Discrete Probability Distributions/Probability Distributions Question 38 Car Occupancy

The histogram shows the distribution of occupants in cars crossing the Tocoma Narrows Bridge in Washington each week.

  1. Find the mean of the probability distribution to three significant digits.
    {#1}

  2. Find the variance of the probability distribution to three significant digits.
    {#2}

  3. Find the standard deviation of the probability distribution to three significant digits.
    {#3}

  4. Find the expected value of the probability distribution to three significant digits.
    {#4}
]]> /9j/4AAQSkZJRgABAQEASABIAAD/4gXASUNDX1BST0ZJTEUAAQEAAAWwYXBwbAIgAABtbnRyUkdCIFhZWiAH0gAFAA0ADAAAAABhY3NwQVBQTAAAAABhcHBsAAAAAAAAAAAAAAAAAAAAAAAA9tYAAQAAAADTLWFwcGwAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAA1yWFlaAAABIAAAABRnWFlaAAABNAAAABRiWFlaAAABSAAAABR3dHB0AAABXAAAABRjaGFkAAABcAAAACxyVFJDAAABnAAAAA5nVFJDAAABnAAAAA5iVFJDAAABnAAAAA5kZXNjAAAFQAAAAG9jcHJ0AAACFAAAADh2Y2d0AAABrAAAADBuZGluAAAB3AAAADhkc2NtAAACTAAAAvJYWVogAAAAAAAAdEsAAD4dAAADy1hZWiAAAAAAAABacwAArKYAABcmWFlaIAAAAAAAACgYAAAVVwAAuDNYWVogAAAAAAAA81IAAQAAAAEWz3NmMzIAAAAAAAEMQgAABd7///MmAAAHkgAA/ZH///ui///9owAAA9wAAMBsY3VydgAAAAAAAAABAc0AAHZjZ3QAAAAAAAAAAQAAuFIAAAAAAAEAAAAAuFIAAAAAAAEAAAAAuFIAAAAAAAEAAG5kaW4AAAAAAAAAOAAAoUgAAFcKAABLhQAAmuEAACeuAAATtgAAUA0AAFQ5AAKAAAACgAAAAoAAdGV4dAAAAABDb3B5cmlnaHQgMjAwNyBBcHBsZSBJbmMuLCBhbGwgcmlnaHRzIHJlc2VydmVkLgBtbHVjAAAAAAAAABEAAAAMZW5VUwAAACYAAAJ+ZXNFUwAAACYAAAGCZGFESwAAAC4AAAHqZGVERQAAACwAAAGoZmlGSQAAACgAAADcZnJGVQAAACgAAAEqaXRJVAAAACgAAAJWbmxOTAAAACgAAAIYbmJOTwAAACYAAAEEcHRCUgAAACYAAAGCc3ZTRQAAACYAAAEEamFKUAAAABoAAAFSa29LUgAAABYAAAJAemhUVwAAABYAAAFsemhDTgAAABYAAAHUcnVSVQAAACIAAAKkcGxQTAAAACwAAALGAFkAbABlAGkAbgBlAG4AIABSAEcAQgAtAHAAcgBvAGYAaQBpAGwAaQBHAGUAbgBlAHIAaQBzAGsAIABSAEcAQgAtAHAAcgBvAGYAaQBsAFAAcgBvAGYAaQBsACAARwDpAG4A6QByAGkAcQB1AGUAIABSAFYAQk4AgiwAIABSAEcAQgAgMNcw7TDVMKEwpDDrkBp1KAAgAFIARwBCACCCcl9pY8+P8ABQAGUAcgBmAGkAbAAgAFIARwBCACAARwBlAG4A6QByAGkAYwBvAEEAbABsAGcAZQBtAGUAaQBuAGUAcwAgAFIARwBCAC0AUAByAG8AZgBpAGxmbpAaACAAUgBHAEIAIGPPj/Blh072AEcAZQBuAGUAcgBlAGwAIABSAEcAQgAtAGIAZQBzAGsAcgBpAHYAZQBsAHMAZQBBAGwAZwBlAG0AZQBlAG4AIABSAEcAQgAtAHAAcgBvAGYAaQBlAGzHfLwYACAAUgBHAEIAINUEuFzTDMd8AFAAcgBvAGYAaQBsAG8AIABSAEcAQgAgAEcAZQBuAGUAcgBpAGMAbwBHAGUAbgBlAHIAaQBjACAAUgBHAEIAIABQAHIAbwBmAGkAbABlBB4EMQRJBDgEOQAgBD8EQAQ+BEQEOAQ7BEwAIABSAEcAQgBVAG4AaQB3AGUAcgBzAGEAbABuAHkAIABwAHIAbwBmAGkAbAAgAFIARwBCAABkZXNjAAAAAAAAABRHZW5lcmljIFJHQiBQcm9maWxlAAAAAAAAAAAAAAAUR2VuZXJpYyBSR0IgUHJvZmlsZQAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAA/+EAdEV4aWYAAE1NACoAAAAIAAQBGgAFAAAAAQAAAD4BGwAFAAAAAQAAAEYBKAADAAAAAQACAACHaQAEAAAAAQAAAE4AAAAAAAAASAAAAAEAAABIAAAAAQACoAIABAAAAAEAAAFqoAMABAAAAAEAAAEaAAAAAP/bAEMAAgICAgIBAgICAgICAgMDBgQDAwMDBwUFBAYIBwgICAcICAkKDQsJCQwKCAgLDwsMDQ4ODg4JCxARDw4RDQ4ODv/bAEMBAgICAwMDBgQEBg4JCAkODg4ODg4ODg4ODg4ODg4ODg4ODg4ODg4ODg4ODg4ODg4ODg4ODg4ODg4ODg4ODg4ODv/AABEIARoBagMBIgACEQEDEQH/xAAfAAABBQEBAQEBAQAAAAAAAAAAAQIDBAUGBwgJCgv/xAC1EAACAQMDAgQDBQUEBAAAAX0BAgMABBEFEiExQQYTUWEHInEUMoGRoQgjQrHBFVLR8CQzYnKCCQoWFxgZGiUmJygpKjQ1Njc4OTpDREVGR0hJSlNUVVZXWFlaY2RlZmdoaWpzdHV2d3h5eoOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4eLj5OXm5+jp6vHy8/T19vf4+fr/xAAfAQADAQEBAQEBAQEBAAAAAAAAAQIDBAUGBwgJCgv/xAC1EQACAQIEBAMEBwUEBAABAncAAQIDEQQFITEGEkFRB2FxEyIygQgUQpGhscEJIzNS8BVictEKFiQ04SXxFxgZGiYnKCkqNTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqCg4SFhoeIiYqSk5SVlpeYmZqio6Slpqeoqaqys7S1tre4ubrCw8TFxsfIycrS09TV1tfY2dri4+Tl5ufo6ery8/T19vf4+fr/2gAMAwEAAhEDEQA/AP2R8C+BfC+ufDCw1fV9Pn1DU7uW4lubme+nZ5GM8mSTvrrv+FYeBv8AoB/+Tk//AMXR8MP+SHaJ/wBtv/R8ld7QBwX/AArDwN/0A/8Aycn/APi6P+FYeBv+gH/5OT//ABdd7RQBwX/CsPA3/QD/APJyf/4uj/hWHgb/AKAf/k5P/wDF13tFAHBf8Kw8Df8AQD/8nJ//AIuj/hWHgb/oB/8Ak5P/APF13tFAHBf8Kw8Df9AP/wAnJ/8A4uj/AIVh4G/6Af8A5OT/APxdd7RQBwX/AArDwN/0A/8Aycn/APi6P+FYeBv+gH/5OT//ABdd7Xl+rfG/4L6D4r1HQdd+L3wv0XXNPmEN/p1/4qs4Lm1kKq4SSN5AyNtZWwwBwwPQigDT/wCFYeBv+gH/AOTk/wD8XR/wrDwN/wBAP/ycn/8Ai63vDPizwt408Kprvg7xLoHizRHleJNQ0bUIry3Z0Yq6CSJmUsrAgjOQRg1v02mtwOC/4Vh4G/6Af/k5P/8AF0f8Kw8Df9AP/wAnJ/8A4uu9opAcF/wrDwN/0A//ACcn/wDi6P8AhWHgb/oB/wDk5P8A/F13tFAHBf8ACsPA3/QD/wDJyf8A+Lo/4Vh4G/6Af/k5P/8AF13tcroHjrwT4r1fWtP8L+MfCviS/wBHna31e20rVobqWwlVmQxzrGxMTBkdSrAEFGHUGgOlzM/4Vh4G/wCgH/5OT/8AxdH/AArDwN/0A/8Aycn/APi63vDPivwv408JQ6/4O8SaB4s0KWSSKLUtG1CK8tneNykiiSJmUlWVlIByCCDyK36AOC/4Vh4G/wCgH/5OT/8AxdH/AArDwN/0A/8Aycn/APi672igDgv+FYeBv+gH/wCTk/8A8XR/wrDwN/0A/wDycn/+LrvaKAOC/wCFYeBv+gH/AOTk/wD8XR/wrDwN/wBAP/ycn/8Ai672uT8V+PvAvgS1sp/HHjTwn4NhvJGjs5Nc1eCyW4ZRllQysu4gckDOBRcLXM7/AIVh4G/6Af8A5OT/APxdH/CsPA3/AEA//Jyf/wCLro9A8SeHfFnhuLWfC2v6L4l0eVisd9pV9HdQOR1AkjJUkfWsbxX8RfAfgXV/DGn+M/F/h7wxfeI9TTTNBg1K9SB9SunICwQhiC7ksowO5HqKHo7f1rsC12Kv/CsPA3/QD/8AJyf/AOLo/wCFYeBv+gH/AOTk/wD8XWp428beFPhx8LNZ8beONbs/DfhTSYRNqOpXWfKt0LBQWwCfvMo4HetbRNa0rxJ4N0nxDoV9b6pomqWcV5p95A2Y7iCVA8cinurKwI9jQtb26frt+T+4Hpb+v63Ryv8AwrDwN/0A/wDycn/+Lo/4Vh4G/wCgH/5OT/8Axdd7RQBwX/CsPA3/AEA//Jyf/wCLo/4Vh4G/6Af/AJOT/wDxdd7RQBwX/CsPA3/QD/8AJyf/AOLo/wCFYeBv+gH/AOTk/wD8XXe0UAcF/wAKw8Df9AP/AMnJ/wD4uj/hWHgb/oB/+Tk//wAXXe0UAcF/wrDwN/0A/wDycn/+Lo/4Vh4G/wCgH/5OT/8Axdd7RQBwX/CsPA3/AEA//Jyf/wCLo/4Vh4G/6Af/AJOT/wDxdd7RQBwX/CsPA3/QD/8AJyf/AOLr5ctfEPiGx0y3srXxDr8VtbxLFCn9pTHaqjAGS2TwO9fcFfBB6mgD66+GH/JDtE/7bf8Ao+Su9rgvhh/yQ7RP+23/AKPkrvaACiiigAooooAKKKKACiiigAr8d/8AgpP8D/hBD4r/AGdfGEXw58KR+KfF/wAdtF07xRqi2Si41a1lSVZIZ3HLowRAQf7or9iK8M+OH7P3g34+2vw3h8Y6l4m01fBXjOz8VaV/Y1xDEZru1DiOObzIpN0J3ncF2seMMKnlXPGXZr7rpv8AIU7unKK6p/fZpH5qz6n8etc/a3/aR+CH7Injn4f/ALLfwt+B2lxXMWlWXhGzvTr2oXUDXLGTz0YQRl45VLoCFG0lHLfLnaZ+2b+0V8e/g1+xb4C+HHiPw38JPiZ8XjrJ8SeMDoaX0dmmlSyRs1vbTgxkzLDIxBzhiFVl5I+wvjX/AME/PhL8aP2g/E3xM/4Tj4yfC/xL4o0xdN8X/wDCDeJFsYPEFuI0i8u6jkikDKY40UqMIwUFlJyTp/EL9gT4DeOfgF8JfAWlf8Jn8Ml+GjO3gzXfBusfY9T08ysrzHznRw7SSIsjOV378srLlslLSnBVNdY37u3Nd3vs7x93TRW9bqJc0uTS/NZ9rpWVtr3v72+t/JfL+qeN/wBtvxH+3P4N/Y40v4+eCvBvjfQvA914o8XfEu08HW13LrcZvpYbSNLKZRFG3kvaGRYwuHMuHZVAfyK+/bb/AGpF/wCCXOmarbeIfCUPxu8P/tCRfDfVdd/siN9P1yJIXkLyJ5WxBI+1XaBVYIuVCFhX2TrX/BNj4Naho/gS40b4ifHrwZ478MWV1Zp470Lxh5Ou6pFdXFxczi7nMTK5eW6uGLIiE+YQSVwK7CP9gH4DWn7HfgH4J6S/jLRPDHhbxpbeL1vrS/g/tDVtThVl828leBlcOrAMERMBEC7AuK1hy3959Vf/AMGKV12XJeNut9gbScml0dvL3Gkn/wBvtPrbufCd946/4KMWXx8/aK+CP/DR3gKbUPhv4Sj8ZP4wk8EWaXV7E1oJksIIViMUcTPvVnkjZ18sEHDba3te/a9+J3j/APZB/Zl1LS/2kYfgz8RfF/hG51DU9G8MfCd/Futa5cW9xJbGVLZFeO2tmaCVs5ViwbapVGC/pRd/s2+Bbz9ov4w/E2XVPFY174keEIvDGuW63UItre1jiaIPbr5O5ZSGOS7Ouf4R0r52n/4JtfByHw98Krfwz8Rvjx4E1fwJoFxoNlr3hvxTFZajqGnz3M1y9vcyJbhSN9xMAYljJD4bdhdvPDndO0t9Pw9ovy9ndbXu7XHPl57x7P0/5dv8/aW7aLRHc/8ABP8A+Ofjb9oX/gmZ4S+IHxGuba/8arf3mnapewWaWy3bQTFVlMaYRWKFN21VXcDhQMCvxj+G3ibxb+zL/wAFD/il+14Lq4vfg9ffHzxJ8P8A4iWNvbO72VtJOtzFdHbneA8hcYUENbhAT52K/fn9nP8AZ78F/sx/szWXwq8Bal4m1bw/bX9xeJc69cwzXTPM25gWiiiTA4Awg981w+n/ALG/whtf2afjl8KL9vE3iDwn8VfFN/4k8Qrqd1C81re3hjYtaskKiMRPFG8e8OysoJZuldFdx9pKcF9m3q24cy9GlJeVzGlC8OSps5fcves/VPlfyPy5+BXxe1b4c/8ABBv4C2Phb4+WHwL1jxP451y3tr238CSeKdX1NFvp28mxsFVgzFmjDO+0KHUBgzKDnQftzftUp/wT71yTTfHNlq3xS0D9oS08FW3iDW/BsGmvqunzQ3Dxx3dkyYtnaSEBwqJKinbu3gtX6CTf8E5Pgyn7MPwk+GuieN/jL4Wufhtq99qfhTxdo/iCC21u2lvJPMnUypbiPaWCYKxKw8tcNy+6DSP+CbXwS0n4V3nhNvGvxl1a3u/iTaePbrUNS1y1uL2fUbZJVVZJWtcvE3nOz7gZGY58z1IqHNaT0937k4X/AAUuyd9jWdSTlz2V3zv5y9pb5XcH1a+SPAPip4w/bq8CftGfsufs16R+0B4Q1D4lePdO1w6/4vuvCVmtsBFILhJ0hEHEkFukiIoAWRj845DK3WfiT+2h8W/2rPjr8Lvhh8efCvwsh+BfhHT11fUZPClnfTeLtWlsvNklkE0ZW2haSKcZjXailP3bk/L+i3jH9n/wZ43/AG1/hN8eNW1LxNB4v+HtrfW+i2lpcwrYzreQtFKZ0aJnYhWJXZImD1z0rwb41/8ABPz4S/Gj9oPxN8TP+E4+Mnwv8S+KNMXTfF//AAg3iRbGDxBbiNIvLuo5IpAymONFKjCMFBZSck5NP2cV1fNfyd3yP0Seq6uzd+VWaUFO/T3fnqudfO2j6apWuz4d8F/8FD/izpus/s5/Fz4t63o2k/Bzx78NfEEOoaZDp0MMA8Q6PNdD7QkzR+bm4WO0jWISFN87KFyAa4z4Uft5ftKfEj9nD4W/CuXxomlftNeI/jPZ6TeXE3h6xivY/DU9ql0br7G8HlqgEmBL5XMa7gSTur9Kfir+wF+z/wDFb9jL4b/Am6tPE3g3wR4Hu/tOgv4bvIY7xGZJFlEkk8MwcStIZJDt3M4DZHfb039iT4J6T/wUbsf2nrCLxLb+PLPSI9OttOW8i/suPy7IWCTiLyvMEot1CZ83bxnbnmuhTj7aUmvdvp6KXP8AK/wdbR/HGcX7JKOjs7+rXKvuXvf4td7W+LP2XP2lf2gfFH/BU3UPh3+0X8Xb34c+JJdW1GGw+Dmq/DSK1tNRs0hlME9hq64kcq0ZYeYCsqIxV33Db2n/AAUpsr7Ufjz+xnZab8MNJ+NF9N431BYfBGp3sFrba2fssf7iSWcGJB3y4I+WvfPh1+wZ8NfAH7WPhr4v3/xJ+O3xN1zwwlynhLTfHHi7+07DQVnUqwtkMSuAEYqoZ2HIJDMFYekftGfst+Dv2lY/AUniXxn8TvAeqeD9Rmv9E1XwPrEWn3sMsqKjHzXhlIwFGCm0jnmuWtDmpUUt4uN/SMk+t7tpa3ur6baLoU17Wq+klK3k3Fq2nRN6bO3nqfin8K/iR8RP2Yf2bP8Agoz/AGHod58CPjTpOt6NrWn+DEtrXUdK8OWl3fJGot5CZIpm8q7Ccps2LCy7uQn0v8StY/aH8O+C/wBirxD8dvGHw5+JXijxt8d9GvLPb4LsHj8P2F3FC32G2aSAsjIxJFwpEuQvz/Lk/XNn/wAE6fgJafsy/FX4cPq3xP1O++I32MeLvGmp+IVvPEF8LW4S5iHnSxNEvzp82IfmB5ztUr7X8R/2ZvAXxP0n4G2Wv6p4ts4fhV4isNc8O/2fdQIbmeyVViS53wtvjIUbgnlsezCuqnJc0HPVp0vS0Wua1/JLfV69zKfvKVtL+0fZ3kla9tN+Z6aK6Pxx/aG+Jn7Vf7Q37HP7a3j+0+KPhTwv8CfBPi+fwi3w+bQIHuL22trqAPP9qZDLHMd0DYLEMWlA8vauYfih+2N8Yvh5p3gr4b+DPjxZfBweGvgl4YvvCmg2XgGLxDdeNtSudPgY2ksrpJ9jIyFUkKCCDhiQa+//AB9/wTA+AXxA+KfxK8Q3Xi/40eHdK8c6g+qa54X0PxNHBpDagzF/tggaB90gdpHUSF1VpGwoXCj4x+MH7Gf7QXhj9tn4qa38MPhX8SfG2gX/AIN0bRPh74o8H/Fyz8MXGmNY6fBZq+oI+x7hwYFkIAWM7RjlyY+SinGCg768rfduMJp6vvKV430X4LSaUqjl/it0+KcGtOlopptav7mdB8RP2m/2stL+KXwY+AV58UfFHgzxyPhZb+LvHHirw58