设随机变量X的分布律为P{X=k}=k/15,k=1,2,3,4,5,试求:(1)P{1/2
我的答案是:X仅在x=k/15 5个点处概率不等于0,而F(x)的植是X
绛旓細鍒╃敤姒傜巼鐨勫熀鏈ц川涔嬩竴锛氭鐜囧拰涓1 鍗斥垜b位^k=lim[b位(1-位^k)/(1-位)]=b位/(1-位)=1 鎵浠ノ=1/(b+1)闅忔満鍙橀噺鍦ㄤ笉鍚岀殑鏉′欢涓嬬敱浜庡伓鐒跺洜绱犲奖鍝嶏紝鍙兘鍙栧悇绉嶄笉鍚岀殑鍊硷紝鏁呭叾鍏锋湁涓嶇‘瀹氭у拰闅忔満鎬э紝浣嗚繖浜涘彇鍊艰惤鍦ㄦ煇涓寖鍥寸殑姒傜巼鏄竴瀹氱殑锛屾绉嶅彉閲忕О涓洪殢鏈哄彉閲忋傞殢鏈哄彉閲忓彲浠ユ槸绂绘暎鍨...
绛旓細璁鹃殢鏈哄彉閲弜鐨勫垎甯冨緥涓,x鍒嗗埆鏄 -3 -2 -1 0 1 2,p鍒嗗埆鏄0.1 0.2 0.25 0.2 0.15 ,姹倅=-2x+1鐨勫垎甯冨緥鍜寊=2x^2-3鐨勫垎甯冨緥()
绛旓細X= 0 1 3 5 p= c c/2 c/4 c/6 褰掍竴鍖朿+c/2+c/4+c/6=1--->c=12/23 鏉′欢姒傜巼瀹氫箟P{X<3|X鈮1}=P{X<3涓擷鈮1}/P{X鈮1}=P{X=0}/锛1-P(X=1))=(12/23)/(1-6/23))=12/17
绛旓細鏍规嵁鍒嗗竷寰鐨勬ц川 c/3^0+c/3^1+c/3^2+鈥︹=1 鈭碿(1+1/3+1/3^2+鈥︹)=1 1+1/3+1/3^2+鈥︹︽槸绛夋瘮绾ф暟 鍏跺拰涓 1+1/3+1/3^2+鈥︹=1/(1-1/3)=3/2 鈭碿路3/2=1 鈭碿=2/3
绛旓細鐢卞綊涓鎬ф湁 P(惟)=P(X=1)+...+P{X=N}=N*a/N =a =1 鎵浠=1
绛旓細甯告暟a=1銆傝В锛氬洜涓P(X=k)=a/N锛岄偅涔 P(X=1)=P(X=2)=P(X=3)=...=P(X=N-1)=P(X=N)=a/N锛屽張鍥犱负P(X=1)+P(X=2)+P(X=3)+...+P(X=N-1)+P(X=N)=1锛屽嵆a/N+a/N+a/N+...+a/N+a/N=1锛屽嵆a/N*N=1锛屾墍浠ュ彲寰梐=1銆傚嵆甯告暟a绛変簬1銆
绛旓細棣栧厛瑕佺悊瑙鐨勬墍鏈夊肩殑鍜屾槸瑕佷负1鐨 鐒跺悗杩欐牱鍋p锝泋=1锝+p锝泋=2锝+銆傘傘P锝泋=N锝=1 浣嗙敱鏉′欢p锝泋=1锝+p锝泋=2锝+銆傘傘侾锝泋=N锝=a/N*N=a 鎵浠=1
绛旓細P(X=3鐨勫嶆暟)=P(X=3)+P(X=6)+P(X=9)+鈥+P(X=3n)+鈥=(1/2)^3+(1/2)^6+(1/2)^9+鈥+(1/2)^3n+鈥=(1/8)/(1-1/8)=1/7,8,
绛旓細鏍规嵁姒傜巼鍏悊鍖栧畾涔,鎵鏈闅忔満鍙橀噺鍙栧肩殑姒傜巼鍔犺捣鏉ュ簲璇ユ槸1.涓婇潰閭d釜,X鍙互鍘籒涓,姣忎釜姒傜巼閮芥槸a锛廚,鍔犺捣鏉ュ氨鏄痑.涓婇潰涓よ姣旇緝涓涓,鎵浠鏄1.
绛旓細鍒╃敤鍏ㄦ鐜囧拰=1锛P{X=1}=C(2\3)锛孭{X=2}=C(4\3)锛孭{X=3}=2C锛屾墍浠1+P2+P3=1锛孋=1/4銆傛鐜囧嚱鏁板氨鏄弿杩版鐜囩殑鍑芥暟锛屽洜鍙橀噺涓瀹氭槸姒傜巼鍊硷紝鑷彉閲忓氨鏄闅忔満鍙橀噺浜嗭紙鍒嗕负绂绘暎鍨嬪拰杩炵画鍨嬶級銆俰nput涓涓彉閲忥紝output涓涓鐜囷紝杩欏氨鏄鐜囧嚱鏁般備絾鏄洜涓篿nput鐨勯殢鏈哄彉閲忓彲鑳芥槸绂绘暎鍨嬬殑锛屼篃...
