An operations manager has narrowed down the search for a new plant to three locations. Fixed and variable costs follow:
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCABNATwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD7z8SeJPiLr/xo1zwh4Q1zwv4f03R/D+l6rJLrfh+51OaeW7udRiKgx31sEVVsUOMMSXPIwBXP+OvGvjj4X/Yf+Ey+Ovwf8Jfbt/2T+3fC89l9o2bd/l+bri7tu9M4zjcueorq/Dn/ACdP8Q/+xM8Nf+l2u15V+31/zbl/2Wbw5/7cUAeq/wDCOfG//oofw/8A/CDvv/lzR/wjnxv/AOih/D//AMIO+/8AlzXnv7Xf7Ul18J/gv8XtS8DiK48WeCbfShLcXUImtIZr65WLy8B8mWOJhKVYBR5sJ+YFlHjfiv8Aau+Jfws8G/tTWNt4htviDe/DOLQH0PxDdWECzS/2iimdpVtgkLiDcWXCD7p37qAPqb/hHPjf/wBFD+H/AP4Qd9/8uaim0b4028kEcvxI+HkbzuY4lfwLegyNtLbVH9tcnarHA7KT2ryrxh408QeGD4L8Ij9odr/WfEmsXqWN/Z6Dpi30sKWMc6xTTsDawpDvE0j/AGfzJEliREDfM3zvoPxv8YfHbVf2MvF/ij4g3fgj+34vF0+p3WkCzgtLeawhngS7C3MMsYd4mdHMgZFDt5axkkkA+0dGPxZ8R/bv7J+K/wAMtU+wXUljd/YvBd3N9nuExvhk260dki5GUOCMjIrR/wCEc+N//RQ/h/8A+EHff/LmviX4Z/HX4hRfFL/hV1v43tvDVrrvxV8aaVfeMItD0uG/8rTLK0lhZwtuls8sryN5krwl2yMFcAV0nwo/aV+LHxkvf2T55/Gs3hxPiXZeJ7XXrXS9MsmiL6aJhDcw+dDI6SsApbLGLKLiMDcrAH1t/wAI58b/APoofw//APCDvv8A5c0f8I58b/8Aoofw/wD/AAg77/5c1zv7DXxc8Q/HT9lfwJ428VzxXXiHUorpLu4hiWJZWhu5oA+xQFUssSkhQBknAA4r3egD5/8ABur/ABv8W+I/Helf8Jr8P7T/AIRfWo9I87/hCL5/tO/TrO98zH9sDZj7Zs25b/V7s/NgVfGvxL8VfDXVYtM8X/tA/BfwrqUsIuY7PW/DktnM8RZlEgSTXFJUsjjdjGVI7Gu1+Df/ACUX47f9jnbf+o9o1eJftbWuvXv7ZP7KcPhjUtP0jXXXxb9mvNUsXvbeM/2bDu3wpNEzZXcBiQYJBO4DaQDvPC/xD8X+N3sk8OfHz4Na+99NNbWi6X4amuTcSwxrJNHHs1w7mRHR2UZKq6k4BFdj/wAI58b/APoofw//APCDvv8A5c14L4jsPE/w+/ab/Za0PUtS0v8At3xVpeuf8JXdadomnYuNXt9IjE2oW87WgmjklfYGIKqyQQqYwAytxvhX4+/FLR/Ffxc8N6p8UJfE+reB9L1bxN4YdNIslg8ZWqQbYoD5dsuVtbi3kjk+zuru80ihgIuAD6s/4Rz43/8ARQ/h/wD+EHff/Lmufstf+Iuo+Mr/AMIWnxo+E914ssIRc3mgw+Erl762iIQiSSAa3vRSJYzuIA/eJ/eGfn34PftIfHFPh74l8ba+Yta8OP8ACy58aadc67/ZKTHV4UDmG3gsJ/Naww2N06CUMu1mRuGp/sr+I9c8aftp+DfE/iPxN/wlOr6/8BrXV55xbwQLavPqkcrWyrCqjbGzMoLAvjG4k8kA+jfGfiH4i/DiwhvfFnxp+E/heymk8qK51rwlc2kbv/dVpNbUE+wrQ0b/AIWz4jW6bSfiv8M9UW1kWGc2fgu7mEMjRpKqPt1o7WMcsTgHkrIjdGBPA+B5w3/BQb4nR+MEhXUV8N6T/wAIIblRuOn7ZTqJgJ/i+0MofHzbQueBWZ8f/Gum/Abw3o9v8IJ9M8KzePPirYaD4j1i1t1mWyuLqELdXMSSZgEyrbwhsq0YbzNy79xoA9i/4Rz43/8ARQ/h/wD+EHff/Lmol0b40vcyWy/Ej4eNcRosjwjwLe71ViwViP7ayASjAHvtPoa+NtX/AGqvjI/gbWry38YR3emeCfHHiPRNb1DQbfTV8Qalo9hFbmPUILe4ja3lELXG+fyo0G3ywDGCzjsv2OvEmp+Jv2r/AIqXer/GDVvFMaaP4S+wtd21lZReIEuNHnu8i2MHmQqhlmnWKBoyu5vNMuGJAPpz/hHPjf8A9FD+H/8A4Qd9/wDLmj/hHPjf/wBFD+H/AP4Qd9/8ua9VooA8q/4Rz43/APRQ/h//AOEHff8Ay5rj/hj4h+NPxC+EXhPx3c+O/h5olvrmh2mtyW8vgu9dLRZrdJirSnWFBCBsFiFzjOBX0LXlX7J3/JrHwb/7EzRv/SGGgDiPD/xQ8T+LdI1nVdD/AGhPgtrOl6LEJ9UvdP8ADss8NhGQxDzumulYlIRzliB8jehrf8KXvxR8eaHBrXhn4vfC7xFo85ZYtQ0nwddXVvIVYqwWSPWypwwIODwQRXhN7Jqv7PP7SnxA+FvhxLix0z4yQJrfhSSyh/d6ZqjFbfVHXjG6OL/TSD8u2EKOWAOV+098d9X/AGb9P8cwfDDxraWVt8MbDQQngNNFtYtOghuZViEE8r7ri4kkR/NH2cwrGifOWZhkA+o/+Ec+N/8A0UP4f/8AhB33/wAuaztGPxZ8R/bv7J+K/wAMtU+wXUljd/YvBd3N9nuExvhk260dki5GUOCMjIrzf4b+KPib44/aw+OXgr/hZN3beGfBGq+Hb+ytZtIsZWe1u7eS4ubEusKN5bD5FckyqEjO9iH8zx74TfFzxIt74p8GSfFI+GNdu/i34n0KzubHw3pMN9qsdnawP59xOYEtY9hbzJpWt5JZdyom04FAH01e6/8AEXTvGVh4Qu/jR8J7XxZfwm5s9Bm8JXKX1zEA5MkcB1ve6gRSHcAR+7f+6cF7r/xF07xlYeELv40fCe18WX8JubPQZvCVyl9cxAOTJHAdb3uoEUh3AEfu3/unHx7onxb8S/tD+If2IPGuv+IofCPibWLfxxFNrmnW8KrbvFAbdZVjnDxbmESkhgV3McAcAbvwu+MPiD4+fEz9g/x14pW1GvapH44W6aziMUbmG2aBXC5OCyxKxxxknAAwAAfYv/COfG//AKKH8P8A/wAIO+/+XNU9Ytfi/wCHtLudS1X4o/DbTNOtUMk95eeCbyKGJB1Z3bWgFHuTXzd+yJ+0N8d/i74s+Huv+IY1fwj4luNZs9etb4aVa22mT23mm2j02OOf7c7gxbZVuUcgHco24cenftfTiL4xfs6r4mSE/CxvEl3/AG412oNsNQ+yMNKE2eNvnl8bvl3BCeQKAOp8K+K/H3jpbU+G/jf8I/EIu4pp7c6V4VuLnzo4mRJXTZrZ3KjSxKxHCmRAcFhnpv8AhHPjf/0UP4f/APhB33/y5ry79trx5o/wD8CeMviz4UsdJ/4XHpXh+OxtryeJpJF0+41KzicyopCsA5Vo/Mz8yPtyvmA+QeIfj78bLTWfi14C8K+OLLxfqPg7XvDq2OrPHp1prGtWd5ZT3V5Z2YMRtJLoCE+WPJY7VlyrsAKAPqubRvjTbyQRy/Ej4eRvO5jiV/At6DI20ttUf21ydqscDspPapf+Ec+N/wD0UP4f/wDhB33/AMua+NdQ+JWo/Enxv+x9r3/C7fEQ8P6/H4s1CfxDcafpulvbvbW8wR5YHgktxLHHNJau7K8ZEZeMIZCx/R+gDyr/AIRz43/9FD+H/wD4Qd9/8uaP+Ec+N/8A0UP4f/8AhB33/wAua9VooA8K8a638YfhrY6PrOp+LfA+t6bL4g0bSrqxtPCF5ZzPFe6lbWbskzapKEZVuCwJjYZUAjmvda8q/aW/5J1pH/Y5+E//AFIdOr1WgD5/1fUvHGn/ALU/jX/hDfD3h/Xt/gzw79r/ALd16fTPKxfa5s8vyrK58zOXznZt2rjduO08deCvHHxQ+w/8Jl8Cvg/4t+w7/sn9u+KJ737Pv27/AC/N0Ntu7YmcYztXPQV1fhz/AJOn+If/AGJnhr/0u12vVaAPAPC/gvxx4I0K/wBE8OfAv4QaBo1+Wa807S/FE9tb3JZQrGSNNDCvlQFOQeBipfD/AIX+IHhLwzc+HND+CXwk0bw9dCRZ9I0/xXcQWkocYkDxJogRtw4ORyOte9UUAeB2/hHx5aaBpuhQfA74RQ6Jpk63Njpsfiqdba0lUkrJFGND2owJJDKARk1laf4S8Q20tv4dsfgf8EopNFnj1uHSbfxVIpsJpWcR3ixDQ/3Tu0MoWUAFjE+CSpx9I18f+BPHmvn4j6D8Urrw/wCILXw34u1qSxn8SXN1aPo1zod4Ug0A29sly14srSppzKs0IWJ9V1VisYlJQA6S2+B+pWekX2lW/wCzT8CoNLvpIpbuyi1tlguHj3eU0iDQtrFN77SQcb2xjJrV1H4d+LtX1zRtavvgF8Gr3WdFjhi0vUbjxLNJcWCQuXhWCQ6GWiCMSyhSNpJIwa+h6KAPCvBWgfEX4a6VLpnhD4L/AAn8K6bLMbmSz0Txbc2cLylVUyFI9EUFiqIN2M4UDsK6D/hI/jf/ANE8+H//AIXl9/8AKavVaKAPl/4T6/8AGFPHnxna08C+B57h/Ftu14k3jS8jWGX+wtJASNhpLGRfLEbbiEO5nXaQod+g1/wV448V+KtN8T638Cvg/rPiTTfL+w6xqHiiee8tfLcyR+VM+hl02uxddpGGJI5NdX8G/wDkovx2/wCxztv/AFHtGr1WgD538YfDnxb8Qtat9Y8VfAH4M+JdXtolggv9Y8STXdxFGrM6oskmhllUMzMADgFie5qDS/hV4j0PUdF1DTv2ePgpp9/okZi0u6tfEMkctghkkkKwMuhAxAvLK+Fx80jnqxz9H1xXxvsvDuo/Bfx9aeL7+40vwnP4f1CLWL60UtNbWTW0gnkQBHJZYy5A2NyB8p6EA8S+BXjHU/EWhazrXwj+G3wWfSrnUp7bUrvwv4yniSe7hYq/mmPRBvbncrHIdJFdSyOrGtBajwFp2n/E2H4Rfs/+HLC1gE9n4xTxl9lihhuScPHeDRAFSU3Dcq2HMx67+V/ZHtdL8QN8UPDfijRNP1LxI17qkGsX0aM1hrGmy+IvECRo1rKziHFwNTBhJlzHJFulkLFIz4Zf8kd/Yl/7h/8A6iGp0AdVrtr43+M3hrTpNa+EXwf8deH7mNL2ye/8ZT6jaSo6hkliLaIyMGUghl6ggg1l6H4l13x5outeANH+HvwQ8RaRohGn6p4XsfHkl1BYHcwEE9qujFYvmjkGxlHKNxkGu/8A2af+Sdav/wBjn4s/9SHUa+VfEf8Ayax8PP8As2bxL/6Q6FQB6v4UST4seDbe38M/Cb4BeMvCemCXTIYtJ8Z/brG0DNFNJbqI9