H08RavdX1y7lbJtMjTbBFCpjjeVUQ71JIGQlfWnwQ8eftr/F/9kP9nvxXc2PhrwF4ntPGEtt8V7TxdoE+mXWraVDMFEtpA0R8uWSHJOAimTBUqmVEdh+whceP/g18FfE/xf8Ai58W/C/7S/hXwmmi6x8QPh94sey1C9g3yOLaWd43M2zzSplwryHJZmBAr2W7/Y58Cap4K+A2ka54++MPiK4+FHio+JNH1fVvEi3V/qt4ZjMft8rxHzkLHGFCELlQQCQe1uKrS2tz302tz3uvLl05dE1p5nLDmdODW/L13vyWs/Pm1vq1vfofW9FFFc5sFFFFABRRRQAUUUUAFFFFABXwQepr73r4IPU0AfXXww/5Idon/bb/ANHyV3tcF8MP+SHaJ/22/wDR8ld7QAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVWvLy007SLrUL+5gsrG1haa5uJ3CRxRqCzOzHgKACST0AqzXz/APtW6Fr/AIn/AOCZ3x78PeFrS61DxDqHgPVLextLaPfLcO1rIPKQZGWblR7kcHpWOIqOnSlNdE2aUYKdSMX1aPm7wz/wU2/Z68Y/GnT/AA14d8P/ABj1LwtfeIYNAtfiAnhJh4da+nZFiiMxk81CzSIAHhB+YEgL81fofvTzvL3r5mM7c849cV+UH7DP7Xf7K3hv/glh8EfA95468M+FvFlp9n0K78KyRl9Rm1SW62eatvGrPIk0sgl84AqvmfOylWx+V3iT4gfDzxB8fvhn8d/hT4S0b4f+Nbn46wxvq2o/Fm61XxjqkJncyNdaaAsVtaMGRNwwQMRBpFYse10f9oVFa62v84peXW+j2tvuczq/uZVrWS6dtJO1/wDt19N0/Q/qwLKHVSyhm+6CeTXzt+0R+1J8KP2ZPB2g6h8RLzWr3WdfumtfDvhvQLH7ZqusTLt3JBDuUHBdBudlXc6LnLAH88f2MPgb4Q8f/wDBVz9rD4z+KL7xJqHifwB8a9Xh8K2v9pOLKye4M8c8pi6M7xiOM56CJP7ox037Xfijw18Kf+Dgf9j34r/FQppfwti0DU9Mj127jY2mn37LcKruRkLg3FvlmACg784QleWLbdFN257fK8eZfN/CvNr0OmpDklWS15Lr1alyv5Lf0TPq/wCAv7bvwj+Pnxv1j4XafovxI+G3xR020N5N4S8eaAdNv3gXYWkQK8icCRG2MwcqdwUqCR9hb0MpQMpcDJXPIFfjH4u+InhH49f8HIfwd8S/s93Gj/EOT4cfDvV5/E3iXRZPPs2aW0u0tbfzl+SXbJcxgFSRm4Zc5Rgvzj+yVc/Aq7/ZiHx2T4ma7qv/AAUIuo/Fc1vYvrlxNqGq3y6dqDQ289mQym38lI5hIQg85ETzMgRG3Ney57WtFyfylKKsvNRu9dL9boFRvVUFK92lfom4qTu+lumnrazP6Kgyl2UMpZfvAHkU6v51v2d9B/ZOn/4JoeIvHuj/ABH1HXP2vvFXwq8ZReIrCXX7i51DVJWsruSdLm1JcBVSNZI5DsMhG7c54EmlfGv4a+OvC/8AwSU8CeEfGGn6v4x8NeJdPi8Q6VbOTNprRm2tiswHCFmR9oJyy/NjBBrX2T9vGitW5QWm3vScbrukle+l/K1zB1F7B1ulpvXR+7GLSfZy5rW6W67H9EZdVZQzKpY4UE9aGdFdVZ1VmOFBOCfpX8mnjGD4JT/sq/tT+MvEnxL16x/aX8K/Ge6Pw30ZfEE8b2cEmpRySz2tuCBudvtLySqSUaCI5Qkb/Yv2xPFXw88f/Ff45TeIPBWjW3xj8G+FtFafxV43+KtzpmoR3zWNsTFomjRqEmYMrM6tuG5y5KblFcyqXpKduibS7OKlo9m1ezvazt3OiVO03G/Vpeqly69r7rfZ9j+mpmCoWYhVAySTwKAylNwYFSM5zxivwKf4faV+1L/wUq/Y78JfFvVvFOpaD4h/ZX07U/ENtY6zNbNqsoMspWdw291aVY5W5yzxISTivBYPF+t2H/BDT4bfDzxP4z8Uaf8ABdP2l5fCPizUI7t/Nh8PIgla2d0GfK+aaTaBjKAAYwtdFSlKNSVP7Sbt2aVVUr36atP0uYt2ipW6K/len7S3nomj+m5WV0DIyup6EHINOr8DPjD4H+APwR+CHw7/AGmv2OPFeoeLfCHwV+L6TeJbLTdafUrO2tNRtrCO9tbWeXPmI6rbgkSOFe8ny4I2p9m/8E3dLv8Axd8KfjN+1Dr0FzDrXxm8eXeqWS3J/eQ6VayyQWcJ7fITOoxxtC80QgpKT/lWunX3WvvUm7/3X01CpeCj/e2/8mv91l/4Ej9JqKKKzGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFfBB6mvvevgg9TQB9dfDD/AJIdon/bb/0fJXe1wXww/wCSHaJ/22/9HyV3tABRRRQAUVwdn8T/AABqHxovfh5Z+KdLuPGdoHFxpiMd6ukcUrxhsbDKkc8MjRhi6pLGzKFYE0dR+MHw00rUfE9tqHi7Trc+HSqa1KVkMFpKzRKtu0oUobhmngAgDGUmWMBPmXJ/w/y7js72+R6VRXkVv8e/g7dX/h+1g+IGgyXOsyrFZRb2DLI109kkcwK/6O7XUclsqzbC06NEAXUqPWZpobe3aaeWOCJfvPIwVR9SafK7X/rTcT3sSUVm/wBs6P8A9BbTf/ApP8ar3XiTw7Y6bPeXuvaLZ2cEZkmnnvY0jjUDJZmJwABySaTYG1RXKv468EReE49fk8Y+FY9CkRXj1FtWhFsysQFYSbtpBJGDnnNRD4g+Am1HTbNfG/hBrvUYhLp8A1iDfdoQSHiXfl1IBIK5HBoDpc6+iuY0vxt4M12GeXRPF3hjWI4JPLmex1WGYRvjO1irHBx2Nav9taP/ANBbTf8AwKT/ABoA0qKzf7a0f/oLab/4FJ/jR/bWj/8AQW03/wACk/xoA87t/gR8EbT4xf8ACw7X4PfC638ffaTc/wDCSReFrNdRExBBl+0CPzPMIJBfdk561ny/s5fs9z+OLrxNP8C/g9P4juNRXUp9Uk8G2LXMl2rFxcmQxbjNuZm8zO7JJzk16p/bWj/9BbTf/ApP8aP7a0f/AKC2m/8AgUn+NC0tbpsD1vfqZfh/wX4O8J6lr974V8J+GfDN5rl+2oa3PpWlw2smpXTfeuLho1BllOTl3yx9aTxf4J8GfEHwXN4b8eeEvDXjXw9K6vJpmu6ZDfWzsvKsY5VZdw7HGR2rV/trR/8AoLab/wCBSf40f21o/wD0FtN/8Ck/xpNJqzHd3ucx4F+GPw3+F+h3emfDbwB4L+H+nXUwmurbw7osFhHPIBgO6wooZscZOTjis/Svg18ItC+Ml78RdE+Fvw80fx/dtI114ksvDtrDqUxk/wBYWuFQSEt/ES3zd812/wDbWj/9BbTf/ApP8aP7a0f/AKC2m/8AgUn+NU22+bqLpbocJ4c+Cvwd8HfEfVPGPhL4UfDfwx4t1JZV1DWtJ8N2lreXQlYPKJJo4w7B2AZgT8xGTk1maH+z18A/DOp2V74c+CXwk0K8s9SXU7OfT/CNlBJbXajC3EbLECkoHAdcEdjXp39taP8A9BbTf/ApP8aP7a0f/oLab/4FJ/jQna3l/wAP+eoPVNPr/wAMfGfwG/YZ+F3wm1TxvrXjTRPh/wDFrxZrHxCvfFmka9qvgu2W80UTmJo7eKWRpX/dvGXDqy/M2Qqnk/Qvi/4C/A34geOH8TePPg38LPGviNoBA+qa94Us765aNRhUMksbMVAJABPGeK9H/trR/wDoLab/AOBSf40f21o//QW03/wKT/Gi/uxj0SSXolb8lbz6ju+Zy6vX8b/mc3p3w0+HGj+LtD8QaT4A8E6Xr2i6Mui6PqVpodvFc6fp6/ds4JVQNFbjJxEpCD0qknwi+FEXws1nwNF8Mfh7D4K1e5e61Xw/H4dtV0++mcqXlmtxH5ckjFVJZlJJUHPArsf7a0f/AKC2m/8AgUn+NH9taP8A9BbTf/ApP8aUvevfr/nf89fUS0/ryt+WnofOPxj/AGZPD3jX/gnl43/Z++E3/CJfAzR/EaJHJNonhaBraFDNHJP/AKLG0Kl5EQoX3AjdnqBXs3wx8A6P8K/2dvBHw28P7m0bwzoltpdrIyhWlWGNU8xgP4mILH3Y11H9taP/ANBbTf8AwKT/ABo/trR/+gtpv/gUn+NNNrm87X+V7fdd/eJq9vK9vna/5I0qKzf7a0f/AKC2m/8AgUn+NH9taP8A9BbTf/ApP8aQzSorN/trR/8AoLab/wCBSf40f21o/wD0FtN/8Ck/xoA0qKzf7a0f/oLab/4FJ/jR/bWj/wDQW03/AMCk/wAaANKis3+2tH/6C2m/+BSf40f21o//AEFtN/8AApP8aANKis3+2tH/AOgtpv8A4FJ/jR/bWj/9BbTf/ApP8aANKis3+2tH/