如图①,已知直线y=x+b与y轴交于点C(0,3),与x轴交于点A,抛物线y=ax²+2a+c 如图,抛物线y=ax2+bx+c(a≠0)与x轴交于点A(-...
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郭敦顒回答:(1)抛物线“y=ax²+2a+c”,可能是抛物线“y=ax²+2ax+c”,以此作答——
C(0,3)代入 抛物线y=ax²+2ax+c得:
C(0,3)代入 直线y=x+b得,b=3,直线y=x+3,斜率k=1,y=0时,x=-3
∴A点坐标为A(-3,0),
将A(-3,0)和c=3代入y=ax²+2ax+c得,0=9a-6a+3,a=-1
抛物线为:y=-x²-2x+3,∴B点坐标为B(1,0),
抛物线的对称轴是:x=-1
点P为切点,切线的斜率k1=k=1,
作PK⊥AC于K,则PK的斜率k2=-1/k=-1,,
设P点坐标为P(x₁,y₁),设K点坐标为K(x₂,y₂),
PK的方程按点斜式有:y=-x-x₁ +y₁
P(x₁,y₁)代入y=-x²-2x+3得,y₁=-x₁²-2x₁+3
用尝试—逐步逼近法求解:
当x₁=-1.8时,y₁=3.56,
y=-x+x₁ +y₁=-x+1.76,y=-x+1.76,与y=x+3联立得
-x+1.76= x+3,2x=-1.24,
∴x₂=-0.62,y₂=x+3=2.38。
(y₁-y₂)/(x₁-x₂)=(3.56-2.38)/(-1.8+0.62)=-1.18/1.18=-1,
无误,一次性尝试对了(这是用尝试—逐步逼近法首次一次性尝试对),
PK=√[(x₁-x₂)²+(y₁-y₂)²]=√[1.18²+(-1.18)²]=1.18√2
AC=3√2,
maxS△PAC=AC•PK/2=(3√2•1.18√2)/2=3.54,
maxS△PAC=3.54。
(2)若△ABM的面积被AN恰好平分,则N为BM中点,
图②中在x的区间[-3,1]内抛物线的方程是:y=x²+2x-3,
顶点坐标是Q(-1,-4),B点坐标为B(1,0)
设N点坐标为N(x₄,y₄),设M点坐标为M(x₃,y₃)
用尝试—逐步逼近法求解:
当x₄=-1.0时,y₄=-4
BN=√[(1+1)²+(0+4)²]=2√5,
直线l的方程按两点式得,(y-0)/(x-1)=(0+4)/(1+1)=2,
y =2x-2,与y=-x²-2x+3联立得,
2x-2=-x²-2x+3, x²+4x-5 =0,
∴x₃=-5,(x=1,为点B坐标了)
∴y₃=2x-2=-10-2=-12
MN=√[(-5+1)²+(-12+4)²]=4√5;
当x₄=-2.0时,代入y=x²+2x-3得,y₄=-3.0
BN=√[(1+2.0)²+(0+3.0)²]=3√2=4.2426
直线l的方程按两点式得,(y-0)/(x-1)=(0+3.0)/(1+2.0)=1.0,
y =1.0x-1.0,与y=-x²-2x+3联立得,
1.0x-1.0=-x²-2x+3, x²+3.0x-4.0 =0,
∴x₃=-4.0,(x=1,为点B坐标了)
∴y₃=x-1. =-5.0,
MN=[(-4. +2)²+(-5. +3)²]=2√2=2.828;
当x₄=-1.6时,代入y=x²+2x-3得,y₄=-3.64
BN=[(1+1.6)²+(0+3.64)²]=4.4732,
直线l的方程按两点式得,(y-0)/(x-1)=(0+3.64)/(1+1.6)=1.4
y =1.4x-1.4,与y=-x²-2x+3联立得,
1.4x-1.4=-x²-2x+3, x²+3.4x-4.4=0,
∴x₃=-4.4,(x=1,为点B坐标了)
∴y₃=1.4x-1.4=-6.16-1.4=-7. 56,
MN=[(-4.4+1.6)²+(-7. 56+3.64)²]=4.817;
当x₄=-1.7时,代入y=x²+2x-3得,y₄=-3.51
BN=[(1+1.7)²+(0+3.51)²]=4.428,
直线l的方程按两点式得,(y-0)/(x-1)=(0+3.51)/(1+1.7)=1.2536
y =1.2536x-1.2536,与y=-x²-2x+3联立得,
1.2536x-1.2536=-x²-2x+3, x²+3.2536x-4.2536=0,
∴x₃=-4.2536,(x=1,为点B坐标了)
∴y₃=1.2536x-1.2536=-5.3322-1.2536=-6.586,
MN=[(-4.2536+1.7)²+(-6.586+3.51)²]=4.0;
