xIluT+9BWEZJKzFYpL99bIiARkAhYAQJSiVkBEeUrSAQkAhIBW0VAKjFbpbx8b4mAREAiYAUISCVmBUSUryARkAhIBGwVAanEbJXy8r0lAhIBiYAVICCVmBUQUb6CREAiIBGwVQSkErNVysv3lghIBCQCVoCAVGJWQET5ChIBiYBEwFYRkErMVikv31siIBGQCFgBAv8PAABy8MeRVLIAAAAASUVORK5CYII=[/img][br][br]By what percentage does the perimeter increase at step 2? Step 3? Step 10?
Your teacher will give you either a [i]problem card[/i] or a [i]data card[/i]. Do not show or read your card to your partner.[br][table][tr][td]If your teacher gives you the [i]problem card[/i]:[/td][td]If your teacher gives you the [i]data card[/i]:[/td][/tr][tr][td][list=1][*]Silently read your card and think about what information you need to be able to answer the question.[/*][*]Ask your partner for the specific information that you need.[br][/*][*]Explain how you are using the information to solve the problem.[br]Continue to ask questions until you have enough information to solve the problem.[br][/*][*]Share the [i]problem card [/i]and solve the problem independently.[br][/*][*]Read the [i]data card[/i] and discuss your reasoning.[br][/*][/list][/td][td][list=1][*]Silently read your card.[/*][*]Ask your partner [i]“What specific information do you need?”[/i] and wait for them to [i]ask[/i] for information.[br]If your partner asks for information that is not on the card, do not do the calculations for them. Tell them you don’t have that information.[br][/*][*]Before sharing the information, ask “[i]Why do you need that information?[/i]” Listen to your partner’s reasoning and ask clarifying questions.[br][/*][*]Read the [i]problem card[/i] and solve the problem independently.[br][/*][*]Share the [i]data card[/i] and discuss your reasoning.[br][/*][/list][/td][/tr][/table][br]Pause here so your teacher can review your work. Ask your teacher for a new set of cards and repeat the activity, trading roles with your partner.
IM 7.4.12 Practice: Finding the Percentage
A music store marks up the instruments it sells by 30%.
If the store bought a guitar for $45, what will be its store price?
If the price tag on a trumpet says $104, how much did the store pay for it?
If the store paid $75 for a clarinet and sold it for $100, did the store mark up the price by 30%?
A family eats at a restaurant. The bill is $42. The family leaves a tip and spends $49.77.
How much was the tip in dollars?
How much was the tip as a percentage of the bill?
The price of gold is often reported per ounce. At the end of 2005, this price was $513. At the end of 2015, it was $1060. By what percentage did the price per ounce of gold increase?
A phone keeps track of the number of steps taken and the distance traveled.
Based on the information in the table, is there a proportional relationship between the two quantities? Explain your reasoning.
Noah picked 3 kg of cherries. Mai picked half as many cherries as Noah. How many total kg of cherries did Mai and Noah pick?