Question 1
Refer to the information provided in Figure 28.3 below to answer the question(s) that follow.
![](data:image/png;base64, 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![](data:image/png;base64, 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)
Refer to Figure 28.3. A minimum wage of ________ will lead to unemployment of 40.
◦ $8
◦ $10
◦ $12
◦ > $12
Question 2
Refer to the information provided in Figure 28.3 below to answer the question(s) that follow.
![](data:image/png;base64, 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Yp4JA6SIehUjgj3q7QBiL4ejjdX+13zYZDhrl2Hys7frvwfUBR/CKSPw3GkcafbdQby8AM12+TiNk555+9u/3gD1FblfLv7S3/BQD4f/ALP1w3h6xEvjn4hyHybfwvoh8yVZT0WZwG8v/dwz/wCxQB7zr0OlaBo+oalq2uXGl6dDC73F7c6g0MUCeWqM5dmwmAmc9mLN1NfDfxM/bq8Q/GTxbe/D79l7QdU8aa+29LnxZcu6abYh3Ul0V8KQNmFeXav3gquGqpov7Kvxt/ba1S28TftF69ceDPA6yLcWPw90V/Kcjt53XYfd98n3h+7r7n+G3ws8J/B3wvb+HfBugWXh7RoB8tvZRY3t/fdvvO/+0xJNAH4wP/wSg+PMnxOtNAvLbSpLG6Pn3HiaK/V7RE3L5jFW2ylxv+7s5+nNft7oWkx6DoenabE7SRWVvHbo7/eZUULk/lVeWN28SW7/ADALayDPlvt++h+9u2fgRn0Iwc7dABRRRQAUUUUAFFFFABRRRQAUUUUAeWftB+LLPwV4HtdY1DzY7KLWLBJLq2Z1ntFe4RDNEEilLuqsfk24cEr/ABVz/wABtW8Da14y8YXnhDxD4g125eG0aaDV45orbT4C9w0MFskkSEJuMx/jI3AbsBVHoPxO8b/8IH4ZbUo9Eu/EV2ZkjttMsjGss0nLffkZUQAKzbmYfd4yxAM2i+PNJ13xZfaFbFv7UtdNs9Tk4H+ouGmWLn13QycH29aAOsrylfiBrFl8dPEXh2+ntX8N2PheDXIVitmEyO080bh33nfxDkYVevevVq88X4bXUnxh1Dxs+qwS2d5osWhvpX2JgwjSSSXf53m9S0p/g6Y+tAHA/DH4zeIdcvPhPeay8Etj8SdFudVhtIogn9nSrFFcwxIw5dDBK4cvk70DDaG2jsvhfr+m6bY+JIrrUbW1k/4SHVH8uWdEOBd7SeT/AHnQfV1/vCqPgL4DxeC7/wAIST6udS0/wbptxpWgWn2fY0EMnlrmZ958x0ihSNSFTguSGLcdB8IP+Qb4l/7GTVP/AEpegDpB4o0Z32jVrFm3iPaLlPvmXyQvXr5gKY/vjb1psfivRJhF5esWEplCFAt0hLh95THPO7ypMeuxvQ1t0UAYf/CYaD5Hnf21p3kbfM8z7ZHtx5Xnbs7unlfP/ufN0pZPFmiwrL5msWEXlB2kDXKAoECF888bRJHn03r6ituigDG/4SjRkfYdWslbeUwblPvCUQlevXzWCf7529aRfFGjzOiR6vZO7FAqrdIWYu7omOf4nR1HqUYdjW1RQBhReL9CnjikTW9PeOZVkjYXSEOrRtKpXnkGNHf/AHVJ6CiTxdocaSO+tWEaRqzu32pMIqxrKS3PQI6P/usp6Gt2igDkvFPiHRpNKuIGv7CRy4LRPLC33Jo1f5XdV+V3RTzwXX+IgHTHijRWfyxq1iX3hNouUJ3GUwhfvdfNUp/vqR1pPFcgTQ5TJIsK74/3heJQv7wd5VKfmPpzitugDEh8WaLcmIRavYyNIEMYS6Ri+8OUxzzuEbkeuxvQ1wvxc8C/Cr46eD5dE8cw6H4g0gqZEknuUD2/7nzvMilB3Rnyvn3KR8nP3a9VqjqepWekWFxfX11DY2UCGSW4uZBHHGo6lmPAHvQB+buq/CD4x/sG397q/wADvGcHxJ+GsLyT3vgPXLlHubVE2GXygCMlRImWi2N86bkeuV8R/wDBa/UbPxbZpY/CxLfRodqahbajqDC88z/lqqEJtTacgblOcc7eg9p+LP8AwUS1Hxz4pm+HX7M/hmT4k+MJMpLr3ln+zLIfdMgJwrgH+Nysf3eX6V5BY/8ABIC+8YXSa58SviW8fjPxDcXN7qEej2MLQJO4MhwXdC/zsSdiY/3R81AHYT/Gn9ob/goBLJpvwn0yf4QfCeU+Xc+L9Syt9eJ3ERX/ANBh/wCBSjO2vpj9mf8AYi+G37MVqt1ountrXi2Vf9K8T6sBJdyE/e2dolPonJ/iLda+YdA+MHx3/wCCeEFh4a+KXh9viZ8GrEJZ2HirQottxp0C8Ijr6AbRslx6LK2MV9w/B348eBvj74XXX/AniG112ywvmxxNtnt2P8E0TfOjfUfTNAHotFFFAGHNGv8AwlFq4QFzZzASFEyo3xcbs7/wC7eOSDt3blYTzKfFdqhkAc2cxEe6Pcw3x/Njbv8AybbzyM7cbtABRRRQAUUUUAFFFFABRRRQAUUUUAeU/tHak1l8NLlXOgJZz3MEF1P4qYppkEJf5nndeU6DYwx85TlfvD5z+FXxZ8MeAvEuqf8ACLX3hfQ9JhstNe8s7R5LybxJfz3U9uqW93M/mOBDFC8KfN8tyh+4wNfR3xV8Uz6xp2peGfCviSOx8TW81t/aEFpbQ3l/b2khG947ab5Xyp+8ysMb8BmXFcp8BtL8Wv4u8T2vja48Q+IP7LSxjtr7X9Ls7S0W6Q3IleyEESb12NEfN9GVOqMKAPfh0paKQ9KAA9K4P4Qf8g3xL/2Mmqf+lL15H4J+Oev638dofCWo37Wk39r6zby2k0MX9nXllBn7M1hcBcy3KfuvOi3koVuNyLhK9c+EH/IN8S/9jJqn/pS9AHe0UmRRuoAWikyKN1AC0Um6jdQAtFJuo3UAZHiZ2i0eRlJU74/mV3Q/fH8SKx/StftXwn+2b/wUx0L9nT4gv8PdO8Kz+K9atVhm1OX+0DZRWu/bIsasil3fYVPYfMv3uRXEH9pT4/8A7epbRfghodx8Lvh6x8jUfG+qvi4Zv40hdehHTEWX6ZdM0AfSH7TX7dnw6/ZrVtKurpvFHjaTCW/hfR3ElyXb7nnHkRA5Xr8xz8qmvnfTv2d/j3+3bf2+ufHPWLn4afDNnE1p4D0g+Vczp1Xzg3Q/7UuW+9hEzX0N+zJ+wj8Of2a1TVre1fxT46ky9z4q1hfNuGc/fMIORCDk9PnOfmY19K8e1AHD/Cf4M+C/gf4Wh8PeCPD9noGlpt3R26fPM/8Afldvnkf/AGnJNbupy+XrOkJ5oXc8n7syKN/7s