Question 1
Refer to the information provided in Figure 15.1 below to answer the question(s) that follow. Below are cost curves for Dom's Barber Shop, a monopolistically competitive firm.
![](data:image/png;base64, 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)
![](data:image/png;base64, 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)
Refer to Figure 15.1. From society's point of view, the efficient level of output is
◦ 20 haircuts.
◦ 23 haircuts.
◦ 25 haircuts.
◦ 30 haircuts.
Question 2
Refer to the information provided in Figure 15.1 below to answer the question(s) that follow. Below are cost curves for Dom's Barber Shop, a monopolistically competitive firm.
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCADoAPsDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9U6KKKACopJUhjaR2CIoyWY8AVLWH4xOmr4S1n+2Jvs+k/Y5hdy7sbIdjbzx/s5oA5P4fftAeBPid4j1TQvDniCDUNS08/vIVyPMTah3xk/6xPnX5h616OOlfCv7OU+qfCj45t4TvJ9L8d+Fb24Wz0PxSEWPUbNE0m3lQOq/I8JgSJC64yyqzda+iP2av2jNF/aQ8O+I9W0cLGmj65daSUV929I2/dSf8DQq1AHsdFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVDNCk8bxyIHjYYKsMgipqKAPnTx9+zzafDv4dfEy/+EHhSwj8feIrKSGyEYhtxA7xJDiJztEaDbvxn71fN3/BL79nb4yfs6eMfGVp4y0KKz8J6vAFM0eowz+XeQPgfIjk8q7jP+yK/Ryuf8ID/AEXUv+wjc/8AoZoA3x0paKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK5/wh/wAe2pf9hG5/9DNdBXj2j3XiHQvFGqFNRiex1DUp/skF4n7nzA3MO8cxsdu4H5geRt3D5gD2GiuT0/x1brdx6frFtNoeoMdqJdkeVN/1ylHyP9OG/wBmupVt3NAD6KKKACiiigAooooAKKKKACiiigAooooAKKK8L/av/aIu/wBmrwVo/iS38PR+I4brUks57X7UYZI08t5HlT5G3bEidiOOBQB7pRXz7+0V+1XbfBjSfCK6Ho48WeIPFF1bQWGnrc+SiwzOiCeRwr7UzKijjktVzTvjh4r+IPiLXtJ8AeGNM1WLw9J9i1TWdV1N7ezN+Fy9tb7IXeTYxwzlVAoA92orh/hN421bx/4Lg1TXfDs/hXWFnntbrTJ5PM2PFKyFkfau9G25VtoyDXcUAFFFFABRRRQAUUUUAFFFFABRRRQAVx+maRba7o2r2V4m+3lv7nPOGU+ZwynsQeQa7CsDwf8A8e2pf9hG5/8ARjUAZuiXTzvc+GvEEcd3dRpmKWZVKX8H9/HTePuuvrz0YVKfDF/oZ8zQL3y4R/zDb4tJb/8AAG+/H+o/2aveJvDw12zjWOQ2l/bt51pdKMtDL6+47EdwTUfhfX21uGaG8iFrqtm3l3dorZ2P/eX1RuoP9QaAILbxvb29xHa61C+h3jnYi3TDyZT/ALEv3W+nB/2a6cMGqve2dvqVrJb3UCXFvIMPFKgZWHuDXNL4UvNAGfDt75MA6aZelpbf6I334vwyB/doA6+iuXtfGcUM6Wus28mi3jnCeed0Mp/2JR8p+jbW9q6VWDDIoAfRRRQAUUUUAFFFFABRRRQAh6V89fHLwxc/E74z/D7wxeaFqV34Whs9VuNQv1tHazjmltWt4UeT7udsk36f3hX0NVHVNVs9FsJr29nS1tYU3vK7YVRQB8P6d+zt4t8EXPwb0jxIuoeMtdHiSzl1bWLO0eW2sNM0+N1sYGfGETdsdt3V3c9q7X4D+I9V/Zt8MeIfA3iPwV4o1LV4Ncv76wvNF0ma9t9XiuJ3lRxMi7Ef58MJGXG2vpTQf7T1a6bVLvzLK1ddtrYN94L/AM9Jf9s/3ew9+nSYFAGB4M1LVdX8M6fe63pY0TVbiPfPp3nib7OSeELjgnGM475roKKTdQAtFJuo3UALRRRQAUUUUAFFFIelAFFtUsk1NNPN3CL54zKtt5g8wouAW29cDcPzqpq/irRdAubK21TVrLTrm+kEVrDd3CRvM/8AdQE/MfpXgbeEtG8Oft2adf6Zp1vaX2qeCr+e9lhTD3Di8t8M/wDePNeMeAviV4s8K+H/ABR8eNc8MaF4htJvE09jez3NzKdWs7CO8+zRRWwZNkYi6+Vu+csW3UAffm6sHwf/AMe2pf8AYRuf/RjVfv47u6tGFjcR2s5wyyyw+aP++dy/zrk/BEOvx/bRLdafPbrqU/mMsDo5+fnHzsBQB3lcv4n0S6NxDrOkhRq1qMbGO1LqL+KF/wCat/C3tuB09VXVWMX9mvaJ13/aUdvy2sKfjUP7M277b+0Nv3tjeVu+mc0AM0LWrbxBpsN5ak+U+VaNxh43U4ZGHZlOQRWrXntxZ6z4S1O68QyLBc2kpX+0LOxjcEgcfaFBY5dVxkD7yr6gV0UNxqt/cw3NndafNpMuHVlR2dkPcMGxQBrXNpBf27w3MMdxDIMNHKu5SPcGuXPhK/0SXzfDmpPaQ99MvszWrf7n8cf/AAE7R/cre1VdUIj/ALOktUb+P7UjN+W1hSxDUP7OYSSW5vtpwyofKz24zmgDJt/GkVtcR2mt27aLdOdqNM263lPokvQn2OG9q6ZWDDOaxbOz1K6E0Wr/ANn3VrKmDFFC3P8AvbmORXNXXhXxFoN5JP4a1GztNMT5hpd5HJJERj7qnd+75/u/KPSgD0KiuG8N/EZb7TrCTXbCTw9cXUKSKZnD20hdQfkmHHfo+1vau2EgYZBBWgB9FFFABRRVW/vrfTbWW5uZlhgiG95HOAooAbqGoW+lWct1dTJb28KF3kc4CgVy9ppEvi/UbfVtWgkisbZ/MsNOl+X5u00i/wB/+6p+71+9jay10m48aapbatqiSQaRbOJrDTJRhncdJ5h690T+Hqfm4XtgMUAG2loooAQ9K+U/2j/2gvE/hbxL9p8IXNtF4V8DanYP4xmkAZrlJ5UQ2kXoUjl85z/uD1r6e1Q3w065NgkLX/lnyFnYrHvxxuIBOM+1fLV5+xLpevfAfxBpGuaH4Z1X4r65b3j3XiadHKteTu588Ps3jZvG0beNoFAB4ytviRpfxv8Ah54Sh+L+tmLxR/a+p332PTtOSK0s4EQwpCHt3K4aaIbnZ921qX9n6T4ifHrw5qeral8SdVsPDum311oulXmkWdpb3eqmCV4nvrhmidVy4IVEAHy5O7Ndl4I+DPjaz+Mnhnxb4nvdFvLDR/Bv/COeXaTTNO1y7xvNMNyAbW8pR1zWT4A+EnxX+Bum6x4S8ES+FdW8JXOoXV/pV9rVzcQ3WlieRpXieFImWcK7tt+dM99tAHr/AMJdM8YaL4Mt7HxxqsGua9byzIdQt4hF9ohEjeS7qPlDlNm7aAM5ruK5LwfPeaTbWfh3U9Tl1/WrWzEt9qfkpEHdm4yi8Ju+bA9ErraACiiigDnPG3i618CeG7nWr5ZXtoDGjJFjOXkVF+9gAZdcsegrnvhX8XLP4sWt7c2emXen2seyW2lu3jP2uBy4jmQIxKhvKcgNg42n+Km/tACNvg54qWW9i06M2vzXM6u8a/OvBRAzvu+7sA+fdt/irlP2b/GL+Lo9ZkYW+BBZyxyweHJtG82J0fyziViZF2gYI4HSgDo7v4A+F7v4qQ/EKWXWP+EnhTyo5l1a4EQi3Bmh8rfs8slQSm3FZlx+zD4HutfudQkt79bG61EatcaEuoSDTJ7wMD5z2+dpbKq2PulhkjNcwn9s6J+2jY2EnijVtQ0TUPCV7ff2TdTL9ltZVu7dVKIqr2Lctk+9eY+Jvi7rHjj40/DTxXZ+KpNJ8Ev4xm0Gx0i3uQiX8Mdtc+ddXHPzAzRbUU8BUz/HQB9qL1rB8H/8eupf9hG5/wDQzWjqF1cW9mZbS2+2y8YiWQJn/gRrjfCXiDVYrbUR/wAIxfP/AKfcZaO4tsffPrKKAPQaKrWkzzWyPJC9vIy5aJyCV9uOKx5te1OGaWOPw5fTopIEqT26q/vzJmgDoD0riUceA9UWM8eHL2b5G/hsJnPT2jdun91m9D8vV2dxJcW6ySwSWjsPmicqWX/vkkVh6nqV3dpdWM3he8vrR1aJszW2yVOnQyZwfegDpwc0tcR4Y1S70W6g0LVRJGsibtPnnILOg6wuysQZEH/fS89jW3f63qFtctFD4fvb2IdJ4poFU/g7g/pQBuVFcR+dC6ZxvGKhsbmW5tkkltpLSRusUpUsv/fLEfrWVqWv6hZTTJF4fvb2KMbhPDNAofj0dwf0oAtaZosdpoFnptwsdykNukDB0yr7UC9D9KyG8K3OikyeH737EvX7Bc5ltT/uj70f/ATgf3a1PDWtyeItFtNRexm04XMSyrBO6M4VlBH3GYd6Zfa3qNrcvFDoN7exjpPFLAqn/vuQH9KAM2Lx5Dp1xHaa/bvody52pLOd1tIfRJumfZsN7V1ayBgCCGB9KoW0h1axYXunvaq+Ue2uSj5HvtLDFcVrtjfeDjJP4ctbmC0RPNkieWE2Pv8AK8qtH/wDj/ZNAHfXd5DY20txcSLDDEpd3c4CqOprkrTTrrxnqcOpakGg0W3YSWNgw2mZ/wDntMP/AEBO33j82NvG+GvHs3jfVhP4s06bwvp9m6eRY3W14bmQgMszyjgL0KI2D3POAvskciyoChBUjgg0APAxS0UUAFFFFABRRRQAVg+JfEA0O2iSKP7VqV03lWloDzNJ/QL1Y9gKTxF4ng0FYYxE93qNydttYwcyTN/7Ko7seBUWg6FLDOdV1VluNYmXaWjGUtkznyov9n1bqx/AAAn8L6E2h2bieb7TqFy7T3dzjHmSH09FH3QPQVu0UUAFFFFAHgv7RXxKg0C4t/C15a6HNZ39ul4x1PXJLGRWjmDJsVLeXIDIp3celU/2Unt5YfEiW+oRXttCbeK3gg1h9RSzhHmlIUZreEoi7mwrbz/tcCvSfjRPfWvw21ybTJpLa+WEDzbeZYZvK3r5qxO3AkKb9n+1trlP2dvs0sGuXGiQeKoPC8vkNZHxXPNJK8mH84xeezTCP7n3jt3btvegBdT+CniS++P1j8SB4ztktbSxfS00Q6PkNaySpI4M3nbt+UGH24H92sD4i/sb+C/GPinwbqml6P4e0C30PUzqN1ax6HFL/aPyMnlu25dq/O56H5tp7Vr6R8Q/Gsf7Ul34J1htIbw0/hibWrFbGKQXG9byOFfNZzj7rN93jmvNtf8AjN8UvCcvhDWNZntdP1XxF4r/ALHt/AD6ehmex85kMyTK7OWWJRMz/c5xtoA+s44khjVEAVFGAo7Vh+Dx/oupf9hG5/8AQzWnqOpRaVbGeYTOgIUiCF5W/wC+UBNcb4S8d6LFbagJbt4H+33J2S28qMvznqCKAPQKKzNM1+x1xXNlP5wT73yMuPzFWr6+h060e5uH2QoMs2M4oAs1l61piaxYyW7y3EGSGWW2kKOjDBBU/wCR61R/4WBoP/P/AP8AkJ//AImtewvoNRtkuLeTzIX+620jP50AcNrTXdvprad4lje4sdwaHXbFdrQOPuO6DlCv99cr67ela/gvxMdWjexu5oZdSt0VjLAf3V1Gek6ezdx/C2R7nX1XxDp2hlFvrjyWkzs+Rm3fkK8413w/4f1jVIdR8Lam2h+KUdmtpoEkW3mkI5WaLGxw3y56H7vPAoA9dqC6TzbeVR1KEVwnhvx5q89kX1fRWeS3dobptM+dreQfeV4T8/oV2b8qwNaS/FTwq9y9t/bMP2qJd0lsUfzY/wDeTblfxoA2/DVnJp3h3S7SdQJ4LWKKRc5wyoAa1axdD8WaV4niV9MuxdI0ayhlRh8p6HkVp3FxHbwvLK4jiRSzOegHrQAlzcx2sLyyuIokGXdjgKPWuNsYrrx5fC9vYTb+HIWzaWkgw94wP+ulHZP7id/vN2FYNh8QdG8f3klxNd+V4ctpisEDRvuvnQ/M7jb/AKtT0X+L7x4xXoula1ZazCz2M/nIhwW2MuPzFAFey0Ipf6zJcCKa2v5EPlkZ4EaoQf8AvmspfBMmhyGXw3eNpa9Tp8q+bZn/AHU6x/8AACB/smr58UQ29zqy3eLeCylji8zlt29FboPrSD4gaDj/AI//APyE/wD8TQBVh8Z/2fKtvr9q2jyk7VuWffaSn/Zl7fRwprqVkDAEHcp6EVABDqFrnAlhmT7rDhgfY1xGuadB4Plik0bVzobvlhp8sTTWUv8AwAcx/wDACPoaAPQaK8xt/jjoWlypb+JbqLQpWwqXczN9jlP+zMwXb/uvtP1roD4yudZUDw9pc1+j8C8ut1tbfXLLvce6Kw96AOreRY1LMdqjqTXJXHiu516SS18MwrdfeR9VmH+iwn/Z/wCerey8erCnDwbPrDK3iK+Opx5z9hiXyrQf7ydZP+Bkj2rqIYUt41jjUJGg2qijAAoAxfD/AIXg0Z5rpnkvdRuMeffTnMsnt6Ko7KOK6CiigAooooAKKKKAPnX453Phe8+KelWHjnw3rHinQLbSTc2thaaPPqNobl5ijPKkasu8Ig27/wC+1bX7PcHhu01XxVbeDdF1jw54dP2a5TStR06awghuH8wSm3jkVcKypHuC8Z+pr27bRt280AeBXHhb4hN+1bF42Twxp58KR+H5PD/2k6sBcHdcpN53lbPu/JjGc81w/gfwP8abL4lX3izXvA/hq98S6lfCD/hILvxA0yaVpfmf8e9tbCFcfJ1+f53OTxgV7BdfGy4tfjvpHw4n8KX9rHqNjdX0GtzzReTMsGzcERWL9XH3wK43Xv2qptLg8T+Irbwsbz4e+GtY/sbVNc+2hbgSqyJNLFb7PnjidwGO8HhsLxQB9D7eOawPB6j7LqX/AGEbn/0M1sfbIvs6zGRFiYAhyeDmsTwbcRy2moFJEZTqNzjaf9s0AdHtpaY8ir95gPrR5gxnIxQA7bRtpocN0YGkMybsbhn60AP20baaXC9WAo8wYzkYoA5XxJpd1Y3w17SY/Nvo0CXVovy/bIR/D/vryUP1X+LInurHRPHGix3rWsGowyRl4neP5x9O4PauiWRJOAQ1cXqjDwJqU+rocaDcPv1GLPFq/wDz8gdk/v8A/ff97IBX8M+EZNG8JaS9trmpaUIbGEyRTyiaJMRjORIGI/4CRWPZ/wDCU+OVFwX0/UPDSSfuopYpLJtQx/GeZf3PoNo3/e+7t3dBazr8SFWYZ/4RZT8ikf8AIR/2v+uPp/f/AN3r2aRiNMKAqgYGKAOM0KXxDoUFxFc+H0uPMuprgHT71HwHcsB+8Cetan/CT3qn954a1Zf93yW/lLVzw5qEuo2128pG6O9uIBgfwpIyr+grYoA4yy1G+tdR1G7g8O6pL9skRyrvAm3CBO8v+zV86t4hmz5Hh6OL/r8v1T/0BXq1pWpzXmr6xbSFdlrMiR467TGrc/ia2qAOZP8Awll4u0LpGmf7W6S7P5fuv503/hFtRvBu1DxDfN6xWKJbI3/oT/8Aj9dRRQBx198ONJeGJrezia6S5gmNzd5mlISZHYb3yeQuKlbwa+lky+H7s6S3X7GU820f/tlldn/ACv41p+JtQl06wglgIV3vbaA5H8LzojfozVs0AcfF42l02UW3iTT30d2O1bxH86zf/trhdn0cL+NdXFKk0aujB1bkMvQ0SRLKhR1Dq3BDDrXMyeDn0tjL4fvDpDk7jZgb7R/+2X8H/ANvvmgDq6K5E+NW0QJH4jtTpHOPtwO+zb/tp/B/wPb+NdRFMlxEskTq8bjKupyCKAJqKKKACiiigAooooA+afiF4ikT9sH4dTroevXGn6bpGoWN5qVtpNxLaQzXPkGIGVUxj5Dlui/xYryrXvDWuaD8GPi18GE0HVrnxT4m8Q3r6VLFYyPaT2t7cJJ9o+0KuxBGrPuDMCCn+0K+66YV+agDLs9BtU0G10y6ijvYIIUiInTer7FAyQfpXO+C/COiW3225i0q0iuI9RuCjxwBSMOfu13NYHg//j21L/sI3P8A6MagC5qnh/TdaCf2hZQXfl/c8+MNtqQaRZf2b9g+yw/Ytuz7Ps+Tb6YqPXdN/tnSbmyEz2zSrhJ4Th436q4+hway/C3iJ9SM1hqCrb63ZYW6tlPyn+7InqjdvyPIoA1dM8P6donmf2fZQWfmY3+RGFziopPDGkzaj/aD6dbPe7lf7QYxv3Doc1rDpS0AZ2p6Fp+tKi6hZw3YTlROgbbSxaNYw6cbCO1iSyKlPs4T5Np6jFaFITigDJ0/w9pGgtJcWdha2JYfO8UYTj3rhtT8MaT8VJ5b2bTbeXQR83ntGu/UmHT5v+eIx/wP/d+9sX6p4/1C503z1OhWcgS7WCT/AI+5MZ8okdEHy7h1PT7ud3YxW8cMAiRFSJRtVFGAB6UAecfDuZ/BWh+HtMmYtod5aQLYTs3/AB7ymMHyGPof4D/wH+7n0z7y1m3+h2WpaRJp88CtZvF5XlKNoC9semO3pWN4e1S606/OgatIZbqJN9rct/y+Qj+L/rovAYf8C/i4AOgspraaOU25Qqsro+z++D8345q7WToGmyaXBdLI4Yy3c1wMdldywH61rUAUbXT4La6uriNdsty4eTnqQoUfooq9XP6JdSza/r8UkheOGeMRqf4AYUJ/WugoAKKKKAKWoT21vBG11t2GaNBvGfnZwqfjuK1drJ8Q6c+q2cMUZCsl3bXBz6RzI7fota1ABRRRQBHJGkyMjqHU8EEVyzeChphabw7dHRXJ3G2Cb7Rz/tRfw/VCtdbRQByaeLptGZYvENm2m/wi+ibzbR/+B9U/4Go+prfl1C1hs3u3njW1RDI05cbAg5Jz6VZdBIhUgMp4INed/FKfTfhf8IvHWu2dslrDZ6VdXrxR/wCq3JCx4ToM+1AG1ovxX8F+JbyOz0jxboeqXkv+rgs9Rhld/wDdVW5rrN1fDfxJ8B6D8Nf+Ce3hmx/s63g8Zw6Pp6aHPbQhL7+2JNjRmFh8+/zGOdvbd2r7X0b7R/ZFj9s3fa/ITzv9/aN365oAv0UUUAFFFFABWB4P/wCPbUv+wjc/+jGrfrA8H/8AHtqX/YRuf/RjUAb9YOu+F7fXjFK0ktpfW5LW17bnbLCfb+8D3U5BreooA5NL7xHo52XunprcK8Lc6c4jlP8AvxOwX/vlz9BViLxnAyHzNP1eB1+8jadM2P8AgSqVP4Guj20YFAHMN4pv7gYsfD2oTMekl1st0/Hc2/8A8cqGXw9rHiAY1u/W2s2+9p+mFlV/Z5jh2H+6ErrcCloAqWFhb6XaRWtrDHb28a7UiiG1VHsKku2K2srDghDU9RyxiSNkb7rDBoAyvCc8l34W0eeZzLNLZwu7t1ZigyaZ4n0GPxBYLGJDbXUT+da3Ua5eCQdGH9R3GRWhp1jFpmn2tnACsNvGsSbuu0DAq2elAHGfD3xZceI7S/t9SEcGsWF5Nb3NvDnaAHYI6Z6owHDfUdVrtK4/WdJS9catoLRJq9lJIqhflSf5v3sMv+8e/Y4P12dA1238Rael1b7l+YpJFIuHhcfeRx2YGgC5FaQQzzTRxqkszBpGA5cgY5/Crdc54fb/AIqHxHnOPtEON3/XFK6OgAooooAxvEuoTaZYQSwkB3vbaFtwz8sk6I3/AI6xrZqjqL28cSG6aNY/MRV3/d3lwE/Hdtx71eoAKKKKACiiigArlPiL8O9F+Kng7UfC3iKGa50XUE8q6t4Lh4TKmfusyMpwe4711dFAHlfhj9nDwL4T13TdYh0671PUtLTZp9zrOoXF8bMY2/uRM7BDt43DmvUttOooAKKKKACiiigArA8H/wDHtqX/AGEbn/0