wCgtpv/AIFJ/jR/bWj/APQW03/wKT/GgDSorN/trR/+gtpv/gUn+NSQ6nptxcrDb6hYzzN91I51ZjxngA0AXq+CD1Nfe9fBB6mgD66+GH/JDtE/7bf+j5K72uC+GH/JDtE/7bf+j5K72gAooooA+RpfhT8XbT9oKTWNNtPh1eeGNA8T6v4t8LT3PiC8hvdRv76wltRY3sQtJFgt0a6uW8+OSVtqQgQjDV5XL+y38X7D4k+L9R0HxLo50f8A4S248VaZY6l421eey8QXb+I7PXLeG5sHia30oQeRPbC4tBM0vn+c8eQ0bfobRVU5un7Pl0cEkvRWt91l+ty+d+8v5nzPzevf1fo3payt8Caf+zd8XIfF2t3V1N8Nls/Hmq6dqfjNodWvGl0BrLxFe60sNgDbAXwdLzyPMkNqUdDNsff5K/eN7Y2WpaZLZajZ2t/Zy48yC5iWSN8EEZVgQeQD+FWqKlWSSXTT5JWS9EtEKcpSk5N6t3fq938zx34d+DPB918MEmuvCnhu5m/tTUF3y6ZCzbVvrhVGSvQAAD0AArlvjr8JdK8Rfs+PbeF/ht4c8R6pY+ING1Z9GgtLO3k1S3stUtbu4tUeYLFvkihkRVkdEZiFd0Viw8Qb9sTwX8LtZ1nwJq3hfxRqGoaXrF6Jbi08nyn8y5lmGNzg8CQDkdQaX/h4H8Ov+hK8a/8Akv8A/HK++wXhhxViaNPE0MHJxkoyi/d1Ts09X6b/ADPDqcS5bSqOE6qTTae/oyCP4OXP/DKOvaDqvwD8XWF9eeKp/FWmW3hL/hF31HTDca1cXcFmov5jZtLCgikmRt8GJikbzFTWbYfBv4j2vxL+EurS/Da4k8aPpGl2njjV/wCyvC58MzWVvPdvLBNFxex6iIbhwHsY47Zp3iJJhRkGz/w8D+HX/QleNf8AyX/+OUf8PA/h1/0JXjX/AMl//jldEPCTi+KUVgZWVtLx6K2vva6JXvvZXuZz4qyqUpS9sru/fq79u+q6K7tY7H9mr4SX3hnQPEej+JvhveaB4Es4rC08I6b430vw9LrkAihZLjzJtILwSW2BbiJpWa4LLOZGKtHj6e/4QTwR/wBCb4V/8FMH/wATXxh/w8D+HX/QleNf/Jf/AOOVZsv2+fh3e6zaWY8G+NIzPMsQYi3O3cQM/wCt96qt4U8Xv3pYGX3rot/i36vzEuKMrb/jrX1/yPsb/hBPBH/Qm+Ff/BTB/wDE0f8ACCeCP+hN8K/+CmD/AOJrfs7yK9s/OiOQHZD7EEgj8xVuvzc985X/AIQTwR/0JvhX/wAFMH/xNH/CCeCP+hN8K/8Agpg/+JrqqKAOV/4QTwR/0JvhX/wUwf8AxNH/AAgngj/oTfCv/gpg/wDia6qigDlf+EE8Ef8AQm+Ff/BTB/8AE0f8IJ4I/wChN8K/+CmD/wCJrqqKAOV/4QTwR/0JvhX/AMFMH/xNH/CCeCP+hN8K/wDgpg/+JrqqKAOV/wCEE8Ef9Cb4V/8ABTB/8TR/wgngj/oTfCv/AIKYP/ia6qigDlf+EE8Ef9Cb4V/8FMH/AMTR/wAIJ4I/6E3wr/4KYP8A4muqooA5X/hBPBH/AEJvhX/wUwf/ABNH/CCeCP8AoTfCv/gpg/8Aia6qigDlf+EE8Ef9Cb4V/wDBTB/8TR/wgngj/oTfCv8A4KYP/ia6qigDlf8AhBPBH/Qm+Ff/AAUwf/E0f8IJ4I/6E3wr/wCCmD/4muqooA5X/hBPBH/Qm+Ff/BTB/wDE0f8ACCeCP+hN8K/+CmD/AOJrqqKAOV/4QTwR/wBCb4V/8FMH/wATR/wgngj/AKE3wr/4KYP/AImuqooA5X/hBPBH/Qm+Ff8AwUwf/E0f8IJ4I/6E3wr/AOCmD/4muqooA5X/AIQTwR/0JvhX/wAFMH/xNH/CCeCP+hN8K/8Agpg/+JrqqKAOV/4QTwR/0JvhX/wUwf8AxNWrHwn4V0zVIr7TfDXh/T72PPl3Ftp0UciZBBwyqCMgkfQmugooAK+CD1Nfe9fBB6mgD66+GH/JDtE/7bf+j5K72uC+GH/JDtE/7bf+j5K72gAooooAKK+C4fjEmjft06hBrPxYEN5pnifWU8ceE7/VIUtPDvhq30zzrTUWgZVaGMzC0b7USQ7XsqF3VUEXBeLPjRq+hfE74oeF4PibY61BFrsdxrvi3wz43/tFPBmknxLY213a6jZm3EekTpZXUypLvclLS6lYx+TuNU4ufs7fbV126b9rX16Kz30vTjbmv9mXL+evntp1d18v0xor8qNH+Mfi2fx7HZR/GLX7s/21pifCK1N7Gx8a2Mni3ULW8kX93/xM4102O1Uygv5cBW63KZBOf1J1OC/udEnh0y/TTL5gPKuXtxMI+QT8hIzkZHXvmla8VLv/AF96vqt09GE48s3Ht/Wnl2ez3Wh+A/xy/wCTu/iF/wBhmX+deU16f8aUmj/ar8dx3M4ubhdVkEsoj2B24y23Jxk9s15hX+lXAv8AyTeX/wDXml/6RE/njOv+RhX/AMcvzYUUUV9SeYFauh/8jto//X9F/wChisqtXQ/+R20f/r+i/wDQxWWI/hS9GXD4kf0SeF/+QBP/ANfs/wD6MaujrybQdG8by2N9Ja+N7K1tm1C4McLaCjlF81sDd5gzj1xW5/YXj7/of7H/AMJ1P/jtf5Yy3P6VR3tFcF/YXj7/AKH+x/8ACdT/AOO0f2F4+/6H+x/8J1P/AI7SA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8do/sLx9/wBD/Y/+E6n/AMdoA72iuC/sLx9/0P8AY/8AhOp/8dq/pek+L7bXIJ9U8X2mqWK7vNtU0VYDJlSB84kOMHB6c4x3oA66vgg9TX3vXwQepoA+uvhh/wAkO0T/ALbf+j5K72uC+GH/ACQ7RP8Att/6PkrvaACiiigAwM5xz60mBzwOevvS0UAJgccDjp7UtFFAH8/Pxy/5O7+IX/YZl/nXlNerfHL/AJO7+IX/AGGZf515TX+lfAv/ACTeX/8AXml/6RE/nrOv+RhX/wAcvzYUUUV9SeYFauh/8jto/wD1/Rf+hisqtXQ/+R20f/r+i/8AQxWWI/hS9GXD4kf0SeF/+QBP/wBfs/8A6MaujrnPC/8AyAJ/+v2f/wBGNXR1/li9z+lUFFFFIAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK+CD1Nfe9fBB6mgD66+GH/JDtE/7bf+j5K72uC+GH/JDtE/7bf+j5K72gAor5G+NP7XnhX4EftO+Fvh74v8K63rcPiK3ibTJvCt7bapqqysZt3m6Oji+MAEORPDHKpO5SFKjd9OeGPEmk+MPh5o3inQpLuXR9UtEurRrqymtJtjDI3wzKskbdijqrA8EA0LWPMthyTjKz3tf5Hk+nfG+C+/aKtvBknhTUbXQL/X77w9pHiM3sLx3upWVqbq4i8hSXSMLHcosjcmS2kBVQY2k5fxT+07oegfGXxX4MsPB/iTX7nSRYWtpfwvFDaanqV5qNtp4s4XdhkQy3dv50oBVMyqNzxOg3rv8AZ902f4wa14vt/iJ8SNNa5uLy/wBI0q3msHs/D+pXdsLWfUbPzLR5ROY/Mws0ksKmeYiL5uMTX/2TPhLq/j2/8VaXF4i8GeI57VkgvdA1HyhaXJ1SHVvtscUivEbj7ZAkp3o8bEuHRg7A1TspUXPa3v23vbpfTfb5N9UEvt27rl/w3W/ny7+d7dDBs/2rba6168sH+HWvQtoGo2mn+NpP7St2XRpbrWrnRoTFzm6Tz7SWZiBGRblG2lz5Q+qtTvhpuiT3xtL6/EQH7izh82V8kD5V79c/QGvm2z/ZU8IWniDTtQ/4Tf4k3Be5gu/FNvNeWZi8W3Fvqc+qwzXwFqChS7uZpNtobZGVhEytEqxj6gpfZV9+vr1+V72623bY58vO+Xbp6dL+ffpfY/ny+NM32n9qvx3ceVNB5uqyP5cybXTODhh2I7ivMK9W+OX/ACd38Qv+wzL/ADrymv8ASrgX/km8v/680v8A0iJ/PGdf8jCv/jl+bCiiivqTzArV0P8A5HbR/wDr+i/9DFZVauh/8jto/wD1/Rf+hissR/Cl6MuHxI/e7QfGq2tjfW58K+Nbjy9QuF8yDSWdHxKwypzyPetz/hPU/wChP8e/+CZv8a2vC/8AyAJ/+v2f/wBGNXR1/li9z+lUcF/wnqf9Cf49/wDBM3+NH/Cep/0J/j3/AMEzf413tFIDgv8AhPU/6E/x7/4Jm/xo/wCE9T/oT/Hv/gmb/Gu9ooA4L/hPU/6E/wAe/wDgmb/Gj/hPU/6E/wAe/wDgmb/Gu9ooA4L/AIT1P+hP8e/+CZv8aP8AhPU/6E/x7/4Jm/xrvaKAOC/4T1P+hP8AHv8A4Jm/xo/4T1P+hP8AHv8A4Jm/xrvaKAOC/wCE9T/oT/Hv/gmb/Gj/AIT1P+hP8e/+CZv8a72igDgv+E9T/oT/AB7/AOCZv8aP+E9T/oT/AB7/AOCZv8a72igDgv8AhPU/6E/x7/4Jm/xo/wCE9T/oT/Hv/gmb/Gu9ooA4L/hPU/6E/wAe/wDgmb/Gj/hPU/6E/wAe/wDgmb/Gu9ooA4L/AIT1P+hP8e/+CZv8aP8AhPU/6E/x7/4Jm/xrvaKAOC/4T1P+hP8AHv8A4Jm/xo/4T1P+hP8AHv8A4Jm/xrvaKAOC/wCE9T/oT/Hv/gmb/Gj/AIT1P+hP8e/+CZv8a72igDgv+E9T/oT/AB7/AOCZv8aP+E9T/oT/AB7/AOCZv8a72igDgv8AhPU/6E/x7/4Jm/xq/pfi5dT1yCxHhvxdYGXd+/vdMMUKYUn5mzxnGB7kV11FABXwQepr73r4IPU0AfXXww/5Idon/bb/ANHyV3tcF8MP+SHaJ/22/wDR8ld7QB+MHxH8SX+qf8FGPHOu2/7R/wAItHsdavrLRNS8MWf7QGj6XdwRaff3KLalG0Wa4QyKySPEk0cqySyxGVwsZT9n6/Gz41fEz4AaH+3Ff6HoPiL/AISo6JeWl14hki/aW1DSbhru+1e6WaysdNhd4rq4tnDNJA7xeXG0MeFQKR+ydOn/ALvDvrr939fPqZyusRPXotPv/S33BRWXHrmiy+Lrjw/FrGly69BbrcT6al2huY4mOFkaPO4ITwGIwarf8JR4aNxrUI8RaEZdHXfq6fb492nrtLZnG790NoJy2OBmpujQ3aK5+PxZ4WlfQ1i8S+H5G1pS2jBdRiJ1EAbiYPm/egDn5M8c10FOwXP5+fjl/wAnd/EL/sMy/wA68pr1b45f8nd/EL/sMy/zrymv9K+Bf+Sby/8A680v/SIn89Z1/wAjCv8A45fmwooor6k8wK1dD/5HbR/+v6L/ANDFZVauh/8AI7aP/wBf0X/oYrLEfwpejLh8SP6JPC//ACAJ/wDr9n/9GNR4q8W+HPBHg6XX/FOq2+j6Uk8VuJZAzNJNNIsUMMaKC0kskjqiRoCzMwABJxR4X/5AE/8A1+z/APoxq434ueGfFviHwZ4evfA0Ph6+8VeH/EdprFlYa7qE1lZXwj3RywyTwxStGTFLIVfypAHVCVPUf5XzbUl6q/pdXfyV2f0tFXT9HbzdtF5Xel+m5qX3xV+Hun/BvTfiDP4osZPB2oIr2Wp2yPcJOGVmyqxqzHCo7Nx8oRi2ApxQg+NfwnufG1v4et/H/hmfU57YXEOy7BhkU2v20KJv9UZDa/6T5e7f5P73bs+avCbn4bftD6L+xxcfDjwRJ8NLTW9Vv3u9X1WTxReWr2y6lqF7e6vDZyDT5djxieOG1uHQk72keNDGqSczdfs2eN734g6HLoGj+A/hZ4c0iyN/b2Nj4rvNdsJdUHhuTQ4Ijp09jbxJbQpKqmQSHzY7SPMCNM5S5Rs6ivtt9zevS21rX1utNG7pRjLl5na61+9W/W/bR66o+vPB3j7wh4/0m+vfCGt2+sQ2VyLe8VY3ikgkaNJkDxyKrKGikjkUkYdHVlJVgT2FfM/7Mvwh8U/CD4feKtN8Smwg/tPUre5tbOHxPc+IJYBFYW1q3mahdW1vNMGMGUjdCIkCohCBY4/pinNRT93b+v6797Mxg21dhRRRUFBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFfBB6mvvevgg9TQB9dfDD/kh2if9tv/AEfJXe1wXww/5Idon/bb/wBHyV3tAH5Sftd+I/Fehft4aBpvhb4l6n4Xski0J7jRdJsJEsbNLu8v4pr7U7mPSLpYlaVLRUElxCJFW4w0ZUOf1br8cf2lfhu3h3/gobLHo9l8TdRi1+HRLs2l1feM9XTxlK2rXLy6clzZ3gstPhslxMkdzG8SG5yEC5z+x1VCV6Kvvd/p/XfyWxM42ry7Wj+p8PL4G+IOjfteXPiOy+EOq3o0HxdrfipvFNnqOko3iu3u9L+ywaXHvuI50nDtboftKRwBdOiPmt8mOH+I/wAJvif4u/aj8X+LNJ+FviO68LWP2J20jXLjw/bprH2TxFpepPDpRtZtzx3UdndSyf2sUbzmgVXiR5wP0ZoopycHSlHemrJ/LlTfnb5dy5WfPdfE7v1vzadtde66WPzH0v4D/E2Px3rFxL8IWs4fGuuaXqmn3Z1PTCPAkdp4u1DW5Y7lVm3ea8N3E6/YvtCm4DIzqirM36VanpljrGiT6bqUAubKYASxFiu7BDDkEHqBV6iktIqPb8tl+C33fVtjnNzm5Pd6/wBf5bLZWR/Pl8abeG0/ar8d2tunl28OrSJGmSdqjAA5rzCvVvjl/wAnd/EL/sMy/wA68pr/AEq4F/5JvL/+vNL/ANIifzxnX/Iwr/45fmwooor6k8wK2PDwDeP9DU8g6hCD/wB/FrHrZ8Of8lB0L/sIwf8AoxawxP8ABn6P8i6Xxo+oviL+0L448P8A7RHxA0XTdN8Gx2Nl4lv4IQ+iozbUuZFBJzyeOTXHf8NPfEb/AJ8PBX/gjT/GvOvjB/ydp8Uf+xu1L/0rlrzqvgso8PeGamBoTlgKbbjFt8i3svI9zFZ9mMa00q8t31fc+iv+GnviN/z4eCv/AARp/jR/w098Rv8Anw8Ff+CNP8a+daK9D/iHPC//AEL6X/gC/wAjn/t/Mv8An/L72fRX/DT3xG/58PBX/gjT/Gu/+Ffx58Z+Mv2jfBnhXWtP8JNpOqarFbXYg0hI5DGxwQrA5U+45r42r1/4Af8AJ6nwy/7D9v8A+hV5Of8Ah/w1SyzE1IYGmpKEmnyLRqLs9jqwOe5hLE04yrSabXV9z9q9F8AeBdV8MWd+fDsaGaMNt+0zcf8Aj9av/CsPAv8A0AI//Amb/wCLrW8Gf8k00n/riK6ev89T93OC/wCFYeBf+gBH/wCBM3/xdH/CsPAv/QAj/wDAmb/4uu9ooA4L/hWHgX/oAR/+BM3/AMXR/wAKw8C/9ACP/wACZv8A4uu9ooA4L/hWHgX/AKAEf/gTN/8AF0f8Kw8C/wDQAj/8CZv/AIuu9ooA4L/hWHgX/oAR/wDgTN/8XR/wrDwL/wBACP8A8CZv/i672igDgv8AhWHgX/oAR/8AgTN/8XR/wrDwL/0AI/8AwJm/+LrvaKAOC/4Vh4F/6AEf/gTN/wDF0f8ACsPAv/QAj/8AAmb/AOLrvaKAOC/4Vh4F/wCgBH/4Ezf/ABdH/CsPAv8A0AI//Amb/wCLrvaKAOC/4Vh4F/6AEf8A4Ezf/F0f8Kw8C/8AQAj/APAmb/4uu9ooA4L/AIVh4F/6AEf/AIEzf/F0f8Kw8C/9ACP/AMCZv/i672igDgv+FYeBf+gBH/4Ezf8AxdH/AArDwL/0AI//AAJm/wDi672igDgv+FYeBf8AoAR/+BM3/wAXV/S/AnhPRtcg1LTNIS1vod3lyieRtu5Sp4LEdCRXXUUAFfBB6mvvevgg9TQB9dfDD/kh2if9tv8A0fJXe1wXww/5Idon/bb/ANHyV3tAH5K6v8fdC1n/AILB+KtNvfj6/wAAdPaKXw0I7Xxjol19vn0a92hL3Tr6xdrJrlr+cQvFMXmjh6KQMfrVWe+k6XJdNPJpunyTltxka3UsT65xnNaFENKUYPdbvu+r+/psunW5NJ1ZTWz2Xbsvusr7u2r2SKK+b9O+Mnimf9pvStBvtB0KHwLrXi7UvCukTxTzf2kt3YWUl29xMrKI/JkNtdxhF5ASF9ziVlj5vxz8dPiD4O+OniLwZaeG/B3iVtmlrp9xZ3twq6NNqes22mWaajlDuMiTTXQWPaQtpIh+/HKzpxc3TUd5pOPndXX3ra/XTfQb0cr/AGXZ+Wtvwe/+R9aUV8OWX7TvxCn8Q+IbS48H+EVg8FaxYab4vlS8uM35vPEN5oyyWIK/u9iWn2orIXyZRDuG0zH7V1Oe/ttEnm0ywTU75QPKtnuBCJOQD85BxgZPTtS0aTT3s/k1dP0a1Q5RcZOL3Wj9VuvVdT8B/jl/yd38Qv8AsMy/zrymvT/jS80n7VfjuS5hFtcNqshliEm8I3GV3YGcHvivMK/0r4F/5JvL/wDrzS/9IifzxnX/ACMK/wDjl+bCiiivqTzArZ8Of8lB0L/sIwf+jFrGrZ8Of8lB0L/sIwf+jFrDFfwZ+j/I0pfGvU6z4wf8nafFH/sbtS/9K5a86r0X4wf8nafFH/sbtS/9K5a86rjyT/kXYf8AwR/9JRrjP48/V/mFFFFemcwV6/8AAD/k9T4Zf9h+3/8AQq8gr134Blh+2f8ADQou9xr0G1c4yd3TNeLxL/yKMV/17n/6Szsy7/eqX+Jfmfux4M/5JppP/XEV09eO+D9c8eD4c6WE8B2Tr5Iw3/CQoM/+Qq6X+3fH3/Qg2P8A4USf/Gq/zFP6MO9orgv7d8ff9CDY/wDhRJ/8ao/t3x9/0INj/wCFEn/xqgDvaK4L+3fH3/Qg2P8A4USf