FZEyUt5GQYyVjYjhTWv4A8WeIvHl9L408EeAfgn4ivIY/7Hk8Q+H/H0l1IkaBX+ym4i0YkKoZG8vdgZU45FY37R3/N0/wD2Rmz/APdjr1Xw5/ydP8Q/+xM8Nf8ApdrtAB/wkfxv/wCiefD/AP8AC8vv/lNR/wAJH8b/APonnw//APC8vv8A5TV6rRQB5V/wkfxv/wCiefD/AP8AC8vv/lNXmn7Mmv8Axhh/Zt+FEemeBfA95pqeEtJW1uLvxpeQTSxCzi2O8a6S4RiuCVDuASQGbGT9QV5V+yd/yax8G/8AsTNG/wDSGGgChdy/Fy/1Ww1O6+Ffw0udS08SCzvJfGt201sJABJ5bnRcpuAAbBGQBmsfxR4S8e+OJppvEfwP+EXiCWa2FnLJqniq4uWkg3h/KYvoZym8Btp4yAcZr3yigD558KfD7xh4D1671zwz8A/g34d1q7jeK41LSfEs1rczI7h3V5I9DDMGZVYgnkqD1FUtD+EWveGIpItG/Z0+COkxSTw3TpY6/JCGmh3eTIQuhDLpvfa3Vd7Yxk19J0UAfOMnwt8TTeHD4fk/Z6+Cr6CXeQ6W3iGU2u53R3byv7C25Zo42JxyUUnkCo/E/hHxBb3Fl4u8RfA74JRz+GLVJLXXdT8VSBtJt7cmVGSd9DzBHEdzggqE5Ix1r6Srz/46adpeq/D9bfVNX/sLOtaM9hfNbNcompLqdq2nrJEuGeJrtbdHUMmUZv3kf31APHvh94y1TUvDt18YfCPw3+C1tpmuWT6hfeMbTxlPatcW6ZaR7qc6IrjYUbeJSCjIwYKVIHQ/Ez4neN/Cnhh2+IXhT4P6P4dvpBZM3ib4jTwWlw7KzCI+do4RiVRjt5yFJxwa8K8AReHfFP8AwTM+JVpN4bt4NSs/A0Laus0hu4Lq9h8L6fPZXcfmAbWW2GnHARfLmifaX2iaT6g8R/8AJ0/w8/7EzxL/AOl2hUAcr4Y8F+OPBOiX2jeHfgX8INB0e/yLvT9M8UT21vcZG0+ZGmhhXyCRyDxVaz+HHizTvDkXh+0+AHwZtdBimkuI9Lh8STJapLJE8UkgiGh7QzRySITjJV2U8MRXZ/snf8msfBv/ALEzRv8A0hhr1WgDwSbwp4+uNN0PT5fgh8I5LDQpUn0m1fxVcGLTpE+49un9iYiZexQAjtXTf8JH8b/+iefD/wD8Ly+/+U1eq0UAeVf8JH8b/wDonnw//wDC8vv/AJTUf8JH8b/+iefD/wD8Ly+/+U1eq0UAfNXxt1r4p3fhfw9F4k8G+D9K0VvGfhX7ReaX4tur64j/AOJ/YFdkL6ZCr5baDmRcAk8kbT9K15V+0t/yTrSP+xz8J/8AqQ6dXqtAHz/q/wAS9I+Hf7U/jX+1bPxBd/bPBnh3y/7C8Oajq+3Zfa5nzPscEvl/eGN+3dhsZ2tjq/8Ahpbwj/0CPiB/4bjxD/8AINHhz/k6f4h/9iZ4a/8AS7Xa9VoA8q/4aW8I/wDQI+IH/huPEP8A8g0f8NLeEf8AoEfED/w3HiH/AOQa9VooA8U8U/Gr4a+OdCutE8SeD/GHiDRbrb9o07VPhdr1zbzbWDrvjfTyrYZVYZHBUHqKwL3xP8DNR8G2HhC7+FOsXXhOwmNzZ6DN8H9ZextpSXJkjgOnbEYmWQ7gAf3j/wB459/1bTIda0q90+4e4jt7uF7eR7S5ktplVlKkpLGyvG2Dw6MGU4IIIBr41/Zr1rXLPw18DfEl9a/EDQY9asrFdf8AEnjTxU+raXrf2nTX8uOCE3919llnvXtHjeSG26GEOrzLBKAe66T+0B4D0DSrLTNM8N+ONO02yhS2tbO0+GfiCKGCJFCpGiLYAKqqAAoAAAAFW/8Ahpbwj/0CPiB/4bjxD/8AINeq0UAeVf8ADS3hH/oEfED/AMNx4h/+QaP+GlvCP/QI+IH/AIbjxD/8g16rRQB8v/Cf9oPwvYePPjPPLpXjhkvfFtvcRCHwDrsrKo0LSY8SKlkTE26NjscKxUo+Nrqx9L/4aW8I/wDQI+IH/huPEP8A8g0fBv8A5KL8dv8Asc7b/wBR7Rq9VoA8q/4aW8I/9Aj4gf8AhuPEP/yDR/w0t4R/6BHxA/8ADceIf/kGvVa5/wCIVl4i1HwB4ltPCF/b6X4sn0y5i0e+u1DQ2160TCCRwUcFVkKEjY3APynoQDxXwb4r+Cnw+8G6r4S8O/DjxRpXhjVZrq4v9Ih+Fuv/AGa6a4J84SRmwIZWU7Nh+VY1SNQEVVFr/hPvgz/wgn/CE/8ACtvEH/CGf9C5/wAKk1r+zv8AW+d/x7/2d5f+t/efd+983XmuV/YtsftXgv4g6VYeJ/EGiTNrWsxP4f1WX7Xqeg3Lazqq/bFuLl7hJ/MQQplTLbmexuW3SyvcV0HhX/hYvj79jL4Unwre2994n1fw/oE2q6hret3NjNPatBBJe4uooJ5RPOgeLzVCuhnMquHjUMAF540+E934m8Ca0vhTxxav4IhuIdBtLT4Ya5DDZCaBbc7NunB1VYQ0YiVhEQ4LIzRwtHq+G/ip8J/B2q61qegeAvFGh6lrc32nVLzTfhTrlvNfy7nbzJ3TTwZW3SSHcxJy7Hua9A+DeoaNqPw7099BOsLYwTXVpJBr+oT399bXUNzLFdQTXE0srSNFOkse4SyJ8g8tmj2E/Ktt8QvFXgr4L6P4003xNrEniHxP8E9c8c6lPqV/Lfw/2xb22mSw3EFvcM8VsqvfXJ8mBI4iHUFCI4woB7V4K+Knwn+GulS6Z4Q8BeKPCumyzG5ks9E+FOuWcLylVUyFI9PUFiqIN2M4UDsKPBXxU+E/w10qXTPCHgLxR4V02WY3Mlnonwp1yzheUqqmQpHp6gsVRBuxnCgdhXKeNda1b4J6V+0Fp/hbXNYFv4b+HNv4o0p9b1O41ia11GRdZV5RLevM5XFha/umYxgoSEBdy3oHwvsG8F/Gjxv4LsdS1i88PWnh/RNYt4Nb1e61SaO6ubnVIp2FxdSSShWSytx5e/YpQlVBdywBb/4aW8I/9Aj4gf8AhuPEP/yDR/w0t4R/6BHxA/8ADceIf/kGvVaKAPKv+GlvCP8A0CPiB/4bjxD/APINeafsyftB+F9F/Zt+FGn3GleOJLi08JaTbyPaeAdduYWZbOJSUljsmSRcjh0YqwwQSCDX1BXlX7J3/JrHwb/7EzRv/SGGgA/4aW8I/wDQI+IH/huPEP8A8g0f8NLeEf8AoEfED/w3HiH/AOQa9VooA8q/4aW8I/8AQI+IH/huPEP/AMg0f8NLeEf+gR8QP/DceIf/AJBr1WigDyr/AIaW8I/9Aj4gf+G48Q//ACDVTVv2gPAev6Ve6ZqfhvxxqOm3sL211Z3fwz8QSwzxOpV43RrAhlZSQVIIIJBr2CigD510nxX8FNF+F9l8OLf4ceKJPAlpClvH4fu/hbr9zaMquJAXSSwYSN5g8wu+WZ8uSWJNWtf8ffBnxX4V03wxrfw28Qaz4b03y/sOj6h8JNans7Xy0McflQvpxRNqMUXaBhSQODXn/wARrHXNN/bi8J3mu+J9Q8O215ZXX/CNapFK8unC1FzoCTaZPArrGks8v9oR+bOm0tf2ASSSaGCKHtvFfwrttH+KHwz0jS/FXji88Q6hqcmtaxd3Hi/UgJNPskEk832UTrZBZLyXToJIEgC+VeSiKKMJviAO1/4aW8I/9