Y1b9YHg//AI9tS/7CNz/6MagDfooooAKKKKACiiigAqKdzHA7DqFJqWorhPMhdP7wxQBS8PXz6roOm3soCy3NvHM4XplkBrRPSqGiad/ZOj2Njv8AN+zQJBvxjdtUDP6VfI4xQBk6BpkmmQXSSuhaW7muBs/uu5YfzrE1+yuPDmqSeItOhaWJ1C6nZxDc0yDpKg/56IP++l47LW14e1GXUra5eUqDFdzwDaP4UkZV/QVrkZoAo6bqlnq0KzWlxFcRkB1aNs8EZX9DV+vMNLgl+H3i/Xbg25i8Maldxt5mDi2mKIN//XNm4/2W/wBk/L6Z5i7c5oAfRTfMG3NN8xfUUAZviPTZNTsoIoiqsl3bXBLf3Y5kdv0U1rVj+IdTfTbGCaIKWe7toTu/uyTIh/RjWxQAUUUUAFFFFABRRRQAUUUUAFFFFABRRVW8vIdOtZ7m4lWG2hQvJK5wqKBkkmgC1WB4P/49tS/7CNz/AOjGrmfA3x28GfEfVk0zQ9Vee8ktzeW8c9rLB9qgDbfOhZ1USpnHzJkfMK0tH1uPR21K2urPUg/26Zw0WnXEqMrPkFWVCDQB2dFc/wD8JnZ/8+er/wDgquf/AIij/hM7P/nz1f8A8FVz/wDEUAdBRXP/APCZ2f8Az56v/wCCq5/+Io/4TOz/AOfPV/8AwVXP/wARQB0FFc//AMJnZ/8APnq//gquf/iKP+Ezs/8Anz1f/wAFVz/8RQB0FRTyeTC79dozWJ/wmdn/AM+er/8Agquf/iKqan45060066nnt9VghjjZnkfSrnCLjk/coA3NH1EarpNlfKhQXMCThD1XcoOP1q8elcf4d8S22l6Bp1nJa6qz21rFC7LpVzgkIo4+StI+M7PH/Hnq3/gquf8A4igDR06S1kilNr5exZnD+WP+Wm75/wAc5q6elcN4Z8W2FtFqUKwapKV1Cdn26Vc8M778fc9HWtv/AITOy/589X/8FVz/APEUAWzNZ6x9v091WcR/ubiKRcr867se/BrxX9pezuPDP7M3jnTpLt7rz7cWOmPvYTRtNKkcIL9SyO67T/sjNehaR4psrbxFrZaHU3edoZvLXSrnKJs2Ln5O5Rvyrnfi94asPi3o+labPfeIdItbLVLbU3W10aZ/PeCVZER98R+Teqnj0oA+Rrn4weJPD/7Kvir4T2msXv8Awmng6DWLLX9a8xvOs9NtS7xTb+vmTRPDGnf5mb+GqRstD+HHjbwpY+IvDPiTxhpvhL4Yw6hqtnpRmmZ7yeTe01x+9A+URTYLN/FxX1R8UvhB4P8AiV4X8aaRb22teGbrxi0P9tarpmizfaLpY1VArF4mGNiAU7w98NdO0Hxl448SSat4ivr3xVp1tpsyT6E/lWscCOieUoh/23JByPmoAr/sneE7vw/8KHv9ZvRJpXiDVf7b0bTpb571NMtZjGba2Ezsdxzhvl4BfAr6Crw/wD4b0z4SfCfw94Li1HXtSstJurVLa61HSJg+xblHSP5IlX/YH/Aa9Q/4TOz/AOfPV/8AwVXP/wARQB0FFc//AMJnZ/8APnq//gquf/iKP+Ezs/8Anz1f/wAFVz/8RQB0FFc8fGlmo/48tY/8FVz/APEV8d/ttft/6/8AsqeO/Bdtp3hWPWdG1a1uJbu31NJbSbKOgHlP07nqpoA+5aK+af2WP229B/aktyum+E/FGhXUabpZbyxZ7L6Lcr8n54NfS1ABRRRQAUUUUAFeRfta2eo3/wCzR8TLfSFkfUX0C7ESxffP7s5x/wABzXrtRvGsiFHAZSMEHvQB8o6leWWufFb9lh/DksUqx6beXLNaNuC2H9nKvzY/g3mIfWvrEdK5Hwn8KPB3gS/u73w54Z0rRLy64nnsbRInkXdu2lgOmecV19ABRRRQAUUUUAFMZtoyx20+s7W9Pg1TRr2zuXaK3uIHileN9jKhGGIbtxQBzOg/GXwN4n8QvoGkeL9G1LWV3/6FbX0bynZ9/aAfm298dKiT4jeCfHOo6p4PsfFGl3+rGGWG50+0vEe4Rfuv8oPVc8+nevla28JnxtbeFH8GE6X8N