Polyhedrons are 3D solids with flat polygonal faces, straight edges, and vertices.[br][br]It is derived from the Greek word, where 'poly' means "many" and hedron means "surface".
Observe the polyhedrons that you have sorted above.[br]What do all the objects have in common regarding their vertices, edges, and faces?[br]Is there a mathematical relationship that works for every solid?
V - E + F = 2, where vertices (V), faces (F), and edges (E)[br]This is called the Euler's formula for polyhedra
A solid is classified as regular if and only if it meets all three criteria for regularity:[br][list=1][*]Face regularity - All faces must be congruent regular polygons.[/*][*]Vertex regularity - The same number of faces must meet at every vertex in exactly the same arrangement[/*][*]Convexity - The solid must be convex.[/*][/list]If a solid does not meet the criteria, it is considered an irregular polygon.
A convex or concave polyhedron is similar to the concept of a convex or concave polygon.[br][br]The test:[br]Select two points on the surface of a polyhedron.[br]Form a line segment.[br]If the line segment joining the two points on the surface of a polyhedron lies entirely inside the polyhedron, it is called a convex polyhedron.[br]If a line segment joining any two points on the surface of a polyhedron goes outside the polyhedron, it is called a concave polyhedron.[br][br]Try out using the solids above.[br][br][i][size=85]Tip: Select two farthest points of a solid[/size][/i]
1. Analyse the regularity and convexity of following polyhedron.[br][img]data:image/png;base64,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[/img]
2. Analyse the regularity and convexity of following polyhedron.[br][img]data:image/png;base64,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[/img]
3. Analyse the regularity and convexity of following polyhedron.[br][img]data:image/png;base64,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[/img]
4. Analyse the regularity and convexity of following polyhedron.[br][img]data:image/png;base64,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[/img]
