以抛物线y=x2上一点W(1,1)为直角顶点,作抛物线的没接直角三角形△MAB,则直线AB一定过点N 已知抛物线y=14x2,以M (-2,1)为直角顶点作该抛物...
\u4ee5\u629b\u7269\u7ebfY=X\u5e73\u65b9\u4e0a\u7684\u4e00\u70b9M\uff081,1\uff09\u4e3a\u76f4\u89d2\u9876\u70b9\uff0c\u4f5c\u629b\u7269\u7ebf\u76842\u4e2a\u5185\u63a5\u4e09\u89d2\u5f62MAB\u4e0eMCD\u6c42\u7ebf\u6bb5AB\u4e0eCD\u4ea4\u70b9E\u7684\u5750\u6807\u7a97\u524d\u6709\u4e00\u7247\u7eff\u60a0\u60a0\u7684\u8349\u5730\u3002
\u89e3\uff1a\u8bbeA\uff08x1\uff0cy1\uff09\uff0cB\uff08x2\uff0cy2\uff09\uff0c\u76f4\u7ebfAB\u7684\u89e3\u6790\u5f0f\u4e3ay=kx+b\uff0c\u7531y\uff1dkx+by\uff1d14x2\u5f97x2-4kx-4b=0\uff0c\u2234x1+x2=4k\uff0cx1x2=-4b\uff0c\u2234y1+y2\uff1d14x12+14x22\uff1d14[(x1+x2)2?2x1x2]\uff1d4k2+2b\uff0cy1y2\uff1d14x1214x22\uff1d116(x1x2)2\uff1db2\u2026\uff083\u5206\uff09\uff0c\u2235AM\u22a5BM\uff0c\u2234KAM\u00d7KBM\uff1d?1\uff0c\u2234y1?1x1+2\u00d7y2?1x2+2\uff1d?1\uff0c\u2234\uff08y1-1\uff09\uff08y2-1\uff09+\uff08x1+2\uff09\uff08x2+2\uff09=0\u2026\uff085\u5206\uff09\uff0c\u2234x1x2+2\uff08x1+x2\uff09+4+y1y2-\uff08y1+y2\uff09+1=0\uff0c\u2234<table style="text-align: left; width: 100%; margin-left: 1px; margin-right: 1px" cellspacing="-1" cellpadding="-1"
将一次函数与二次函数组成方程组,消去Y得到关于x的一元二次方程,利用根与系数的关系建立起系数与根的关系,又知两直线垂直,
可得两直线斜率之积为-1,列出关于x、y的方程,
利用根与系数的关系将方程转化为直线的解析式,再判断其所过定点.
选A
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绛旓細锛堚厾锛鎶涚墿绾縴=x2鐨勭劍鐐逛负锛0锛14锛夛紟鈥锛1鍒嗭級鐢遍鎰忥紝寰楃洿绾緼B鐨勬柟绋嬩负y-1=k锛坸-1锛夛紝鈥︼紙2鍒嗭級浠=0锛屽緱y=1-k锛屽嵆鐩寸嚎AB涓巠杞寸浉浜や簬鐐锛0锛1-k锛夛紟鈥︼紙3鍒嗭級鈭鎶涚墿绾縒鐨勭劍鐐瑰湪鐩寸嚎AB鐨勪笅鏂癸紝鈭1-k锛14锛岃В寰梜锛34锛庘︼紙5鍒嗭級锛堚叀锛夎B锛坸1锛寈12锛夛紝C锛坸2锛寈22锛夛紝鍒...
绛旓細A,B鍦鎶涚墿绾縴=2x^2涓 鍒檡1=2x1^2 y2=2x2^2 A(x1,2x1^2) B(x2,2x2^2)AB鍏充簬鐩寸嚎y=x+m瀵圭О 鍒欑洿绾緼B涓庣洿绾縴=x+m鍨傜洿 鏂滅巼涔樼Н涓-1 鍗砙(2x2^2-2x1^2)/(x2-x1)]*1=-1 2(x2+x1)=-1 x1+x2=-1/2 AB鍏充簬鐩寸嚎y=x+m瀵圭О 鍒橝B涓偣C((x1+x2)/2,(2x1^2...