/hja3iaFrV44+3eIdRFpJCqw4Vcwr825/8AloV4Xauaj0FLax+A/wCyLe6aqprEmv6WvmwD966zQy/bNx6/MC5egD7mX5VxXH+Mviz4L+Hs0MXifxTpWhSzpvjj1C7SJindsE/d9+ldgv3K+ZPjTBFpHxJ8QWPgexPiD4peNdGh06aC/kQ6fpNjGZVF5N8uUTdK/wAn/LRl4H3jQB7BrXxR8AfD1o5NX8V6Po/9rN9tja8vkTzlIVfMXc33PlHzdK7W3uY7uBJ4pFkhkUMjochgehFfJd/8IbXw38EdV8PfDHU/DfiHxRpPhWHw7rWp6rO8rm0SF3RVVdyIWDuw3cdM7tte1/sy6vpOt/s/fD+60FLxNHOjWyWq6gd04RE2fORwT8vagDW8XfETwT8NdXN34m8T6boF1fwIiJqF4kW9Iy53BSeg3tk9KXxJ8bfAHhBbJtc8beH9IW9g+1WpvtUhh+0Q/wDPRNzfMnI+YV5H8aUtPD3xL1JfB9lL4j+KvjDRU0qPT72QNp+n2cbvuvLj5cxxqZTx/wAtGwoHdeR8KfAi98MXWiWHhDxV4M8QP4Q8IW+mTDXLFr6XzfOmlEmxHUQo7KwB3EjYfl4oA+ttL1S01nT7a/sLiK8srmNZobmBw6Sowyrqw4II71V8TeK9H8G6RPquu6pa6RpsOPMu7yVY4kz0+Y1xv7PHxSk+M/wb8M+MZ9OTSp9SgYyWcT70jdHeNtjd0JQlf9kirfxT0rw/rsGhabrJ06bVzqK3WgW+pTsiS38KPKnA5bCq5xzwtAEh+IvgnxV4Qn8QQ+KdKm8O2E6S3OpxXsfkwPE6vh33YTayjINbXhDxz4f8fae9/wCHdasdbs0fymmsJ1kCOP4Wx0Psa+Bb9r2z+Leo+G/FMVuut3nxS0C78R/2d/yC5reS2b7GIlK5HzQpvD9X59K+lfhwWs/2zPiza2aiPTZNA0e4uEi+59rzOuW/2zGF/BRQB9D0UUUAFecfED9n74ffFXxTo3iHxh4VsPEepaPG8Vi2pJ5sUIdgzfuj8hOVHJBr0emt1oAqadp9rpVnFa2VtDZ2sS7Y4IECIg9Ao4FXAc1+fnx2+MzXFv8AGm91zxrrHhrxdoOpjRPCPhzStQktHXKJ5V00Sf64Su7MWfKBVxX3Z4YtLjTfDelWt3M91dQ2kUcs8py8jhAGZj6k0AbFFFFABRRRQAUUUUAFFFFABRRRQAUVFNEs0Txv91hg818D/BvxBrfwMj1nUte1S81n4O+I/E+saHdLeXDyv4cnS+mt7d1cnd9mdVRDz8hwaAPv2s7W9ItfEGkX2l3kZns7yF7eeHeU3o64ZcjkcHtXzH+y58WX0vwvofgaDR7m9uIfCB8Sw6hLf+a14Tcyo0RL5KtkD5mOPmrTsv2uNc8QQ+G08PfDS91a81vwx/wlCI2qQwpFCH2yxEtzvDFQPl+bPagDuPCP7Jfwr8B61pOq6L4Ya1vNJLNY+bqV1cRWxKFMpHJKyD5WYfd71r+Gv2fPAXhDxHb67pOhtbX1s80toj3txLb2bzZ81oLd3McJfc2diL1NeNap+0kfir4JOk6j4Q1Pwzo/jXwrqOp6DqLaihmlWGEO4cQtuhba4I2senaovhZ+1Bc+APh/8N7X4heFr3w9o+o+GBc2XiCS9ju/O+y2azS+cicxsYkZ15bPfaaAPrTtXk3jT9l34beP/Fd/4l1vQZrrW76NIbi6i1S8tzKiDCKVjlVcD6dzXlur/twHQ7XULi48Dz3Kw6C/iVILHVYZpobRJIlZblRxBJsk3hNzZ2MvWvYtA+K8rfC7UfHPivQrjwjp1lBLfGC5uI55TaJH5iyts4VmX+DqCMUAZNz+yt8NJo0t4NBuNNtvsMOmy2+mand2kVzbRDEcUyxyqJgq/L8+47eOlem6NpNh4f0q10vS7WGx0+ziWCC2t02JGijAVQOgFeC3H7TeuW+naFJqngG80NPFtnO/hyaTUYnaW4WB7iKC4VV/cO8aMw++vy4Jqn+y/o891+yZHqWpWt7Z6lr+mS6hfTy6k9xLcyvD804fd+7