/GqP7d8ff9CDY/8AhRJ/8aoA72iuC/t3x9/0INj/AOFEn/xqj+3fH3/Qg2P/AIUSf/GqAO9orgv7d8ff9CDY/wDhRJ/8ao/t3x9/0INj/wCFEn/xqgDvaK4L+3fH3/Qg2P8A4USf/GqP7d8ff9CDY/8AhRJ/8aoA72iuC/t3x9/0INj/AOFEn/xqj+3fH3/Qg2P/AIUSf/GqAO9orgv7d8ff9CDY/wDhRJ/8ao/t3x9/0INj/wCFEn/xqgDvaK4L+3fH3/Qg2P8A4USf/GqP7d8ff9CDY/8AhRJ/8aoA72iuC/t3x9/0INj/AOFEn/xqj+3fH3/Qg2P/AIUSf/GqAO9orgv7d8ff9CDY/wDhRJ/8ao/t3x9/0INj/wCFEn/xqgDvaK4L+3fH3/Qg2P8A4USf/Gqv6Xq3i651yCDVPCFrpdi27zbpNZWcphSR8gjGcnA68Zz2oA66vgg9TX3vXwQepoA+uvhh/wAkO0T/ALbf+j5K72uC+GH/ACQ7RP8Att/6PkrvaACiiigDxu7+AXwvvPif4m8YSaTr8Ou69BPFfva+KtTt4I2nhjgmuLeCO4WK1unjijRrmBI5iAfn+Zs5Tfs0fCB9T8eXb6R4sdvGWoNqPiCFvHGsmCe9MlvIt5FCbvy7e5ja1tjFPAsckIiQRsgGK95op3dkuyt8u3p5D5n363+ff1PCrX9mv4NWWueGdSt/C+oLeaGyPA7eItQcX8kd3JfRy6gpnK6jKl3LLcpJeCZkmkeRSHYsfdaKKLu1v613E9Xc/n5+OX/J3fxC/wCwzL/OvKa9W+OX/J3fxC/7DMv868pr/SrgX/km8v8A+vNL/wBIifz1nX/Iwr/45fmwooor6k8wK2fDn/JQdC/7CMH/AKMWsatnw5/yUHQv+wjB/wCjFrDFfwZ+j/I0pfGvU6z4wf8AJ2nxR/7G7Uv/AErlrzqvRfjB/wAnafFH/sbtS/8ASuWvOq48k/5F2H/wR/8ASUa4z+PP1f5hRRRXpnMFev8AwA/5PU+GX/Yft/8A0KvIK9f+AH/J6nwy/wCw/b/+hV4vEv8AyKMV/wBe5/8ApLOzLv8AeqX+Jfmfut4M/wCSaaT/ANcRXT1zHgz/AJJppP8A1xFdPX+Yp/RgUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXwQepr73r4IPU0AfXXww/5Idon/bb/wBHyV3tcF8MP+SHaJ/22/8AR8ld7QAUUUUAcHZ/E/wBqHxovfh5Z+KdLuPGdoHFxpiMd6ukcUrxhsbDKkc8MjRhi6pLGzKFYE0Lj4yfCu1vPHFvL4+8MG48HSW0XiiKO9WRtLluWK28MoXJE0jDakX32YqAuWUHxGX4U/F20/aCk1jTbT4dXnhjQPE+r+LfC09z4gvIb3Ub++sJbUWN7ELSRYLdGurlvPjklbakIEIw1Y3jf4N/GTxH+0x8VPFmm6Z8LrfRNStvCc/hv7T4mvfPuLrw/q8uprHdxLYbYI7k3MkZkSSYwmNH8ubeVTSnCLhBydm0m+tndc33K9l9q2g7e/JdE9PNdPS+/ls9T3W3+Pfwdur/AMP2sHxA0GS51mVYrKLewZZGunskjmBX/R3a6jktlWbYWnRogC6lR6ne31lpumS3uo3lrYWcWPMnuZVjjTJAGWYgDkgfjXwdp/7N3xch8Xa3dXU3w2Wz8earp2p+M2h1a8aXQGsvEV7rSw2ANsBfB0vPI8yQ2pR0M2x9/kr97zQw3Fu0NxFHPE33kkUMp+oNR9lPr/Wnyel/tb2Q5pKbUXddPNd/n23W2p/Px8a5obj9rDx7cW8sc8EmryPHJGwZXU4III4IPrXl1eqfG9Ej/a2+ICRqqIusShVUYAHHAryuv9KuBf8Akm8v/wCvNL/0iJ/PGdf8jCv/AI5fmwooor6k8wK2fDn/ACUHQv8AsIwf+jFrGrZ8Of8AJQdC/wCwjB/6MWsMV/Bn6P8AI0pfGvU6z4wf8nafFH/sbtS/9K5a86r0X4wf8nafFH/sbtS/9K5a86rjyT/kXYf/AAR/9JRrjP48/V/mFFFFemcwV698AmVP20Pho7sFVdegJJOABuryGvYf2fkEn7avwzUlFX+3oCxc4AAOTmvE4lf/AAkYv/r3P/0lnZl3+90v8S/M/avwd458FJ8N9KV/GHhZWEIyDq0II/8AHq4D4s/Fa2tde+Hnhnwj8UPBnhObxDq11De6zLNa3bwRQafdXKpGkkgQO8kUeSwYeWsoAVirrzfh/wDaD/Zx0zwhY2N14u8MNcRRhXKabIQT9fKqt4p+MP7HnjnwqdC8ayfDrxfohlWU6frXhoXluXX7r+XLCy7h2OMiv86Z8E8Qyi19Rq/+C5/5f8Psfvsc4wKf8aP3r/M4G+/aX1vxP+zh8HNX0jx94B+HniTxD8Mb3xhrtzcC3uora8trKymWwMUkwKI8l4Xbkv5UDKroW8wZPi79pbxd4ftvFfirw/428N67Z6X8LH8S3/h2+t7XFhql6YxpllHIrxNKI/LvXnV5FZVWDLJ5m4d/q/xE/Yg8QW7w69pfwl1uJ9Ri1J0v/B8U4a7ihSCO5IeA5mWKOONZPvBEVQcACt9/jh+yTJBrsT6h4DeLWyTrKN4fyNRJiWA+ePJ/e/ukSP58/Iqr0AFa1ODOIJTnJYCrrsuSemkvLzVuzin1aJ/tfA8sEq8Vbd8yd3dW3fRJrz5n2TOw+D3xi8OeJfhtqSeIPFzw+I9I1ifTtUi8R3Ol290kqhJAB9hmktnjMcsbK0cjYB2ufMVwPWP+E78Ef9Dl4V/8G0H/AMVXzn4b+NX7Ing3wdaeHfCF54A8LaBa7jbaZpHh37JbQ7mLttjjhCrlmLHA5JJ6mux0T48fs++I/F2naFoviHQL/Vr6dYLS3j0xw0jscADMePzqa/CGewi5ywVVJLVunJLRavbRdfLv1FSzTBv3fbRbv/Mu+nU9b/4TvwR/0OXhX/wbQf8AxVH/AAnfgj/ocvCv/g2g/wDiq1ho2ilQRpOmEHofsqf4V83/AB48Qav4d8Q6J4f8Jah4U8FSTeFNf8RXGsaho0F0jHTIrYx2xSRlAjdrrzJGHzeXA4VoywdflqtSNOLlLZfpqevRoyqzUIrVnvX/AAnfgj/ocvCv/g2g/wDiqP8AhO/BH/Q5eFf/AAbQf/FV8k/Fz4m+JLDwP4cvfCz+DfA94fhNrvjrUV1HSIbom606HTZI7B1dlKQn7c5mIAk2qm10JJrn/Dvxzbx1+1d458KXWreGvhl4VtPBlzqunR3Ph4DUrL+zryOG/vbg3MYjETlpFRcEeSkcwb97tTWceSfI9/efyjzXd9vsS89L2s0zKPvUoVVqpWt83Fbf9vL/AIdNH2t/wnfgj/ocvCv/AINoP/iqP+E78Ef9Dl4V/wDBtB/8VXn3wPj1zxB+y34T8ReP9N09/EWrwyagqTaNFaTwWk8ry2cU8Sjatwls0KyhePND44xXrH9i6N/0CdM/8BU/wonBwk4vdExkpK62Mj/hO/BH/Q5eFf8AwbQf/FUf8J34I/6HLwr/AODaD/4qtf8AsXRv+gTpn/gKn+FH9i6N/wBAnTP/AAFT/CpKMj/hO/BH/Q5eFf8AwbQf/FUf8J34I/6HLwr/AODaD/4qtf8AsXRv+gTpn/gKn+FH9i6N/wBAnTP/AAFT/CgDI/4TvwR/0OXhX/wbQf8AxVH/AAnfgj/ocvCv/g2g/wDiq1/7F0b/AKBOmf8AgKn+FH9i6N/0CdM/8BU/woAyP+E78Ef9Dl4V/wDBtB/8VR/wnfgj/ocvCv8A4NoP/iq1/wCxdG/6BOmf+Aqf4Uf2Lo3/AECdM/8AAVP8KAMj/hO/BH/Q5eFf/BtB/wDFUf8ACd+CP+hy8K/+DaD/AOKrX/sXRv8AoE6Z/wCAqf4Uf2Lo3/QJ0z/wFT/CgDI/4TvwR/0OXhX/AMG0H/xVWrHxZ4V1PVIrHTfE3h/UL2TPl29tqMUkj4BJwqsScAE/QGrv9i6N/wBAnTP/AAFT/CpYdL0y3uVmt9OsYJl+68cCqwyMcECgC9XwQepr73r4IPU0AfXXww/5Idon/bb/ANHyV3tcF8MP+SHaJ/22/wDR8ld7QAUUUUAFFFFABRRRQB/Pz8cv+Tu/iF/2GZf515TXq3xy/wCTu/iF/wBhmX+deU1/pXwL/wAk3l//AF5pf+kRP56zr/kYV/8AHL82FFFFfUnmBWz4c/5KDoX/AGEYP/Ri1jVs+HP+Sg6F/wBhGD/0YtYYr+DP0f5GlL416nWfGD/k7T4o/wDY3al/6Vy151Xovxg/5O0+KP8A2N2pf+lctedVx5J/yLsP/gj/AOko1xn8efq/zCiiivTOYK9f+AX/ACeV8O/+wwn8jXkFev8AwC/5PK+Hf/YYT+RrxeJf+RRiv+vc/wD0lnZl3+9Uv8S/M8gooor2jjCiiigAr2L9n1DJ+2p8Nl3xx/8AE6