9ipJ/Ar+PStvdWNqBf+1tJA8zDPJkhpQv3D1CjYf+B49uaANC9soNRtZLW5gjuLeZSkkUqh0cHqCD1FfEnxj/4Jxx6V4ok+IX7O/iOX4TeOo9z/AGG1cppl5nkpsGfKB/u4aP8A2B1r7k3UbqAPgv4Yf8FD9a+GvimH4eftOeFZvh54mX5IPEkUZOm3o6eYdu4AH++hdM9dlfcmj6zY+INLtdR0y+g1HT7qNZYbq0lEsUyHoyOvBHuK5z4nfCTwd8Z/DM/h3xr4fs/EWkzf8sbuPJjP99H+9G/+0hBr4c1f9lf44/sTapdeIv2ddfn8beBTI1xe/D3W381wvU+T03n3TZJ90fvKAPv12kTxHAmSFNrI2PNfBO9P4Nu38c59jk42q/N7Sf8Agsj4DHifR4/EfgbxNoUohe11ZQ6yrYz+Yudqb18xV2HJKK46AdQf0R0bWLPX9IsdU064jvNPvoEuba5iOUlidQyOvsVINAGhRRRQAUUUUAFFFFABRRRQAUUUUAeF/HrSfG2pXdraeGfBfhXUNIn/AH19r+swfb7izdRt3pY/uvNIQDDCbPGNlS/szzaGdI1i10z4q33xMv4LgLfpqE0YfTZOcRLbqqvAnoj5+7wa1PF37NvhL4h+LtQ1nxadT8Q2lz5ZXQLrUZxpaFECFjaK4jkc45Lhu1eh+HfC+j+D9Li03QdJsdF06HiO00+3SCJPoiACgDYpD0paKAPKvDfwI0zw9c6JGL+5u9J0LWLzXNJspUTdbXNz5+/Mg+Z0X7XcbFP94ZLbRTvhd4Y0jUNO8WNc6ZaztceJNVMzSwK3mbpGiOf72Y/k/wB3ivUj0rg/hB/yDfEv/Yyap/6UvQB0k3hbR7gytLpdnI0u8OWgU79+zfn6+Wmf9xfShvC+jtJuOlWZbzfN3eSv3/O87d9fNG//AHuetbNFAGNF4V0eJ0ePS7NGXYFIgXjYzsn5GWQj/fb1pi+ENDRI4xpFkqRgIi/Z0wFEZiAHH/PNmT/dYityigDDk8J6LceasukWTrKHSQG3Q71KJGQeO6Ii/RFHant4X0eeQyNplpI5ZizGBcljIsjH8XRH+qg1s188/tNftt/Db9mGza113Uv7Z8Vyp/ovhnSiJL2Qn7u/tEp9X6/whulAHtFxoOhabBNeS2On20cX7+SeSJEVNjtNvLdtrs757Ek18SfGH9u7RNQ8Ur8O/wBnLwRbfFPx9gQpqFnaBtMsQiuitvGPMCCRxuysShz85+Za5ez+Df7Qv/BQC4i1L4s6hc/B/wCEcrrLB4R07KX19H1Hmg8/8CmHusXevtv4NfALwJ8AvCi6D4F8P2uiWZC+dLGu6e5cfxzSt87t9Tx2xQB+dPiD/gk18Q/ipA/jb4ifE2zg8canNGdRsbDSUmhhjASJERxLEmURVG1VCgLhd3f9BPgX+zr4U+BXwo0DwNplqmpWulwSRvd30KGW5eVxJM7ccb3VTt/2EH8IrvfFjRroUxlZBF5ke5nMW3/WD/nr8n5/hzitodKAMj/hF9J8zd/ZdpnzPN3eQv3/ADvO3fXzfn/3uetJD4W0aBo3h0uzjaPZtKwKNuxnKY9MGRyP99vWtmigDDj8HaHDCkK6NYCJFCIgt0wFEZhA6f8APNmT/dYr0rO1PwnpM+pWKnSbR4ZGmWdfsuQwaEIdxBA5VEX5w2QoHpXW1hapEv8AbejFokco0mJCkZZP3Z6FmDD/AIAD74FAD38L6PMwZtLs2Jdny0CnkyLKx/F0R/qoPalXwxpETq66ZaLIHVwVgXO4SNKp+od3f/eYmtmigDDi8J6JD5Kx6TZRiAII8QL8iqjouOOyu6/R29aJPB2hyxPE2jWJidSjRm3TBUxCEjp/zzUJ/ujb0rcooA/Kj4vf8Efda8Y/HvVdS8OeMtO03wdrN3NqUxvIXe6sd8m54UQfLLy52ksnC8+/Zab8Rf2g/wDgnXBbaR470iT4vfBKxCW9rr+lJi80uBflRX/uKowNkvyfdVZR0r9CJDH/AMJdbDK+d9hm2jMWceZH/wBtMdOnyf3udtas8EdzC8MyLJG4KsjjIIPY0Aec/BD9ovwB+0V4bXWfAviC31aNQv2izzsu7Qn+GaE/Mn16H+EmvTq+Jfjh/wAE4dLvfEp8f/AvXpPhH8Q4SZU/s5mi0+6bjKsif6rd32Aoe6Gub+H3/BQPxd8FvE1p4A/an8KTeENYY+Xa+MLGHfYXq9N7qm4fV4sgZ5RKAPv6isrw94j0vxbotnq+jaja6rpd5GJbe9sZlmhmT+8rrwRWrQAUUUUAFFFFABRRRQAUUUUAFFFFACHpXB/CD/kG+Jf+xk1T/wBKXrvD0rg/hB/yDfEv/Yyap/6UvQB3tFFFABXH/En4peFfg/4XuPEXjLXrPw/o0A+a5vZdu5v7iL1d/RVBJr5+/ax/bP1r4O+MdP8Ahp8PPAOq+OPifrFqLqyh+zuLGKMll8xivMmCpyBtA/icV5p8Nv8Agn34n+MXim3+IP7Unimbxnrq/PbeErSbbp1ipOdjlMKfdI8Lxyz5oAxda/au+Nn7bGrXXhn9nLw/ceDvBCyNb33xE1tPKbHfyeuw+yb5OVP7uvcf2aP2AfAP7P12viPUGl8d/EKVvOuPE+tjzJVmP3mhQ7vL5/jyX/2q+k9C0LTvDOkWmlaTY2+l6baRiK3s7OIRRQoOiqi8AVpUAIOlLRRQBj+JZng0iZ1cREPFhjJs/jHfY/8A6D+XWtcdKyfEu5dIk2eZnfH/AKrzd33x/wA8vn/L8flzWsOlAC0UUUAFYeqyKut6Ou9dxaTarPGC/wC7PQMNx/4AR78VuVi6kzjWNKQEqGeTI8xxnCH+EKQfxK/j0oA2qKKKACiiigDFeRj4lt41kXyzaSt5fmdTvj52bOfrvH3vunOV2qxpM/8ACS2+TJt+yyf89dn30/7Z5/3vn6443Vs0AFcl8Q/hp4X+Lnhe78O+L9Ds/EOjXI+e0vot6q395T1Rx2ZcEV1tFAH52a9+x78Yv2PtZu/Ff7M3iWbXvDDuZ734e67L5quO/k5IDn8Uk4A3PXsH7OH/AAUP8C/GrVh4S8UW8/w0+JELiCfw7rv7oSTd1hkcLk/7DhH9FbrX1nXhP7R37HHw1/ag0op4q0YW+uRpstfEGnbYb639Pnx86/7Dgj0x1oA92or4x/Zl+Gf7SXwA+Kdp4E8Ra/YfEb4O/Z5pLfxDfSFb6xCL+6hwTv3EkfId6BQdrrtxX0vqHxa8P6b4w1DwxI2pTa1YWkWoXFtZ6TdXGyCRnVH3RxMG3NE4wuT8hoA7eisbwz4l03xholrq+j30WpadcAtFcwNlTglWHsQwZSp5Ugg1s0AFFFFABRRRQAUUUUAIelcH8IP+Qb4l/wCxk1T/ANKXrvD0rg/hB/yDfEv/AGMmqf8ApS9AHe0UUUAVvscH2r7V5SfaNmzzto37M5259Ks0UUAFFFFABRRRQBjeJo3l0mVVXexePC+WZM/OP4Q6f+hfn0rYHSsXxaqPoUyyKrxmSPKuIiP9YP8Anr8n5/hzitodKAFooooAKxtRDnVtJI34VpM7Vl2/cPUqdg/4Hn25rZrE1SHdrGkMYg215B5mwHZ+7PfcCPwDfh1oA26KKKACiiigDEkR/wDhJrdwv7sWkq7/AC2+9vj4378D6bD/ALwxhtusKVI/+Estn2L5v2GZQ22LON8fGf8AWY6dPk/vc7a3aACiiigAooooAK+ePh/470s/GH4x+Ipmubqf7VYaLYWtraSzTXNva23mbokA+dPPu7gbhxuVvmr6HooA8u/Z68Dar4E8Ayx65Gtrq+ratqGu3FlHIrpZtd3Utx5CsOG2BwpK8FgxFeo0UUAFFFFABRRRQAUUUUAIelcH8IP+Qb4l/wCxk1T/ANKXrvD0rg/hB/yDfEv/AGMmqf8ApS9AHe0UUUAFFFFABRRRQAUUUUAYvieUw6NMxlWH548SSOqD76/xMrD9Py61sjpWP4mZ10dyhcEPH9x5VJ+cd4wX/L8eM1sDpQAtFFFABWHqrRjXdE3Mok3zbFJi3H92em/5/wDvj8eK3KxtTkK6vpCb9oZ5Mr5mN3yHHy7Tn81/HpQBs0UUUAFFFFAGFJMH8UW0azKp+yTExGRNx+ePnZt3f8C3Y56HII3axnZh4kgX59v2WU43yY++n8ONmfcnd6cbq2aACiiigAooooAKKKKACiiigAooooAKKKKACiiigBD0rg/hB/yDfEv/AGMmqf8ApS9d4elcH8IP+Qb4l/7GTVP/AEpegDvaKKKACiiigAooooAKKKKAMjxLG8mjyIuSxePhY3f+MdkZT+taw6VieKYlm0adXiWdd8X7uRI3X/WDtIyr+v05rbHSgBaKKKACsjU939saVjzdu+TOzztv3D12fJ/33+HNa9YupxltX0h9uQjyZby84+Q/xbhj8m/DrQBtUUUUAFFFFAGJLHI3iW3k52LayDIjfbnen8W7Z+BGfQjBzt1hywr/AMJTauI1MgtJlEpSPKjfH8ud2/HsF28ckHbncoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAEPSuD+EH/IN8S/8AYyap/wClL1oeH/iP4b8VaqbHStUS6uhHJNEvluizxxyeXI8LsAsyK+FZkLAFlz1FYsHwx1jS7zU30jxxqel2t7ezXxtVs7OVY3kfe4VniLYye5oA9Horgv8AhBvFn/RSdV/8Fth/8Zo/4QbxZ/0UnVf/AAW2H/xmgDvaK4L/AIQbxZ/0UnVf/BbYf/GaP+EG8Wf9FJ1X/wAFth/8ZoA72iuC/wCEG8Wf9FJ1X/wW2H/xmj/hBvFn/RSdV/8ABbYf/GaAO9orgv8AhBvFn/RSdV/8Fth/8Zo/4QbxZ/0UnVf/AAW2H/xmgDofFMix6LOZJFiXfFmSR40X/WDvIrL+n05rbHSvFb8z3WmazK/xh1O307SleS+1GLT7MQweW37xWm+z7Ny7cMgORyCK0vDVtq/iyO8bTPihq8j2c32e6gm0i0hmt5NiuFeOS3DoSjow3DkEHvQB6zRXBf8ACDeLP+ik6r/4LbD/AOM0f8IN4s/6KTqv/gtsP/jNAHe1haqqf27ou4K0m+bYxEWR+7PTed//AHx+PFc5J4K8VQIXf4l6oiKMlm02wAA/781xNtrseqw3epJ8ZtQhtdLshqc73Ok2cKfZZA+y4DSW674TsfDpwdvWgD3aivJvDVrq/i9bs6b8UNXkks5fJuoJdHtIJoHZVdVeKS3DplHRhuHIINbn/CDeLP8AopOq/wDgtsP/AIzQB3tFcF/wg3iz/opOq/8AgtsP/jNYWpw6hpHibSPD178WNSg1nVxK1jaNpllun8tGd9v+j44VS3PpQB30