L9dq4xQB6B40/Zj+HHxD8W3XifXNCmutcuoUt5ryDU7u3Lxp9xCI5VXA57d6guf2U/hlNb2sMPh+bTYoLFNM26Vql5ZedapnZDN5Mq+co3N9/d95vU15b+zV8fda074ffCPw14l8JXVimteFll0rV5dSima+e1tUd/NX/AJZl0+cEsf8Aa21JaftiWvjZfEXhttIlsNWPhy+1azu/D2rw3YPkKPNiWbaESdN6sPvp/tUAfTXh/QNO8KaLZaRpFnDp2mWUSw29rboESJBwFArE8f8Awx8O/E7T7K11+yef+z7lb2znt7iW3uLWYBgJIpY2V0bazDg9GIrwHSf2vpNCto9Pu/CGtX+maN4Y07xJqev3N9bll0+a23m4ccM8odHXYAC21iO1dVN+0h4p0m10O/1z4Y3uk6ZrF9ptta3h1SGVQl5L5Y3qORImUJQZHzfe4oA7a1/Z38AWnhfV9COg/abLWJ0u9Qmu7qaa7uZ0xsle5dzNvXau07/kx8uK3fAfwu8OfDWG9j0Kylgkv5lnu7u6upru5uXAwplmmd3fA4G5uO1eF/G/9pTxJokPjnRvDPh2Qav4a1rRLB7hr2NFmhvXRt67h8udzRYbpu3V1PgH9pl/HXxTufBa6Bb2VzY3EtlqEb6xC13ayxxby5tuGeEt8iumc/ewBQB73RSDpS0AFFFFAHm/xf8AgppHxj0SHT9Qu7zStt1BcyXWmLCs0ywyCVIneRH/AHe9VJUdcV6Ki7VAzmn0UAFFFFABRRRQAUUUUAFFFFABRRRQBHIrNGwQ7WI4PpXkfgT9nuz8N/DPxJ4G8RaxJ4x0fXrq9ubr7Zaxwn/SneSZcJ/tuxHpRRQByVh+yIfCln4Tj8I+OtS8NXWh6C/hmW6FnDcG8sTJvUFX4SRWzhx/e6Vc+G/7Lc/w8GhmPxpd6gdI8MT+F7ZprCNf3Lyb1lbB5ddqex2+9FFAEmlfsp2dlZ/DezuPE17eWvgzSLzRkQ2yIbyG4iER3kfcIRR92qGn/sgWt/pOmaL408WX3jDw/o2kXOjaTp72kVt9mhmhNuXd05kkWE7A3HdsZNFFAGfo/wCxrcaV8ONd8Enx7cnQ7/TG0qOGz0WztWETbV8yZo1Bnl2Lt3nH3icE17fN4AsdW+G7eDtcc6xp8+m/2ZdyMvlGeMxbGOF6Ej0oooA8q079l3UGbw9Hr3j/AFLX7PwtbzQ+H4J7GGP7JI8LQJPMV/17pE5UZwvcjNd/4B+FjeA/g9YeAo9anvhY6c2nRanLAiy7NpVGKD5cqD+OKKKAPPdU/ZGsNZ8JfD3w9eeJ79rLwho95oqNFAiPdwz2htCWb+ArG3G3vWPZfse6wj+HftXxPvbiHQdDvPD1nbpo1tFEtrcQpExwv/LT5EO/vjoPmyUUAa2g/siabaR61Za14lvNe0rWPCVt4QurR7WOHNtAjIkgdeQ/zv8A5FLdfsw69rngo+H9e+KmtaxJZi0Oj3YsbeD7BJbTJLFMyKu2aTMYBZu2ePmoooApT/sh6jqb+M7nVviPqGo6n4nm027nvP7Ngi8i5spA8Tog42YULsbP+9Wzo/7MtwvxP0Pxj4h8X3HiS40W6mvbNZ9Mt4bhZZImjZGuEG8wje5WLoPl5O2iigD3kdKWiigAooooAKKKKACiiigD/9k=)
![](data:image/png;base64, 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)
Refer to Figure 15.1. In this industry, in the long run
◦ firms will continue to earn economic profits.
◦ firms will enter until all firms earn a normal profit.
◦ demand for the product will decrease so that profits are decreased.
◦ the government will impose price controls to eliminate any economic profits.