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1����、、基于Fisher準則線性分類器設(shè)計1�、實驗內(nèi)容:已知有兩類數(shù)據(jù)叫和仍2二者的概率已知p(叫=0.6,p⑽2=0.4����。eo}中數(shù)據(jù)點的坐標對應(yīng)如下:數(shù)據(jù):X=0.23311.52070.64990.77571.05241.19740.29080.25180.66820.56220.90230.1333-0.54310.9407-0.21260.0507-0.08100.73150.33451?0650-0.02470.10430.31220.66550.58381.16531.26530.8137-0.33990.51520.7226-0.20150.40
2、70-0.1717-1.0573-0.2099y2.33852.19461.67301.63651.78442.01552.06812.12132.47971.51181.96921.83401.87042.29481.77142.39391.56481.93292.20272.45681.75231.69912.48831.72592.04662.02262.37571.79872.08282.07981.94492.38012.23732.16141.92352.2604Z—0.53380.85141.08310.41641.11760.55360.6
3���、0710.44390.49280.59011.09271.07561.00720.42720.43530.98690.48411.09921.02990.71271.01240.45760.85441.12750.77050.41291.00850.76760.84180.87840.97510.78400.41581.03150.75330.9548eo2數(shù)據(jù)點的對應(yīng)的三維坐標為x2=1.40101.23012.08141.16551?37401.18291.76321.97392.41522.58902.84721.95391.25001.28641.
4����、26142.00712.18311.79091.33221.14661.70871.59202.93531.46642.93131.83491.83402.50962.71982.31482.03532.60301.23272.14651.56732.94141.02980.96110.91541.49010.82000.93991.14051.06780.80501.28891.46011.43340.70911.29421.37440.93871.22661.18330.87980.55920.51500.99830.91200.71261.28331
5����、.10291.26800.71401.24461.33921.18080.55031.47081.14350.76791.1288z2=0.62101.36560.54980.67080.89321.43420.95080.73240.57841.49431.09150.76441.21591?30491.14080.93980.61970.66031.39281.40840.69090.84000.53811.37290.77310.73191.34390.81420.95860.73790.75480.73930.67390.86511.36991.1
6、458數(shù)據(jù)的樣本點分布如下圖:1)請把數(shù)據(jù)作為樣本��,根據(jù)Fisher選擇投影方向VV的原則�����,使原樣本向量在該方向上的投影能兼顧類間分布盡可能分開,類內(nèi)樣木投影盡可能密集的要求��,求出評價投影方向VV的函數(shù)���,并在圖形表示出來�����。并在實驗報告中表示出來���,并求使JF(w)取極大值的用matlab完成Fisher線性分類器的設(shè)計�,程序的語句要求有注釋。2)根據(jù)上述的結(jié)果并判斷(1��,1.5���,0.6)(1.2,1.0�,0.55)�,(2.0,0.9,0.68),(1.2,1.5,0.89),(0.23,2.33,1.43),屬于哪個類別��,并畫山數(shù)據(jù)分類相應(yīng)的結(jié)果圖,要求畫出
7���、其在IV上的投影���。3)回答如下問題,分析一下W的比例因子對于Fisher判別函數(shù)沒有影響的原因��。2�����、實驗代碼xl=[0.23311.52070.64990.77571.05241.19740.29080.25180.66820.56220.90230.1333-0.54310.9407-0.21260.0507?0.08100.73150.33451.0650-0.02470.10430.31220.66550.58381.16531.26530.8137-0.33990.51520.7226-0.20150.4070-0.1717?1.0573-0.20
8�����、99];x2=[2.33852.19461.67301.63651