5. Analyse the regularity and convexity of following polyhedron.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAVUAAAEaCAYAAAChAsSXAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAC2ASURBVHhe7Z15zB1l+YaHTVRkKZYioj+KoKUgWIoiylaocaGCqDSFP2iLgAmJiZAoi8RENICiSeUPJQK1FEKggQQLEhAKVEhpa1oqBYsoYItQ9kW2KgL+uF7P8/l2mPOdmTnv7PeVTM7W9vt6zsx97md5n3eT/7xNJIQQIgib9m6FEEIEQKIqhBABkagKIURAJKpCCBEQiaoQQgREoiqEEAGRqAohREAkqkIIERCJqhBCBESiKoQQAZGoCiFEQCSqQggREImqEEIERKIqhBABkagKIURAJKpCCBEQiaoQQgREoiqEEAGRqAohREAkqkIIERCJqqiEP/7xj9Fhhx3mjtNOO633rBDNR7upitJASF988cVo/vz57j4HbLfddtGkSZPc/VmzZkXjx4/f6DkhmoREVRQGAopwrl27dkRIec4YO3Zs9Oyzz/YebYyEVjQViaoIijlQRNRE1Xjve98bffjDH44OPvhgJ6gcV155ZbRq1apo++23j4466qhozZo10fPPPx+99tpr0fr163t/879IaEUTkKiKoTD3iYjiSH03aiKKeCKk73nPe6L/+7//c68ZGzZsiM4///zo73//e7T//vtHM2bMcM//85//jB5//HF3f8WKFRJa0RgkqiITiKZfWPJFFI477rhol112cfeTRDSJRx99NLr00ktdKgBhxbEm4QutweOFCxf2Hv2XJFHl8Zw5c3qPhCgOiapIJB66g19gMhdqmBtFRBHTrJACWLBgQbTVVltF06dPj8aNG9d7ZXSSHK0Pr+GGkxytD6/xZ4QYFomqeAcI6mWXXda31QkxnThxonOlIVm2bFn08MMPR9tss0306U9/Otp88817r+Tn+uuvd8KalDrwwcWasMZdrhBZkKiKEVdqVfq4S0VEcaZWYMrrRgfx73//O7rlllvcz//Qhz4U7b333r1XhidrjhYni6P1nxMiDRLVjoJoIl5+SG/EC0xFiWgSFKxwrJyW++yzT+o0QB4ktKIIJKodwdxnUpUefDfK/TQFpqJ45JFHoqVLlwZNA6TFhPa5556LVq5c6Z5LK7TAc7wmuotEtYX4ghkP6eMFpqJD+jyQBrj77rujxx57LNpxxx2dYy1TWOMkCa0RF1wT1bjYgtxtN5CotggTUwpM3PcxMaXdKXSBqQj4f9x6663R66+/7kR155137r1SLxBUa+kaVAxDUK2tS462vUhUG4y5z37LQOsU0uehzPxqCNLmaCHuaOVi24NEtWEgnBxJVXpzo3UM6fNSRJtVmWQthoGEttlIVGuOCedoBSbEEyFFQJvmRgdRt/xqCIYRWjCXK+qJRLVmxEN6e9yEAlNR8B4sWbLE3e6xxx7ufWi6sMZJElofXmNlGJioqhhWTySqFWOiCZYXtcfQtAJTUfA+NaFwVRRpV4YhqCqGVYtEtQJMSJNEFNoe0ufF+le32GILl1/deuute690B9/RGjyOD5WBJFG15biiOCSqJWAiGg/pjTYWmIqgjfnVEAzTdeA/J8IgUS0QxNN6RkcTUbnR9HQ9DZAWCW11SFQLhElPJ5xwgruPiCKmCKmF9yIfTetfrQsS2nKQqBYEjoqdQnGoiOhZZ52lkD4gTe9frQtJQstj6zTwkdCmQ6JaEDhUnCpMmDAhOvPMM919EQbyq4gqa/ERVhxrFwtXRYBzjYvqb37zm1EdrU/Xi2ES1QIgj4qg4lZBoloMyq+Why+0fh9tkqvtuqOVqBYAYf/ixYvdScSFL1EtDrVZVYuJrT/BazShRWQRW/+5tiFRDQw5VESVXNUhhxziJtlLVItDbVb1o+tCK1ENCIJKLpXbT3ziE+4Cv+KKKySqBYOwFrUNiwiDCW3a1EGThVaiGhBrofr85z/vRPXJJ5+UqJYEgsp8gFdffdUJKzMCRL3x87RGUkEsSVTrXAyTqAaCi9paqI4//nj3LXvvvfe6NdsHHnhgdNJJJ/X+pCgK9a82nyRHa/g9tSa0fjEM6uBqJaqBMJdKXm/mzJnRu9/97ujyyy+P1q1b51wqblUUj/pX2wuCajMO+vXSzps3L5o9e3bvUTVIVANgxaktt9wyOuqoo6IPfOAD7nmJavkov9oNzNFaMcxc7JQpU6I77rij96eqYdPerRiCCy+80F3EiKkJqqgGWqsI/d/1rndFTz31