绛旓細璁$畻鈭珁1/2ds,鍏朵腑L鏄鎶涚墿绾縴=x2涓婄偣O(0,0)涓庣偣(1,1)涔嬮棿鐨勪竴娈靛姬. 鎴戞潵绛 1涓洖绛 #鍥藉簡蹇呯湅# 鍏ㄥ娓稿浣曚綋楠屽绉嶇帺娉?绉戝垱17 2022-08-26 路 TA鑾峰緱瓒呰繃323涓禐 鐭ラ亾灏忔湁寤烘爲绛斾富 鍥炵瓟閲:140 閲囩撼鐜:57% 甯姪鐨勪汉:42.3涓 鎴戜篃鍘荤瓟棰樿闂釜浜洪〉 灞曞紑鍏ㄩ儴 宸茶禐杩 宸茶俯杩< 浣犲...
绛旓細璁剧洿绾緼P涓篩=X+B锛屼唬鍏鐐瑰潗鏍囷細-1+B=0锛孊=1 鍥犳鐩寸嚎AP琛ㄨ揪寮忎负Y=X+1 姹傜偣P鍧愭爣锛岃仈绔媃=X+1锛孻=X²-1 X²-X-2=0锛岋紙X+1锛夛紙X-2锛=0 X1=-1锛堝嵆A鐐瑰潗鏍囷級X2=2 鎵浠鐐规í鍧愭爣涓2锛岀旱鍧愭爣Y=X+1=3銆侾鍧愭爣涓猴紙2锛3锛夋牴鎹袱鐐归棿璺濈鍏紡锛欰P=鈭氾蓟锛-1-2锛&...
绛旓細锛1锛 p鐐癸紙x锛y)婊¤冻y=x鐨勫钩鏂癸紝鍙互鐨勫埌p锛x锛寈2锛 A,O閮芥槸瀹氱偣 鍙互鐪嬫垚涓夎褰㈢殑搴 涓夎褰㈢殑楂樺氨鏄疉鐐瑰埌x杞寸殑璺濈锛屼篃灏辨槸x鐨勫钩鏂 鎵浠ヤ笁瑙掑舰闈㈢Н=搴晉楂樏2=浜屽垎涔嬩笁x鐨勫钩鏂 y=x鐨勫钩鏂 鎵浠 涓夎褰㈤潰绉=涓夊垎涔浜寉 锛2锛 OQA鏄瓑鑵颁笁瑙掑舰锛屾墍浠鐐...
绛旓細宸茬煡鐐笰锛1锛m锛夊湪鎶涚墿绾縴=x²涓 灏咥锛1锛宮锛変唬鍏ュ緱鍒 m锛1 鍦▁杞翠笂瀛樺湪涓鐐锛屼娇OAP绛夎叞涓夎褰 P鐨勫潗鏍囦负锛2锛0锛
绛旓細鈭电偣P鏄鎶涚墿绾縴=x2涓浣嶄簬绗竴璞¢檺鍐涓鐐癸紝鐐A锛3锛0锛夛紝璁剧偣P鐨勫潗鏍囦负锛坸锛y锛夛紙x锛0锛夛紟鈭碠A=3锛屸柍AOP鐨勯珮涓簓=x2锛屸埓鈻矨OP鐨勯潰绉疭涓巠鐨勫叧绯诲紡涓猴細S=12脳3脳y=32y锛涳紙2锛塖鏄痽鐨勪竴娆″嚱鏁帮紝S鏄痻鐨勪簩娆″嚱鏁帮紟
绛旓細鐢诲浘鍙煡锛屾牴鎹瓑鑵颁笁瑙掑舰鐨勬ц川锛孉B涓ょ偣鐨勪腑鐐瑰潗鏍囨槸锛0锛1锛夎AB鍒嗗埆涓猴紙0锛宎锛夛紝锛0锛宐锛塧+b=2 鐩寸嚎MA鐨勮В鏋愬紡涓y=锛a-1锛墄+a 鐩寸嚎MB鐨勮В鏋愬紡涓簓=锛坆-1锛墄+b 灏嗙洿绾縈A浠e叆鎶涚墿绾鐨勮В鏋愬紡涓紝寰楋紙a-1锛墄+a=x^2 x=-1鎴栬厁=a 寰桺锛坅锛宎^2)鍚岀悊寰桻锛坆锛宐^2)k=(b^2...
绛旓細y=x2 y'=2x 鈭玿ds =鈭(0->2) x *鈭(1+y'^2) dx =1/2鈭(0->2)鈭(1+4x^2)dx^2 =1/8鈭(0->2)鈭(1+4x^2)d(1+4x^2)=1/8 * 2/3 *鈭(1+4x^2)^3 |(0->2)=1/12 * (17鈭17 -1)