Aj4gf8AhuPEP/yDR/w0t4R/6BHxA/8ADceIf/kGvVaKAPKv+GlvCP8A0CPiB/4bjxD/APINH/DS3hH/AKBHxA/8Nx4h/wDkGvVaKAPKv+GlvCP/AECPiB/4bjxD/wDINH/DS3hH/oEfED/w3HiH/wCQa9VooA+avjb8cPDnjDwv4e0iw03xhb3dx4z8K7JNU8Fazp9uNuv2DHfPcWkcScKcbmGTgDJIB+la8q/aW/5J1pH/AGOfhP8A9SHTq9VoA+f9X+LHgf4X/tT+Nf8AhMvGXh/wl9u8GeHfsn9u6pBZfaNl9rm/y/Ndd23emcZxuXPUV1f/AA1j8EP+iyfD/wD8Kix/+O0eHP8Ak6f4h/8AYmeGv/S7Xa9VoA8q/wCGsfgh/wBFk+H/AP4VFj/8do/4ax+CH/RZPh//AOFRY/8Ax2vVaKAPH9W/ak+C2o6Ve2lv8c/A+l3E8LxR31p4m01prZmUgSIJGdCyk5AdGXIGVIyD5V8PfEPwF8C6V4a0W9/ab0fxj4Z8NQ20WkaDr3ifQRaWzWyqtrI32aGF5miCKUEzuodUl2+bHG6fRXxY8df8Kv8AhZ4y8ZfYf7T/AOEd0W91f7F5vlfaPs8Dy+Xv2tt3bMbtpxnOD0rir/4cfFSyk02/0v4tXGo3z6nYy6rpuqaPYx6b9iF1FJex2Qig8+FjEskcZnmuMKxVmMhW4jALf/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47XqtFAHlX/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47XqtFAHy/wDCf9pv4Pad48+M9xd/FfwPa29/4tt7mzlm8R2aLcxDQtJiMkZMmHUSRSJuGRujcdVIHpf/AA1j8EP+iyfD/wD8Kix/+O0fBv8A5KL8dv8Asc7b/wBR7Rq9VoA8q/4ax+CH/RZPh/8A+FRY/wDx2snxZ+0R+z5458K6z4b1v4tfD+90XWLKbT762/4Sy0j86CVDHIm5Jgy5ViMqQRngg17XXP8AxCvfEWneAPEt34QsLfVPFkGmXMuj2N2wWG5vViYwRuS6AK0gQE714J+YdQAfNXwf8U/A74TaL4rQftKeF9Z8TeIZrxpPE03iHR4rm3ilvb27hSOJf3G6KXULmTc0TB5JXyoiEcMer4f+JPwZ8IfCPwv4B8P/ALUmj6Nb+HoYrS21mHxH4flvpbWJGSKCTzYHhKqhRdyxK58pCWJLlj9lfVfGvxB+G3jNIPiXcatbHxBqVla6vrNmkmvaVKmr3qzwzWzRQpA32IWMkMc0RMMk77oTAsVuLdn458Z6hBo/he38Y6hJYav8QL3wpZeNfslkNWltbTS7q5uX8s2/2ZZU1Gwu7TLWwVoYtyqWZZ2ACD43/CTw3rvge08JfHj4f6B4M0j7dLrGmt4o0+5fVnlX935jylpjKZpJLh7nzw7OrCRZjOZIuf0TUf2ZtO0q50bUvjn4X8SeHh4fufCem6PqXi7TI4dJ0e4WJJrKB7fypXVkt7ZfMnkllAgUiQFpC/uvwL8U6p4t+H7XGsXX26/sNa1nRWvGjVHuUsdTurKOaRUCoJXS3R32Kqb2baiLhR8/2Px78d+FPhZp/jm513/hIrvxJ8JtX+Iq6XqlnAtnpd7aQafNHbW32dIpTbE6hIrCeSWQrFFiUHezgHQab46/Z6fSvF9p4p+Pvhfx5ceK9MXQ9Vvtb8VaVBNNpyrOEtQLIW6Iqm7ujvVBJmY5chUCa3gH4xfA7wVqurazfftD+F/F/iHU4be0uNY1vxPo6TfZYGmeCAJarBEFR7m4bd5e8mYhmYKgU8R/EXxb8GtK+NtpJ4iuPG9x4O8DQ+MNNvvEltbJMbiRdUBt5BZxW6NADpsRACCTMsuZCCgTtfhpqGv6J8U/F/gbV/E+oeMLTTdF0nWrfVNZgtIrxXu59RhkhP2WCCIxKLCNl/d790kmXYbFQAP+Gsfgh/0WT4f/APhUWP8A8do/4ax+CH/RZPh//wCFRY//AB2vVaKAPKv+Gsfgh/0WT4f/APhUWP8A8drzT9mT9pv4PaB+zb8KNM1P4r+B9O1Ky8JaTbXVnd+I7OKaCVLOJXjdGkBVlYEFSAQQQa+oK8q/ZO/5NY+Df/YmaN/6Qw0AH/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47XqtFAHlX/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47XqtFAHlX/DWPwQ/6LJ8P/8AwqLH/wCO0f8ADWPwQ/6LJ8P/APwqLH/47XqtFAHx/wCJrz9nTxN8cdP+IUvx88H29pHuur/w7H4n0429/frJpskF00pk82PYdIsCY0YK5tovug3C3Hpcfx8+ASeP7jxfJ8afA9xqUmmRaVBFP4q09obOJZZJZGgHmZjaZmiEpBw4tbbI/dA1xXi/xl8Q1/bV8PeHo/Ev/CPadJZXbaPoV+BHpeu2CPorXMm7YzTXyrLrJREdWj+x2zMiQzTNc9/oHinxXf8Ax21K28V3XiDwToovZLTwtpDx6Y+meJII7UNLI8yia4S5En2iVYvNty0EUbCJjFdbQDW/4ax+CH/RZPh//wCFRY//AB2j/hrH4If9Fk+H/wD4VFj/APHa9VooA8q/4ax+CH/RZPh//wCFRY//AB2j/hrH4If9Fk+H/wD4VFj/APHa9VooA8q/4ax+CH/RZPh//wCFRY//AB2j/hrH4If9Fk+H/wD4VFj/APHa9VooA+avjb+0L8LPHPhfw9onhv4l+D/EGtXXjPwr9n07S9etbm4m26/YO2yNJCzYVWY4HAUnoK+la8q/aW/5J1pH/Y5+E/8A1IdOr1WgDyrw5/ydP8Q/+xM8Nf8Apdrteq1xXjX4IfDr4larFqfi/wAA+F/FWpRQi2jvNb0a2vJkiDMwjDyIxChnc7c4yxPc1z//AAyd8EP+iN/D/wD8Jex/+NUAeq0V5V/wyd8EP+iN/D//AMJex/8AjVH/AAyd8EP+iN/D/wD8Jex/+NUAd/4s8LaX458K6z4b1u1+26LrFlNp99beY0fnQSoY5E3IQy5ViMqQRngg1xWk+AvHs2q2UPiX4hW+reHLCZLiGDS9GfTNSvGiYGEXt0lyySLkB5Eggt1lZQCFhaSCSr/wyd8EP+iN/D//AMJex/8AjVH/AAyd8EP+iN/D/wD8Jex/+NUAeq0V5V/wyd8EP+iN/D//AMJex/8AjVH/AAyd8EP+iN/D/wD8Jex/+NUAeq0V5V/wyd8EP+iN/D//AMJex/8AjVH/AAyd8EP+iN/D/wD8Jex/+NUAHwb/AOSi/Hb/ALHO2/8AUe0avVa8q/4ZO+CH/RG/h/8A+EvY/wDxqj/hk74If9Eb+H//AIS9j/8AGqAPVayfFmgf8JX4V1nRP7S1DRv7SsprL+0dJn8i8tfMQp5sEmDslXduVsHDAHHFcB/wyd8EP+iN/D//AMJex/8AjVH/AAyd8EP+iN/D/wD8Jex/+NUAef8AgP8AZj8ceHPBfj0XHj3T9O8deKL2Vf7W0fTJ0s4LD+2b/UfLEX2lZ1llGp3aM8dwjRLJGI33w+fL1Vr8EfF6+GtEin8Y+H017wzrS6n4ZGneFTaaNpcA01tP+xmxW7MkkQinunUi4Uq8iY/dxiNtb/hk74If9Eb+H/8A4S9j/wDGqP8Ahk74If8ARG/h/wD+EvY//GqADwl4N8X/AA4vPBug6PPp+p6DcXus6v4s1G7tDEWnuppLvFmBOWizd3L7YnSYeQjhp1kRPP5TSP2UvN8Knwp4j8U/2j4b0/wZfeAdETS9P+x3lvpV0lvHK1zM8syXFyEsrbbIkUKBvNJiIdVj6v8A4ZO+CH/RG/h//wCEvY//ABqj/hk74If9Eb+H/wD4S9j/APGqAKn/AAoe+8W6V8RI/H3iO31bUvGvh9PC15ceG9NbS4YNPRbvYY45pro+fu1C5JkLlSBEBGNrF+g+Hnw81zQvFWveK/FevafrviTVrKy0tn0bS302zjtbV7mSECGS4uHMpe9uNz+btK+WAilWZ8r/AIZO+CH/AERv4f8A/hL2P/xqj/hk74If9Eb+H/8A4S9j/wDGqAPVaK8q/wCGTvgh/wBEb+H/AP4S9j/8ao/4ZO+CH/RG/h//AOEvY/8AxqgD1WvKv2Tv+TWPg3/2Jmjf+kMNH/DJ3wQ/6I38P/8Awl7H/wCNUf8ADJ3wQ/6I38P/APwl7H/41QB6rRXlX/DJ3wQ/6I38P/8Awl7H/wCNUf8ADJ3wQ/6I38P/APwl7H/41QB6rRXlX/DJ3wQ/6I38P/8Awl7H/wCNUf8ADJ3wQ/6I38P/APwl7H/41QB6rRXlX/DJ3wQ/6I38P/8Awl7H/wCNUf8ADJ3wQ/6I38P/APwl7H/41QBynj39mzXPG/x90TxZL4t3eDLfN7c6TcxvLeQXUd1o9zDFaSFvLitml0WCR1KFgz3OCxuVe29Ah+Hmua147s9d8W69p+rWGh3s974d0zS9Lex+ySSRSwebcytcSm5lW3mliUqIY/30rNGzeUYcr/hk74If9Eb+H/8A4S9j/wDGqP8Ahk74If8ARG/h/wD+EvY//GqAPVaK8q/4ZO+CH/RG/h//AOEvY/8Axqj/AIZO+CH/AERv4f8A/hL2P/xqgD1WivKv+GTvgh/0Rv4f/wDhL2P/AMao/wCGTvgh/wBEb+H/AP4S9j/8aoA9Voryr/hk74If9Eb+H/8A4S9j/wDGqP8Ahk74If8ARG/h/wD+EvY//GqAD9pb/knWkf8AY5+E/wD1IdOr1WvNNJ/Zk+D2garZanpnwo8D6dqVlMlza3lp4cs4poJUYMkiOsYKsrAEMCCCARXpdAH/2Q==)
Plot the total cost curves in the chart provided and identify the range over which each location would be best. Then use break-even analysis to calculate exactly the break-even quantity that defines each range.
![](data:image/png;base64, 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)
Which of the following statements is correct?
◦ The break-even quantity between A and B is less than or equal to 1700 units.
◦ Location A becomes the most expensive place to produce at volumes less than 2000.
◦ The break-even quantity between C and B is more than 3000 units.
◦ Location C is the best one if volumes are quite low.