VPT000/3XhFt4oMf/GC02267Rfvvv390yimnREcffbR7HoPDUSUS1SHhAyS5TrjPByyqh2XB++23n3Otq1evjl5++eXeK6LtYG4kqg3HXCrhvVxqfUBYcTKbbLJJ9Ne//lXC2mII+zE2hl2TVSFRzQkfGsUpudR6QhrggAMOiMaMGePSAGvWrOm9ItoGuVXrCoCqUwAS1ZzwoVHtR1zpS5VLrSdEEORXcarKr3YHBsJXhUQ1J/ah0UKlyn59UX61W0yePNndssNGVUhUc4A7JW8D9EIS/ov6grDSXoWwkl994403eq+ItrHTTju565FrtKq8qkQ1B+RRCf/lUpsB+dXPfvazTljJr+JYJazthFarPffc012ffvGqTCSqGeHDYl4qgkqjv1xqM0BYmcdg/ascop2Q7oGqUgAS1Yyo0b+5sCbcLrgHHnhA+dWWgwHiKBuJagYspFALVXNRfrX9kFfF8FSVV5WoZkCN/s1HaYD2wwab5FarQqKaAoTUGv3JpaZxqcxS5YLFGWk76npBGoCFAQgraQD1r7YPxm0SURJdlu1WJaop4IPJ2ujPdioc7PWvranrB192HEoDtBOcKgdF5bLzqhLVFPiN/gr72wNFK46XXnopWr58uQpXLaOqhQAS1QHwLadG/3ZCfpUvSdIACCuHaA/MfYCyl6xKVAdg4YMa/duJ8qvtYdq0aa7yb1gXANdvmSkAieoo2IehRv92o/xqOyCH6tcvuE9Ng1qIRLUmqNG/O5BbpX+VFAAbCEpY20WZeVWJah/4ZsvSQiWajc0HIB3w5z//2aUCRPMhJVB2CkCimgDu9JxzzsnUQiWaD8Jq+1vhWNUN0HystarMFIBENQEcqrlUCWq3ILdK1RhR1TSrdlD2gBWJagy+0dRC1W0++clPjuRXlQZoPlzDHFzbHEUjUY2BQyVMUAtVdyGvOnHiRHefpcZqs2o2lgIoK68qUfXgDZdLFUAKgLBR27C0gzJXV0lUPazR/2Mf+5hcasehaMUW19rmuh3YNitc30WnACSqPSw04I0/9NBDh3apuBs4+OCD3a1oHgirtrluB2WmACSqPULPSrVvw7Fjx7pb0Vw4J2izohNAbrW5kCsvA4nq2/DNpUZ/0Q/arDTNqvlYaxXXe5EpgM6LKm+uGv3FIBBWbcPSbGzAStEzVjsvqmr0F2kgv8o2LISQ5Fe1MKA+PPfcc717o+Nvs1LkOMBOiyruVC1UIi0IKtt0kF9FWDlE9axcubJ3bzBlrK7qtKiq0V9kBWG1C1PbXFfD+vXro4suumjkePzxx3uvDMZSAEXSWVFFTMmtgFyqyIKfXy17qnxXQUj/8Ic/OBG96qqrooceemjk2LBhQ+9PDaaMGaudFVVroVKjv8iKPyaQFACjAkVYfBHl+OUvfxktWLDAiSiv8aXGZ/Cd73wnmjFjRu9vpcc3VaHZ5D9v07vfGXhDDzvsMLfb6fHHH19IOHD55ZdH69ati84880yJdkthmDUFq1dffdXNCiCNtPnmm/deFWlBJM1tUnQiR0pIz3O4SgTUIKf9/ve/3237zmvAl9rPfvYzNzuV1Myg3YtvuOGG6J577nHR6R133BFNmjSp90oYOulUQzf6i25CGuBTn/rUyHwA+lhFehDThx9+2IXzOFHfjSKcRJGI6Omnnz5y8HiPPfYYEVSfG2+8MXriiSd6j/pz5JFHui6AolIAnXOqFKdOOOGEQl0qyKl2AwQVYcBdbbPNNm7I9dZbb917VfggogsXLuw9ikbcqEEYzxcV+E50EOZU4eSTT44+8pGPuPujwed17bXXRlOmTHFuNSSdcqp8M6nRX4TEBq+QX8Wpyq3+D4wLXzj9CkzmRjE55EbNhfZzoiGx7avRAo6QdEpU1UIligBhtW1Yur7NtV9g+sUvfrFRSI94IaJWYEoT0qdhq622Gsm7ZulZBfQgdApgsx+8Te9+q+EDPeWUU6Inn3wymjp16kbJ79DwM/70pz9FZFYIL7bddtveK6Kt8BnTs/rss8+6whU5u003bb9nwY2S5kI0r7/++uj22293IvX888+794PrjIiQLd6POOIId+y7775u0BBfRiHgvedn3H333a5IZX3Eo0Ha4dFHH41eeeUVN9rx6KOP7r0yPJ3JqV522WUuzMClzpw5s9C+VMun4obJqYpuQH6VC/uxxx5z5xnutY3dALhR/o+4wtdee809NnCbVNNxo5AlNzoMllcln