jJdzhVAySSfwrx2vX/AIB/8nh+Af8AsJf+yPXicTK+T4v/AK9z/wDSWdmXf73S/wAS/M/WbTP2pvgRa+H7S3ufiLpzzxxKrsLW4IJA/wCudYXi744/skfEDSrCw8eX/gXxrY2N6l7ZW+veHjfR21wgIWaNZYWCSAEgMMEAnnmvxXor8W/4lw4e/wCgir98P/kD6/8A4iBj/wCSP4/5n7La18V/2MPEl0s/iKH4Z69OusprSyaj4UW4YagkUcK3uXgJ+0COKJBL98LGi5woA39Y/aD/AGWfEMOoR6/r/hHXI7/TZNNvl1DRGnFzZyHMltIHiO+Fu8Zyp7ivxKopr6OPD6af1irp5w7W/k7aemgf8RAx3/PuP4+vfvqfumP2rfgAAAPiFp4A6AWk/wD8RXT+Efj78JfHfjWHw74U8X2ur6xLG8iW8dvKpKoMscsgAAHvX4C19N/slv5X7Vs9wZoraODw1qUjzSyrGkYEB+YsxAAHqTxXg8UeAmSZblGJxlKtUcqcJSSbjZtLRO0bnblnG+MxGKp0pQilJpPf/M/cHORkc183/Gn4x+Kvhxq2szeH9B0LU9F8L+EpPFPid9RnmjmntEnEf2e02KV84xx3L73JCtHEhXEpkj9Is/in8NU0q3Sb4g+CxKsYDA61B1x/v15145sf2b/iP4y0DX/F3ivw3fanpCmO3a18azWUVxCZYpjb3UVvcJHeW5khjfybhZI8r93k5/l6GT49VIOVCfLfX3XtZ+Xez+R+kSxdDkklNX6aruv0uvK9xnxV+MvijwT8R9VsvD+g6HqGh+GdC07XPE8moTTJPPbXt/LaLFabFKCVEtrmUlyQSIkwokMic3fftE+JNC8H/GdfEfhjwjYeMvDnjhfC3hDSIfELNb6xPPplpqFs01xLFH5eIrh5ZwqN5UcEpUy7AW09W8M/sw65410nxDq3irRb7VdPvZLqOST4gXWy5Zr1r9Y7mP7VsuoI7ljLDBOrxQHiJI1GKm0bQP2Y9E8SeOtVh8T+HtWufGGoDUPEEWveOrjV7e4uRH5QlSC7uZYoGEQWIeSqYjjjQYSNFXN5NmPs2vYSvZ/Ze/Mmuna6203szRYzDKbfMradV21+TetvldHrfwn8bH4lfsu/Dn4htBaWsnibwzY6tJb2s3mxQvcW6StGrfxBSxXPtXoFeQeEvFfwQ8C/C/w94L8JeL/Ami+GND0+HT9KsItbiZbeCJAkabmcs2FA+ZiWJ5JJJNdnpPjzwTr2rjT9D8XeG9YvihcW9lqUU0m0dTtVicD1rfGZZiYznONCUYXbV4vRefyMaGIp8sYuab9VudZXgvj346W/gj4xy+GF8JaprWn6bDo0/iPVobuGNNOj1fUJdPtCkbHdMRLDI8oG3ZEAy+YxCV7r58P/AD2i/wC+xXivjX4KeGfHHxosvGN94r8WaZH5enR61oWn3duNP11NOvHvbFbkSQvKoinkkf8AcSQ+YG2S+YgCjzFF3Wn+Xz629LM6048rv/Wq/S+5W8bfHK28F/GUeHJvCuo6jolpeaJZ63rkd7Ci2U+s3rWNkiQk75f3oQy/d2JKjL5h3KuDa/tCajqnh+OLS/hZ4ij8Yz+Mb/w7b+HdT1eygkQ2dq93JcTTRySxohjQBQhkO+WNW2guyaWp/APQda+KWmeJ9Y+InxB1NIprCfVtInvLH7FrcunXkt7p8lyotg6NbzSgj7O8PmCKJZvNC4OCv7NtpHFqs8Hxx+MFtrlz4rm8SWeswyaKlxp1zPbS2txHEg04QyQyQy7Sk8cpUojoUdd1SoScHvezt63hy/L47+Vuu0ybvG3dX9LSv878vlfyPdfAPjPSfiN8DfB3xA0BblNE8S6Ja6tYLcKFlWG4hWVA4BIDBXAOCRnOCetdbXM+EvD3h/wR8LfDfgzw5HHZeH9C0yDTdNtzMXMUEEaxxqWJyxCqOTyepro1ljdsLIjH0DA1rWUeeTgvdvp6Ewvyq+4+vgg9TX3vXwQeprIs+uvhh/yQ7RP+23/o+Su9rgvhh/yQ7RP+23/o+Su9oAKKKKAPguH4xJo37dOoQaz8WBDeaZ4n1lPHHhO/1SFLTw74at9M8601FoGVWhjMwtG+1EkO17Khd1VBF5B4n+M3i618fatHb/GHXLW+h8T6ta/E+xS5j2eDNFj8W6daWd00Zi/4l4OlSXDJcMF82J5bks/lCRP1TwM5xz60mBk8DnrVRlyxpq1+VJP+9bv5P7XV9GmWpWlJ93f030XpfTporp2Pyp0f4x+LZ/HsdlH8Ytfuz/bWmJ8IrU3sbHxrYyeLdQtbyRf3f/EzjXTY7VTKC/lwFbrcpkE5/UnU11N9EnXR5rG31IgeTJeQtLCvIzuVWUnjPRhzj6VdwOOBx09qWlf3Uv6fm/N7vpfZIU5c03K1r/h5LyXTr3bep+c2o/sV3PxD8U6x4y13xZcaHqup6jcST2aaeVVNszoGUMSQrKocZJ4Ycmqn/Dviy/6KFdf+AS1+klFfcYTxL4owtCFCjjZxhBJJaaJKyW3RHiVeHstqTc50U23d+rPzb/4d8WX/AEUK6/8AAJaP+HfFl/0UK6/8Alr9JKK6P+Iq8W/9B8/w/wAjP/VnK/8Anwj82/8Ah3xZf9FCuv8AwCWpIv2BoNLuotTtvHlzc3Fm4niiNiD5jIdwXg55IxX6QUVMvFPiySaeOn+H+Q1w1lad/Yo/Oa//AGIJPHGuXvjXWPGVxpGr+IJ31S+sVsNotZrhjK8QDEsArOVwTnjmqn/Dviy/6KFdf+AS1+klFTS8UOKqUFCGOmklZbbL5Dlw3lkm26Kuz82/+HfFl/0UK6/8Alo/4d8WX/RQrr/wCWv0korT/iKvFv8A0Hz/AA/yJ/1Zyv8A58I/Nv8A4d8WX/RQrr/wCWr+l/sX3fw28QWnjvQPFk+vazokgurTT308sLhx0UhCGPXsa/RWisq/ifxVWpyp1MbNxkmmtNU9H0Khw5lkJKUaKuj82/8Ah3xZf9FCuv8AwCWj/h3xZf8ARQrr/wAAlr9JKK1/4irxb/0Hz/D/ACJ/1Zyv/nwj82/+HfFl/wBFCuv/AACWj/h3xZf9FCuv/AJa/SSij/iKvFv/AEHz/D/IP9Wcr/58I/Nv/h3xZf8ARQrr/wAAlq/pf7F938N9ftfHOgeLJ9e1jR3+0Wunvp5YTtjbtIUhjwSeD2r9FaKyr+J/FVanKnUxs3GSaa01T0fQqHDmWQkpRoq6Pzb/AOHfFl/0UK6/8Alo/wCHfFl/0UK6/wDAJa/SSitf+Iq8W/8AQfP8P8if9Wcr/wCfCPzb/wCHfFl/0UK6/wDAJaP+HfFl/wBFCuv/AACWv0koo/4irxb/ANB8/wAP8g/1Zyv/AJ8I/Nv/AId8WX/RQrr/AMAlq/YfsX3fgd7ubR/Fc+rvrdrJod2raeW+z290Nkk42kYKDnJ49a/RWisq/ifxVWg4Txs2n6f5FQ4cyyDuqKufm3/w74sv+ihXX/gEtH/Dviy/6KFdf+AS1+klFa/8RV4t/wCg+f4f5E/6s5X/AM+Efm3/AMO+LL/ooV1/4BLR/wAO+LL/AKKFdf8AgEtfpJRR/wARV4t/6D5/h/kH+rOV/wDPhH5t/wDDviy/6KFdf+AS1p6V+xrqHgC6urnQPGF3qM+t2smh3bCxbda29yNsk4KEYKgdTxzzX6I0VjX8TuKa1N06mNm4vdaf5Fw4cy2EuaNFJn52/wDDCN3/ANFY1z/v2f8AGj/hhG7/AOisa5/37P8AjX6JUU/+IncU/wDQbL8P8hf6uZb/AM+V+J+dv/DCN3/0VjXP+/Z/xo/4YRu/+isa5/37P+NfolRR/wARO4p/6DZfh/kH+rmW/wDPlfifnb/wwjd/9FY1z/v2f8a7v4afs06v8GfjfoHjC08War4wR5zY3NnLE22KKZSGmyCcbSAcnjntnNfa9Fc2M8QuIsXQnQrYuUoSVmtNU91saUchwFKanCkk1sFfBB6mvvevgg9TXxh659dfDD/kh2if9tv/AEfJXe1wXww/5Idon/bb/wBHyV3tABRRRQAUUUUAFFFFABRRRQBR1NIZPDeoR3LXyW7W0iytZGQThSpyYzF+8D46bPmzjHOK+bv2Qrq7b9jaPS7/AE74i6bPpnivXoII/GukapZ6g1m+rXc9ixbUkWedTaS2x81i5zlWbergfT9FXGdoyjbe34X/AMweqQUUUVABRRRQB558WdV03RP2bvGer6v4V8V+OdPtNMkll8O+GrKa61HVMdLeCKEh3ZzhcZC4J3ELuri/2arG7079jzw5bX8mu/bmur64ntNU0zUbI6c015PN9hhTUIYrk2tsJBbwu8ah4okZQFIA93ooi2r+dvwv/n/WoS1S8rhRRRQAUUUUAeWfGp7Jf2aPEwv7a7u4HijVUh8K6j4hUSGRdhl0/TmW5uoQ20vHGwym7cQu6sP9m628RWX7Dnw4sfFVprdprlrpf2eYauJ1