kg/4Sm1TzE3mzmKx749xHmR/NjG/8VO31GdtbleJyST/APCYrpR+L+rf2osh0/yP7LtPs/nmNZvJL/Z/L87yhv2Z37DnG2ptIv7jxBrTaRp/xc1Ge9/0jYBpVmqTeQ4im8pzb7JPKdgr7Cdp4O2gD2aiuC/4QbxZ/wBFJ1X/AMFth/8AGaP+EG8Wf9FJ1X/wW2H/AMZoA72iuC/4QbxZ/wBFJ1X/AMFth/8AGaP+EG8Wf9FJ1X/wW2H/AMZoA72iuC/4QbxZ/wBFJ1X/AMFth/8AGaP+EG8Wf9FJ1X/wW2H/AMZoA72iuC/4QbxZ/wBFJ1X/AMFth/8AGaa/gjxWilj8SdVwOf8AkGWP/wAZoA7+ivIPCDX/AMQbCe90H4r6jqlnDPJbSTQ6XZhBKjFHTLW/3lZSCOxUg10X/CDeLP8AopOq/wDgtsP/AIzQB3tFFFABVLVrea70y7gtpPIuJInSOT+65Xg1dooA+TvgtpN7cXX7O2lw2k1vqHgvwtd2XiJChU2cwtra2MEno0kyFwO6wl+mDX1jRRQAUUUUAFFFFABRRRQAVxvxij16X4TeNU8K7v8AhJ30S9XSvLOG+1+Q/k499+2uyooA+G9S0PxHJ8N7bQPCV9qniTwFaeH9G1S8065tU+0afPaalZySWieXEjs720VzvhfLhol/568+/fCyJ9Y+NvxR8UWLCfw5e2+j2NrdR8xXM8Ec7TOjdHUC4hTcO8TL1U17NRQAUUUUAc948nntvA/iGW30g69OmnXLx6UGwb1hG2Ic9t/3f+BV8TW3gLxDD4B1C10rULjx5pA8P6DefaDbP9s0qG01OC4m0cd5FaH7RtRwZxs2ys+5K++qKAPGPhbC+s/G/wCKPifT387w3e2mj2FrdR8xXNzAly9w6Ho423ECFl7xMvVTXs9FFABXiPxdvYIvjv8ABRWlWNo77U3kyfuK9hMiFv7u5yFGep4r26igD5EfQdT+zS+D/Jl/4Slvi8mvBdh3f2f/AGgL77Tn/nn9lHk7/u7/AJOvFL8HtB1NIf2efDrRSrr/AIMm1N/EishVoVFnc2zeb/12uJoZU/vqu9dwGa+uqKACiiigAooooAKKKKACsfxT4isvCPh3Utb1O4S1sNPt3uZ5ZWCqqIpY81sVDPBHcRmOVFkQ9VcZFAHh37JviPRI/gx4B0WPVrO98Q6ho39u3trazLI8clw4nuGfb9399csPm6nPvXu9VoLG2tCxht4oS3Xy0C5qzQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAch8VvFl34C+GnirxPY20N9caLplzqQtZ5DGkwhjaQpuCtjIXGcHrWFqHj7xFF8PfCOvW2m6a97rE+nRXVvLO6xQC6eNNyNty+zzehA3Y/hrqvH/haPx34F8R+GpZjbxazptzpzyqMlBLG0Zb8N1ed+CfDXjm+8K+D/DninTdN0+PQGtWvNQsb4zJfm1A8owpsUoHdEdt/wB0AqN2dwAOx0v4veCNb1i00jTfF2iX+qXUk0UFra6hE8szw5EoRQ3zFNrbh2wfSudsfjtoGmt4et9d8QaJc3PiLWb/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Refer to Figure 28.3. In an attempt to increase worker productivity, this firm would pay wages ________ per hour.
◦ of $10
◦ > $10
◦ of $8
◦ < $8