设随机变量x服从二项分布b(200,0.5)则D(x)=?
详细过程如图rt,希望能帮到你解决问题
绛旓細浜岄」鍒嗗竷鏄敱浼姫鍒╂彁鍑虹殑姒傚康锛屾寚鐨勬槸閲嶅n娆$嫭绔嬬殑浼姫鍒╄瘯楠屻傚湪姣忔璇曢獙涓彧鏈変袱绉嶅彲鑳界殑缁撴灉锛岃屼笖涓ょ缁撴灉鍙戠敓涓庡惁浜掔浉瀵圭珛锛屽苟涓旂浉浜掔嫭绔嬶紝涓庡叾瀹冨悇娆¤瘯楠岀粨鏋滄棤鍏筹紝浜嬩欢鍙戠敓涓庡惁鐨勬鐜囧湪姣忎竴娆$嫭绔嬭瘯楠屼腑閮戒繚鎸佷笉鍙樸闅忔満鍙橀噺X鏈嶄粠浜岄」鍒嗗竷锛岃涓猴細X锝b(n锛宲)锛屼緥濡傦細鍦ㄤ竴搴уぇ鍩庡競涓紝鑻ョ敺鎬у湪...
绛旓細璇︾粏杩囩▼濡傚浘rt锛屽笇鏈涜兘甯埌浣犺В鍐抽棶棰
绛旓細x锝B(2,0.5)鍗x鏈嶄粠浜岄」鍒嗗竷 閭d箞x鐨勫彇鍊煎彧鑳芥槸0,1,2 鎵浠(x鈮1)= 1 -P(x=0)鑰孭(x=0)=0.5*0.5=0.25 鎵浠 P(x鈮1)=1 -P(x=0)=1 -0.25=0.75
绛旓細闅忔満鍙橀噺X鏈嶄粠浜岄」鍒嗗竷.鍏跺垎甯冨垪涓猴細X 0 1 2 P (1-p)² p(1-p) p²P(x=0)=(1-p)²P(X=1)=C(2,1)P(1-p)P(X=2)=p².EX=np=2p.DX=np(1-p)=2p(1-p).
绛旓細鍥犱负X~B(n,p),鎵浠(X)=np,D(X)=np(1-p)鍙圖(X)=E(X^2)-E(X)^2,鏁匛(Y)=E(X^2)=np(1-p)+(np)^2
绛旓細鍥犱负X~B(n,p)锛屾墍浠(X)=np锛孌(X)=np(1-p)鍙圖(X)=E(X^2)-E(X)^2锛屾晠E(Y)=E(X^2)=np(1-p)+(np)^2
绛旓細x鏈嶄粠浜岄」鍒嗗竷B(10,0.1),鏍规嵁鍏紡EX=nP=10*0.1=1DX=nP(1-P)=10*0.1*0.9=0.9=E(X-EX)^2=E(X^2-2x+1)=0.9E(X^2)=0.9+2EX-1=0.9+2-1=1.9E(5X^2+3)=5E(X^2)+3=5*1.9+3=12.5杩欎釜绛旀缁濆姝g‘!
绛旓細D(cx+b)=c^2DX D(-2x+1)=4DX=4*3*(0.5)(1-0.5)=3
绛旓細闅忔満鍙橀噺X鏈嶄粠浜岄」鍒嗗竷b(n,p)EX=np DX=npq=np(1-p)鈭1-p=0.7 p=0.3 n=4 鈭碢(x=2)=C(4,2)*0.3^2*(1-0.3)^2=0.2646 濡傛灉鎮ㄨ鍙垜鐨勫洖绛旓紝璇风偣鍑烩滈噰绾充负婊℃剰绛旀鈥,绁濆涔犺繘姝ワ紒
绛旓細y鐨勬鐜鍒嗗竷濡備笅 -1 0 1 2/15 1/3 8/15 鐢遍鎰忓鏄撶殑寰楀埌y鐨勫彇鍊间负姝h礋1鍜0 鍐嶇敱绛夋瘮鏁板垪鐨勬眰鍜屽叕寮忓彲绠楀緱y鐨勬鐜囧垎甯