upUjkdIpnjuP38PmRhJBDNmWJXEchLoxPt9FCsk/MHd28gooooAKKKKAPJPjbp/jvWfgRdaD4AtXnvtVu4bPVpbfVPsN3b6a7f6W1rL/AA3LRBo423KUaQSAkoFOP+zJF4qg/wCCeHwTtvG+j61oPi638F6dDq1hrEjPexTJbojecX+YSHG5g/zAkhuQa9zopxfLGS7tP7k/w1B3dvL+r/12QUUUUgCiiigD5x/acsY7z4IaHM95rVu9lr6XMMFl4A1XxbBeP9muY1hurDTGSdoMyb9+9UWRIsnJAPrfw4u9ev8A9nzwNfeKfDcXg3xLcaBZy6roMU/nJpdw0CGW2D/xCNspnnO3qa7OiiFoxkrbtP7lb+vRed3N8zi+yt+N/wCv+GsUUUUCPhf4pv8AFWz/AOCpPha/07w5P4s8ItY6Bb6FYXHhfUL2zhd9RvV1m7TUIZltdMuILVraYtdRu1ysaQw4ZnB0/G/jX45WX7X/AIj0vw+/xD+xW1wyaRodr4GS48P3ek/2M0zag+pmEkX66jugW3FwCVRB9kYObivtWilUXNT5Fpvt52/y/F2tpa6c1Go52vdJa+Wn9fqrp/NGoaN8Y7f9nb4PeGLf4oeO7jxfqWqxx+LfGcXhvTPt8ULWF5cOTb/Yza26idYIlLQnb8isXYkt8/af41/aatPhL4VvPG+u/FfTtO13SPDmreKdY0H4axXms+FpLu01Q31nZWaWUvmKl1a6ZG6SWt1PCt3KzkKUaH9GKK0lJNzdviafp5LstP6u7zT92EU9bK1/v19dfwR+feq+IP2ro/2f9e8cf2t40tdeh0Xw7ZHw1beEbRTbieaBtW1aNEtLueS9jgeTFvGLmOJ0YfZ7htqV9b/Bu98W6j+zR4UvfHOoyav4mlt3a5vJdKn0+aZPNfyWmgnt7Z0m8ry/MzbwAvuKxRqVQem0UKfuuPd38/T0/rayUtXaf9f1/XqV8EHqa+96+CD1NQM+uvhh/wAkO0T/ALbf+j5K72uC+GH/ACQ7RP8Att/6PkrvaACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAr5V+Ln7Tr/DLx1480zSfhR4z+IOmeAvC8HiTxzqmmXlnbR6ZZTNMVWFJ5Ua5nEVtPMY1AUImN+9lQ/VVfNHxR/Ze8JfFL4keI/EN140+JPhCHxTodvofjbSfDmpW8Fp4nsIHlaO3uvNgkljG2eeMvbyQuY5XUt0IWt1b8dvnbW1+2pcHHXm/rVX+dr76GreftSfBCxfxOJ/FepONAngtdQktvDWpXEb3U7wxx2dvJHbst3d77iFDb25klVnAZAc4nm/ae+B9v4Om1668aS2mmwyXkUzXGh38UkT2emDVrlHiaASK0dmwlKlQc/IMyApXFaj+yH4Nun8Sw6X4/wDij4Z0nUfE0XijStK0u9sRa+HtYS4iuDfWYktHbe8kWWSdposSSgIoc1w/jf8AYg0LX/D/AI8vNM+JvxJvfEmtaPqi2ltr1/ayaWNUvtBOizahMkVqsjSSxCOSTa4UOrFFQMyMN/u5O2ttPWy38r8y/wDAXfVpFKKdSKk9L6+l/wA7Wf8A4EuicvSrf9sf9nu7+Ft140g8W+In8O2d2LfUbg+CNZV9OzBHcrPdRG08y2tjDLHILmZUhKsCHNY/jb9t39nrwR/wsm0uPEniHXNe8E2l7Pq2k6V4Xv3eZ7MQm4gt53hW2mljFxAzhZsRo/mOVQM4828S/wDBPP4a+PPhe2jePPiP8XfEmtXcwm1XW729026nuMWMVlHEEmsGgQQxRDyp0hW5QvIwmzI5PrfiD9kb4Y+JtC1zTdV1Pxm9nqr+I3ukjvoU512FIbvafJyNixgxf3TndvHFaVOVSly7Wdu9/dt8vi+5K/Vxh3eNNz3bXN5LW/fy+9vyPSfBHxw+HfxE+Id34U8K3viO712z0yDUL+G78K6lZx2STRRTRxTzT26RRXJjnif7M7iYK4YpjJHrdfPfgv8AZ20Lwh+1K/xhu/G3jjxh40fwunh959Xj02FZYF8gtJKbOzgeeQtbq4853SMyS+UsYcrX0JSlayt/Wrt+FiIOX2vL8lf8bhRRRUlhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXwQepr73r4IPU0AfXXww/wCSHaJ/22/9HyV3tfEXiG0tbL4heIbWztre0tk1S52RQxhEXMzk4A4HJJrIwPSgD70or4LwPSjA9KAPvSivgvA9KMD0oA+9KK+C8D0owPSgD70or4LwPSjA9KAPvSivgvA9KMD0oA+9KK+C8D0owPSgD70or4LwPSjA9KAPvSivgvA9KMD0oA+9KK+C8D0owPSgD70or4LwPSjA9KAPvSivgvA9KMD0oA+9KK+C8D0owPSgD70or4LwPSjA9KAPvSivgvA9KMD0oA+9KK+C8D0owPSgD70or4LwPSjA9KAPvSivgvA9KMD0oA+9KK+C8D0owPSgD70or4LwPSjA9KAPvSivgvA9KMD0oA+9KK+C8D0owPSgD70r4IPU0/A9K+t/CvhTwv8A8Kw8N/8AFN6B/wAgu3/5h8X/ADyX/ZoA/9k= 4.0000000 0.3333333 0 <session lang="en" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="en">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>555</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>298</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>076</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>047</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>014</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>01</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>precision</mi><mo>(</mo><mn>3</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>me</mi><mo>=</mo><mn>1</mn><mo>*</mo><mi>a</mi><mo>+</mo><mn>2</mn><mo>*</mo><mi>b</mi><mo>+</mo><mn>3</mn><mo>*</mo><mi>c</mi><mo>+</mo><mn>4</mn><mo>*</mo><mi>d</mi><mo>+</mo><mn>5</mn><mo>*</mo><mi>e</mi><mo>+</mo><mn>6</mn><mo>*</mo><mi>f</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>precision</mi><mo>(</mo><mn>3</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>var</mi><mo>=</mo><mi>a</mi><mo>*</mo><mo>(</mo><mn>1</mn><mo>-</mo><mi>me</mi><msup><mo>)</mo><mn>2</mn></msup><mo>+</mo><mi>b</mi><mo>*</mo><mo>(</mo><mn>2</mn><mo>-</mo><mi>me</mi><msup><mo>)</mo><mn>2</mn></msup><mo>+</mo><mi>c</mi><mo>*</mo><mo>(</mo><mn>3</mn><mo>-</mo><mi>me</mi><msup><mo>)</mo><mn>2</mn></msup><mo>+</mo><mi>d</mi><mo>*</mo><mo>(</mo><mn>4</mn><mo>-</mo><mi>me</mi><msup><mo>)</mo><mn>2</mn></msup><mo>+</mo><mi>e</mi><mo>*</mo><mo>(</mo><mn>5</mn><mo>-</mo><mi>me</mi><msup><mo>)</mo><mn>2</mn></msup><mo>+</mo><mi>f</mi><mo>*</mo><mo>(</mo><mn>6</mn><mo>-</mo><mi>me</mi><msup><mo>)</mo><mn>2</mn></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>precision</mi><mo>(</mo><mn>3</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sd</mi><mo>=</mo><msqrt><mi>var</mi></msqrt></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library></session>]]>