0peNQ2PPPJIdMkll7jfl7wqKZwQdEJU+ea0Fioqf4QaRSJR7S4I6y233OIiIxaVbL/99r1XmgsO1F+15BeYcKLHHnusuw+E4lZsKhPE/YILLnCRAqJqa/xHg//DxRdf7CJLRJWoMgSdyKn6LVRFC6roNm3Ir1qrk+VGue1XYDrxxBNHikscVQgq4IY5ME4cafAHrISk9aKKS6VARbivWamiDBAWDjoBmjIm0C8wxXtGyTn2KzBVJaKhKGLGaqvDf94ovk25ZWwbyfIyUPgv/DRAHfOruDnC+BUrVriiUrxnlLCefChCWlVInxXC/7/85S/RMccck6pYBUWkAFrtVBFTDrlUUTakAahI12VMICLqh/TW7mShPSG9OVFzo9/4xjcqDenzwhLUtBQxY7W1ThWHQHEKUcWh4lTLQk5VGJyHS5YscW1WuL8yc/p+gSlepY8XmMqq0heJOdUsHQBgXQChVle11qmq0V/UAdp0cKzkJRkWUkR+1VyoHeRC/QITr7/vfe/bKC8aLzA1XVBhl112cf8PvkD8VMYgiGRDtli20qmaS2W4Ai617OWocqoizrJly5zgWTgdKr+K+0Q4/TX1BgKDIz3uuOMaX1BKi7nVtDMADJwqsxvmzZs39NSqVjpV29iLb5+yBVWIJBBT8qs0qQ+TX7V2J3Oj5EVNUBFQ341+97vfdbnRrgjqsKAZIWasts6p8saU2eifhJyqSIL5qzhWLjm6AcaNG9d7pT9WpY/PGTUQUhwp7U0s/2xDGD8MeZ1qyBmrrRNVWqhYklpmC1Uciarox6JFi5xTJdRkxVVSGgA3OtoyUIQUEY0PaxaRKwoSwk+ePDmaPn1679l0kAKgaDVsa1WrRNV3qUXOSh2ERFX0g3z/vffe60STJawMFgFzomBu1Fwo8Oea1DNaFXlmABi8/8xYnT17thPmvLQmp4qg4lI5aRGzOuRS7YIRwqAbYPfdd49eeOEFd87GVy9Zzyi5USr0tnqpqT2jTcJmrPK5oCN5aZWoctBCxQDqOnDwwQf37omuw5i5Bx98MLr00kujX/3qV84VkfsD3GjSMlAJaHZIh+DwSZn4aZMsmJbkpRWiyrcKQ1NA202LOkD4biL64x//OPrJT37ibsn5UbDaddddXd6fL94vfOEL0amnnjriRpUjzQ/vHQcpQI4s+N1C8+fPd7d5aIWoqtFfVI2JKKKJeJ5//vkjIsrznJt77bVX9K1vfctt6fPDH/7Q5dtxqCwMYKKVqBaWq9IxBOhJ3hRA4wtV/MerbPRPwgpVXDQS+faBgBLOA/M777rrLlelx4ECLtTcJmJ66KGHusIJRaY4/Dv33Xdf9Oabb7ptrtk0kH5WkZ9f//rXblh4ng4APlsbsEKxiqJVVhovqnVooYpjokpOjByP5Va5P2hPclFfTEz5bNnELo6JKWE899NCi9Wtt97q7pO+olAl8jNMBwBcc801rmc17yyARosqFr0OLVQGvwehHiPfkvI5iCwXHV0BEtpmgHgiouC7UUA4fSfTz40O4l//+pdbJcWFTP/q3nvvrX3NhmBYUR12wEqjRbVuLpXRYVdccYW7T8HhM5/5jEtPWCWRFEVcbCW09QIniiMlpCe0R0QRU0Awx48fPxLSM6QkiyMdDd+t7rzzzqVOVWsbfGY//elP3RfUN7/5zczXkqUAuFbzrK5qrKjWzaUCTd2MW/vSl77kPoh4FwJ5Gn5fCW19sJDecqO+iIKF9Jxr3A8lonFwq7aKikuSZayIt8hH3uWqhqUA8uRVGymqiBIulap/XVwqgmkuld8trchnFVpE1hYVSGjzgYginvECE8TdaN6QPi+kAZYuXeqGXDNYXWmAfAwrqsOkABopqmVuN50GBJBJQVysOFSc6jBIaMNibjQppAdzoKFD+jzgWBFVXKvSAPmxDoC8osrCAUT1gAMOaL+oIjIIKrc41DqcdBb2czHmacFIgwntqlWron/84x/uOQltMvGQPu5G+Yx84SzbjQ7C8qu4VVqsDFqu5FzTYcWqvKIKiCr7d3G+zJkzp/fsYBonquS2Fi9eXBuX6of9X/3qV0sdNZhVaNuco0VErcBk4b1hIT3nzg477FA7EQVmAXABE/6zaSCP41B4YaoVnxtLMUF9rcmEEFUbsJI1BdAoUcWdcmEQFtfBpSJehP3kbgj7EdWq6YrQIqAUEhBRSArp+f8VXWDKC6L5+uuvOxF95ZVX3DnNY0AkmWDlw2uIbhwJbTImqtOmTXM7q+Y5ry0FgHHL0gXQKFG1FiqW9n3lK1+p1KUiUoT99KRSlOJ3q9o19yNrjraOQjsopK+7GyVXyvufJKKAiCKEu+22m3v/k0SV8YDAJCv+jbRCy/2upQ04PyhWkZseNgWQdcZqY0TVXOqWW27pXGrVLVTWk4qQlh32h6AJQpsmpC+iZzQUo4X05kYRUZwlq6iyusu0QuvnZrsktMN2AECeGauNEVVzqfSkcjFVCcJTt7A/BFULbdyN+iG9iSjUNaRfsWLFRoIWd6O0SJkDxRzE3WgIfKE1+J3YWdUnXgQDHO6ee+7Ze9R8QoiqtVYxBzdtCqARoko/KqLKxV2HRn+r9uNS+b3qsPCgKIoWWnOgg0L6uomo5UQBh4gbNRGN50SHcaMh8IXWHK0PosufSXK0Pk1zt8NsrWKYqELahQC1F1VOVC4qLug6FKcQGcJ+vrlwqG0W1H4MI7RgThR8NwomnnUM6S0vCrjSeIXexJSDwShNYfny5SPCGk8d+OBkaesCxLeKL4gsDDsDAChWsbqKcz5tF0DtRbVOjf6IRhvD/hCkFdo4iCbC24QCEyIaF1ITUbZIKSqkL4skR9tPaJvQdRBCVMHcKtc8ooqhGo1aiyoXJ4JaF5fapbA/BHGhJWfKc4gmTq6KZaCDMBG1kN4vMPlhfdUhfVk0WWitA4DICFFlCHUeOG9txmqaLoBaiyrupS6N/ryhhP2IBA41bc+a+B+8d+SlXn755ejwww93X0x1wC8wxav0iCgFJmi6Ew2FL7QG71+8GAYmtD5lrgwLUayCLF0Am/3gbXr3awXFKTZIAzbyq9IVIqg4VJrpaZ0iPxg/UcRgeM9wLmvWrHHf/gcddFCpLgaxfOmll6JXX33VHSwHRVBJU/A8oslBLpfzDTHlQhw3bpz7vYftbmgLm222mXs//IOQmFkFpEGAz5X3keIXf55rB5fL5859cpUIM6/znB18qYU0TxSr+Dl8jnmdqrF69erojTfeiI499thRf8faOlVzqYT8hP5VorA/LOTJ//a3v7m9mhjIXAYIKgM24jlRsLCelIScaDFYMQy4xe0mEboYZk512LwqpF0IUEtRJf+GqOIaqm70N5eKq1HYHwY+3+uuu86FUlOnTi0kp4p4cuEmrWAyEcVJtaHA1DQQVXLXPqQOTHSNEKmDkKKaNgVQS1HFDdal0Z/9phBUwn5G+lWZ120LrEazk5LdRcmvDku8wOSLKCCaiGm/ZaCiWkxoybfz+dlzcUebtRgWUlStC2BQa1XtRLVOjf60ZNxwww3RTjvtlKrpV6SDzxa3etNNN7mWKrZrzuNWcaNcePEqPZiImhtte5W+jWQVWkTW8t4mtAsWLHB5Vf5Mnq1VfNLOWK2VqOIuCPsRM/bfrnI9vYX97MnO79S0tf11xzoBeJ8HuVUL5Y14SG8CChLRdpMktIYvuL7Q0rXDn50xY4ZbkMJrFMjywEKAt956y527/VKBtRJVa/TfZZddXAtVldg20/w+Vacg2ooVrPbaa6/oRz/6Ue/Z/2EhfdLqJTAxVYFJQL9i2J133ul6Vdn3i3wsBsnyslkFNk0KoDaiai61Do3+FvYDoqpqfzEQ/vN503JDCoBUgF9g4r4vpggo4ik3KgZhjhaYLXzRRRe5fnfGhvokiSrFMJ5PgravQTut1kZUES+cS9WzUnmzrDilan/x0AWAsPIlalt6+6E+IspJTo5MVXqRB/pLzz77bFesOvHEE93KMNIHPn6KyYQWDbJimMHzv/vd79yA9H6tVbUQVS4qXGodilPkUelL5XdA6FXtDw/CiZMglKLp/r777nNu9ZBDDnFuFffZlWWgonhMVCdMmBCdccYZvWc3hpYuUgTgC2wcBJdcLTNAaiuqCCriZW6lykZ/pvgjqIBLVXFqOOIVeUSUAhOCymuWE2VSFbnVj370o9H3v//9aMyYMb2/IcTwcN5973vfc+fb6aefPrDTxFIHuFlcrQ/n7bJly1wky2aAdAXFB6xULqqsmsKl4girdKl+2E/Ij6iKfJiYsjyQMCmOiakVmKxVhc/g3HPPdQUFIUJy1llnRffff78T1WHMEoJLveX3v/+9e5zkVjft3VYCYeCFF17o7mPNqwz7cakIKr/DsPv2dxE+SxzBokWL3PbKHCao5KF4Xw888MDoi1/8ont/OSw/yprsNk2cF+2Fc9Zm5eJUk2oulYoqjf4cVOUYmlIV9Eo++OCD7sI31yxGBxF9+umnXSiEkPKltHTpUvfFhEvl5COcR0SPOOIIJ6IUIVlIkZQjRXB53+fOnevEWYiQoDHwzDPPuNsQIKhJs1UrE1VzqfxnyaNWJWSEnFh5brnwlUdNhpAeETU3iojiRml9QkgpKpmImhtlChUiao50NMyt8u9TLBQiJLa4hKE6RVOZqOJQKU4hplWG/ThU1gbzO1T5e9QNE1FzoxbSmxsF3i8TUl9E+7nRQZhb5efJrYqmUomo+rnUKpv8CftxXFzICvs3DulNRM2N9gvpTUhDtD3hVjmYdSq3KppKJaJ62mmnOZdKHpUCVRXY2v4uh/2IKKG8HX5IbyJq4XyekD4P06ZNcw5YblWEhMZ/Dtr32MG3SEoXVcSU0B9XyBr/qtwhIaxV+7skqL4bJb9k7wMHeVE/pGeHAwvnQ7nRQfhuVaIqQsHSZjaYZN8qf/feIihVVK3Rnwu7yhaqLoX9oxWY4iE9TrQMNzqI/fbbz93SD8hiASGaRKmiiphacco2Uysbv9qPQ22jS+V9xokiopYXjReY/J7RkHnREPC78DvyRcD/Q4gQsMtEGZQmqlzodWj096v9CEob8EN6c6PW6oTT4/8aLzCN1jNaNQwSRuhBblWEgg0cy6A0UaU4VXWjv4X9wESkpob9iKgVl+IhPUK67777OgH1RbTqkD4r9KyaW1VuVTSJUkTVwv4qG/2bHvbzHlpedFCBiVsEtEkiGsd3qwxbkVsVw0KximEqVP8phBZFKaJah0Z/C/v5HZpQnLICkx/S91sGihOtY250WMytXnrppcqtiqGhpYrRkldffbVrrSqKwkUVMSX0R8SqKk75YT/iU5Wwj0a8Sm8FJgvpzY3WucAUGt+t3nbbbe5WiLpTuKhSnCJ0pThVRchd57DfD+njVfp4gcncaJ0LTEVgbpXeQuVWxbCEGKwy6O8WKqq4VGv0r8KlIqQMna5L2J8mpDc3WsQy0CaCW6VpG0HlC1q5VTEMIQarDPq7hYkqLuycc84ZcalVhNzkUREuhJSh02X+Dvy/EdCkkJ5EOVtfs1WIOdG4G21qgakIWLrKPlW8j8qtirpTmKjiUKt0qWBbo5QV9vuTnfg26xfSI5omoOZEu+xGB8GyVcutqm9V1J1CRJWw3xr96UmtwqWyzTRChqjTk1oUfoHJRJSDcB6SQvqqvmTagNyqGAYbrFIkhYiqTaEiKVzFFCpyqXfeeaebys2sgdCi3q/AhJD22zpEIf1w4ORJA4A6AURebLBKkQQXVQSHA9jLpYrCEHlUXCriFkJQs/SMNmEZaBOhYMWgFT5PFgPwpSZEHQkqqojpZZdd5lwqolKFSyXst/2m8oT9eQtMlhuVGy0OhNXGAl511VXKrYrc0PzPIoAiCCqq1uhP2H/ooYeW7lIt7OcWocviUk1MVWCqN6RVOK+IGuRWRV7oe163bl3vUViCiur8+fPdbRXFKVZN2b79VPoH/fykkB4h9QtM8ZBeBabqwanadta33367uxWiTgQTVb/Rv4o8KmLKwc9OavL3q/R+SG/LQAEhTloGqpC+Xphbtc9NiCycfPLJhW6tEkxU/eWoZbtUwv3ly5e7+75LtZAeN9ovpFeBqXmYW6VgxbAVIbKAoBa5tUoQUa260d+q/RSQqBCbG7WQ3t86xNxofBmo3Giz4DN888033ees3KqoE0OLKmG/LUetIpdq1f4tt9zS9aDdddddI24UTEQtpDc3KhFtNuZWtZ21yIMNVlmyZIm7Dckm/3mb3v1ckL9cvHix+yVnzpxZeD51xYoV0fPPP+/ukydds2aNC/8Rz/Hjx2/klBFaiWd7waFecsklbvDweeedV/hKGdEeVq9eHZ199tkuXXnGGWf0nh0MOdgLLrjAGbM77rjDLTCKM5RTxZ1yQFGN/q+//rpznYTwhPPckiflINGMoDJrFCca31JZgtpuON/4MpVbFWVheVjENElQYShRteWooRv9yX8ipPSMWl6UkB4hJcTHFeNOnnvuOXdhsUULP18i2i1IAUyfPt2dA+pbFXlAIENvrZJbVK2FKkSjv7lRE1ETUi4SnPCYMWOi3XfffaRKT8rhjTfeiN566y2XV/v4xz/e+5dE11BuVQwD0W7orVVyi6q1UOUpTsVDel9EfTdqBSaElCo9P4eBJRSnOHj85S9/ufeviq5ifatyq6IO5CpU4VJxixSC0han/AITomq5WMCJkpM1aI1CPJO46aab3M8nn0Hoh1MRYuXKldG1114bTZ06NTr11FN7zwqRDH3qTDujz5kv5RNPPLH3yuhg5ihUTZkyxRWqksjsVBFDa6HCKfYT1HhI7xeYLKQ3N3rIIYe4f8uOfoJKUWrt2rXuFjGVoAqD8wk454QYBNEwO6vCs88+625DkVlUrdEfQST096HA1C+kB8uLWkhPzygrmuyCGATfEqzxV9gv4tDtwXlB4UEpAFElmUQVh2kT/QnXebx+/fqNCkxWpadwgPD6BSbLi47mRvuBmBL683cJ8RgDJ4Rh21kjqNogUGQh9AyATKKKQyWfCay1X7BgwcgywXiByV8GihCmdaNJEO6Tv+D2yCOPVLVfJEIXAOca56PcqhiEba1ivaehSC2qvksFclc03RN2+VX6rCF9GqzaT/52mNYt0W7MrQLDVuRWxWhgAovYWiW1qOJQORC1SZMmub2fvva1r42IaJ6QPg2IKWE/P/frX/+6ilNiVCy3SlWXFishRoPIOjSZC1WctOyhzzr7sWPH9p4tBvKoFvaryV+kgS9dUkSg7azFIA4//PDevXBkFtUyufnmm52w4lJJMQiRBnOr5FXlVkXZ1FZUcacbNmxw92mfUtgv0kJu1XJlcquibGorquRRcakTJ050ob8QWZg2bZrcqhiIdQCwO2+atirmr1JTmjNnTu+Zd1JLUbVqPxfF5z73OfWkiswQ2dDPTOpIblX0wzoA6FVN01bF6iuWyCOs/aidqMZ7UhX2i7xQ2OT8Ud+qKJPaiaof9lNwEGIYJk+e7G61nbXoBxENhNpapVai6jf5K+wXIeCLmfNJYwFFP8aNG+duQw1WqY2o+mG/qv0iFJxHNsRaeVVRBqlElSWqtuZ/2223dbchQUivu+46VftFIdDjjFudO3euOgHEO6BYxfZMoUglqggq+1HBvvvu625DgaDy7yvsF0VhbpXwf+HChb1nhfgvtFTZbNUQVB7+404pToHCflEUnFu06DFoRblVUSSVi+qqVavcLSe8wn5RFLbKShsEin7QpxpirmqloupX+zV4WhQNX9zqBBD9YAEAK6uGpTJRtWo/0EuoCVSiaFhMYp0AcquiKCoTVWvyJ4dqo9qEKBrrBJBbFT677bab6wAgBcCX7jBUIqqIKWE/4RiDL4QoC77EKVrJrQqfk046yXUAkALgGIbSRdVv8ucEV7VflI1WWYk8UMRKI7iliqrfk4pLxTEIUTZ8kWuVlejHM88807u3MWk3CCxVVK0nVdV+UTWWW9UGgcKwwSpsuT8MpYkqLnXp0qXuPi5B1X5RJZZ60gaBwrDBKsNSmqjiUBX2izphYwFvu+02dytECEoRVWvyR1CnT5+usF/UAiImzknyZCpYCYNi1DArqzKJKjkojiyo2i/qii1dRVAvvPBC5VaFI21Bqh+ZRNW2/s0CDpUClcJ+UUe0QaAITaHhvz+B6qCDDlLYL2oHkRPnJmiDwG7DCEAWAcAwW6sUJqp+2K/B06LOjBkzxt3KrXYbhlXbXNVhtlYpRFRxqH6TvwZPizpDWuuYY45x9QK5VQHkVPPOAChEVG+++eaRsF/bTIu6wxf+fvvt585T3Ko6AbqLba0yzAyAQnOq2mZaNAnrW9Uqq+4SYmuV4KJKyP/EE0+4UEphv2gS1reqVVYiiX4zAeIEFVW/OEX7lMJ+0SQwANYJoFVW3WXHHXd0t3ERtZkA48ePd7f9CCaqCKltM03vn6r9oololZU4/PDD3W2/wSqzZs3q3UsmmKjaUlTCfvISCvtFE+G8tVVWl1xySe9ZIdITRFT9Jn+F/aLp2CorbWfdTTCFHHlnAAQRVUb6qclftAVMAYeGWHcT2qqIVvLOABhaVG2kn6r9ok3Qtwpz586VWxWZGEpUcadr165VtV+0DkyCDVrRBoHdJW0blU8qUZ0/f767nTRpkrs1cKk2gUphv2gTGARm/yKu2iCwewyztUoqUcWNwnbbbeduwcJ+kvoaPC3aiJ9blVvtFsNsrZIr/PfDfjvxhGgjRGFyq93DZgDkIZeo+mG/1vaLNsNAIFJbcqvdYpgZAJlFFTG1ar+2mRZdwLazfuqpp3rPCNGfTKJKuG9r+/n21jbToguQ3uJ8ZzEAw1aEGI1MomrFKcJ+7TclugTn+9Zbbx0tWrRIudWOQCTOqqqrr76690w6Monqiy++qLBfdBLOd+sE0CqrbkAHACuq1q1b5z537tMB5XdBJZE5p6qwX3QVW2WlIdbdw3YCoFc/3q8fJ5OoskEa6/s3bNjQe0aI7qEh1t0g72CVTKL6wgsvRFdeeWV08cUXu7Fo11xzjcsvcUhoRduhfZDFLqAh1u0n72CVzX7wNr37fSGHQDsJE6+5/9BDDzmBZduUe+65xx0PPvhgdN999zmBJf/E6+Rft9hii96/IkSz4VzeYYcd3LkOEyZMGNneWrQTvjyffvpp91nzuaOBs2fP7r2azCb/eZve/VRQrGL7aWAmgC1hNXiNPwN0CaD0CLHlowwEVyuxRBNhG2uMBOfvueee6xyNaCc///nPnbDSq7xkyZJoypQprq10NDKL6iBOO+20EWE18U0CwWW1isRVNBHSX0Rl3/72t93IS9FOVq9eHZ199tm9R1E1omokOdokofVF1Xe05K/UtiXqysqVK6Nrr73WdcKcf/75vWdF26iVqCaRVmghKXUgoRV1AZeKW6U6jFvlVrSP2otqEhJa0UTodsGt3njjjU5QlVttJ40U1SSShNaH1/gzoGKYqAqElbbCBx54wInqPvvs03tFtIXWiOogshbDQI5WFIGlAU466SS3fFtutV10RlSNJFHlMaIbxxytD43ccrJiGExUAVE99dRT3X3RDliOTEuVTSdrvagmkZQ66OdolaMVw+LnVtUJ0E58t9pJUU1CQiuKBGFl6fbYsWMlqi3EF1VWU82bN8/d70cnRDWJJKEFnuM1HwmtGAQpAJZysxCA/KpoD6QAEFVSPbhU3OpodFZU+2Giisgitv5zPhJa4WNLVzfbbLPovPPOU99qyzjrrLOi+++/X6IaiiRRtQ4EHxXDuo2tslLBqvn4BUhghi6DqiWqBZLV0U6ePHlkopEcbTuxC5GtjeVWmwOfmw0dZyIV1X5G/fE8kagNpWZC1Zw5c9xzoyFRDYiJatocrYS2Xaxfv94tBmDHYbnVeoOIIpowd+7ckfuGiSkHQpoFiWrBZBVa5WibDcKKW1VutX6wW8PChQvdfXOiPoinuVLfoWZFoloBEtp2g1ulaKWlq9WDcHIQ0lte1DDhnDVrlgvtuc9zwyJRrQlJoqpiWDOxvlU+J02wKhdWPj388MO9R/8rMIHvRGEYNzoaEtUaY0LrF8MMnjfBTXK0hobKVIO5VeVWiwH36e9oawUmE1FfMHGhuNFQTnQQEtWGgqDajIMkl2sguBoqUz6WW9199921yiogVmBKKi6BiSlH1gJTKCSqLSDJ0SYJrXK05aJVVmEwV3r77bc7JxoXUxNR3KjvUKtCotpSJLTVow0C82FuNB7Sgy+aoQtMoZCodogkUVUxrFhwqwiEOgFGxy8wxdudQrU6lYVEteMkOVqD501wVQzLhy1d1RDr/2KhvEFIT4rE3KjvOssuMIVCoir6gqBmKYZJXN8JIoJbhS5vZ522wBRve2oiElWRirij9V2skbTdeNeFtssbBCKeHP5aesNE1NyoPW4DElWRC19UJbSjY4sBmAnQ5txqlgIT99sionEkqiIYeYQWbLBMm8XWClZty62O5kZNONvmRAchURWFkiS0Pv7rvqj6E7yg6YLLYoBFixa57aybmFtFLNteYAqFRFVUCoKadWVYUwUWYcKxNmmDwEEFJhPONhSYQiFRFbXBRNV3tElCa6LKxWztXU0Q2qYMWkE8OdIUmLrqRkdDoipqTduE1nKrdeoEMDcaD+kNhJMvAYTURFX0R6IqGkdWoYW6FMP83QGq6gSIV+lHKzDZY7nR9EhURStIElqD53kdkoTWp4y5B2WusjIBNeJDSXzBVEgfBomqaD0IappiGNiMgyIdLYJmq6yKcqv8DAQVAWVdfRwTThWYwiNRFZ0iSVSThsokiarfgTAM/iqrkEOs/aEkSXlRf76o3GhxSFRF5zGhLTNHG2KDQHOjSQUmE802LgOtOxJVIRIwUUVkEVv/OZ9hhNY6AdK61XiBKcmNcigvWi0SVSFSMozQJhXAbIh1P7dqImpOVD2jzUCiKsQQpBVaf/C3L7S//e1vN9og0A/p/Sq94btRhfT1RKIqRGCSRLXfDgtAz+pWW20V7brrru/Ii/rFJZAbrT8SVSFKIK2jNdEkpGcVk5xo85CoClERvqguXrw4mjJlipxoC5CoCiFEQDbt3QohhAiARFUIIQIiURVCiIBIVIUQIiASVSGECIhEVQghAiJRFUKIYETR/wOMD7v5/gks5AAAAABJRU5ErkJggg==[/img]