当x₄=-1.66时,代入y=x²+2x-3得,y₄=-3.5644
BN=[(1+1.66)²+(0+3.5644)²]=4.4475,
直线l的方程按两点式得,(y-0)/(x-1)=(0+3.5644)/(1+1.66)=1.34
y =1.34x-1.34,与y=-x²-2x+3联立得,
1.34x-1.34=-x²-2x+3, x²+3.34x-4.34=0,
∴x₃=-4.34,(x=1,为点B坐标了)
∴y₃=1.34x-1.34=-5.8156-1.34=-7.1556,
MN=[(-4.34+1.66)²+(-7.1556+3.5644)²]=4.481;
当x₄=-1.68时,代入y=x²+2x-3得,y₄=-3.5376
BN=[(1+1.68)²+(0+3.5376)²]=4.4381,
直线l的方程按两点式得,(y-0)/(x-1)=(0+3.5376)/(1+1.68)=1.32
y =1.32x-1.32,与y=-x²-2x+3联立得,
1.32x-1.32=-x²-2x+3, x²+3.32x-4.32=0,
∴x₃=-4.32,(x=1,为点B坐标了)
∴y₃=1.32x-1.32=-5.7024-1.32=-7. 0224,
MN=[(-4.32+1.68)²+(-7.0224+3.5376)²]=4.372;
当x₄=-1.667时,代入y=x²+2x-3得,y₄=-3.5551
BN=[(1+1.667)²+(0+3.5551)²]=√19 .7517=4.4443,
直线l的方程按两点式得,(y-0)/(x-1)=(0+3.5551)/(1+1.667)=1.333
y =1.333x-1.333,与y=-x²-2x+3联立得,
1.333x-1.333=-x²-2x+3, x²+3.333x-4.333=0,
∴x₃=-4.333,(x=1,为点B坐标了)
∴y₃=1.333x-1.333=-5.7759-1.333=-7.1089,
MN=[(-4.333+1.667)²+(-7.1089+3.5551)²]=√19 .737=4.4426;
误差:4.4443-4.4426=0.0017
当x₄=-1.6668时,代入y=x²+2x-3得,y₄=-3.5554
BN=[(1+1.6668)²+(0+3.5554)²]=√19 .7525=4.4444,
直线l的方程按两点式得,(y-0)/(x-1)=(0+3.5554)/(1+1.6668)=1.3332
y =1.3332x-1.3332,与y=-x²-2x+3联立得,
1.3332x-1.3332=-x²-2x+3, x²+3.3332x-4.3332=0,
∴x₃=-4.3332,(x=1,为点B坐标了)
∴y₃=1.3332x-1.3332=-5.7771-1.3332=-7.1103,
MN=[(-4.3332+1.6668)²+(-7.1103+3.5554)²]=√19 .7467=4.4437;
误差:4.4444-4.4437=0.0007
当x₄=-1.6667时,代入y=x²+2x-3得,y₄=-3.5555
BN=[(1+1.6667)²+(0+3.5555)²]=√19 .7529=4.444,
直线l的方程按两点式得,(y-0)/(x-1)=(0+3.5555)/(1+1.6667)=1.3333
y =1.3333x-1.3333,与y=-x²-2x+3联立得,
1.3333x-1.3333=-x²-2x+3, x²+3.3333x-4.3333=0,
∴x₃=-4.3333,(x=1,为点B坐标了)
∴y₃=1.3333x-1.3333=-5.7776-1.3333=-7.1109,
MN=[(-4.3333+1.6667)²+(-7.1109+3.5555)²]=√19 .7515=4.444;
误差:4.444-4.443=0.000,
∴x₄=-1.6667,y₄=-3.5555,x₃=-4.3333,y₃=-7.1109,
直线l的方程为:y =1.3333x-1.3333。
(1)直线y=x+b过点C(0,3),∴b=3,
它与x轴交于点A(-3,0),
抛物线y=ax^2+2ax+c过A,C,
∴c=3,0=3a+3,a=-1.
∴抛物线的解析式是y=-x^2-2x+3,①它与x轴交于另一点B(1,0).
设P(p,-p^2-2p+3),-3<p<0,直线x=p交AC:y=x+3于D(p,p+3),
∴S△APC=(1/2)DP*(xC-xA)=(3/2)(-p^2-3p)=(-3/2)(p+3/2)^2+27/8,
∴△APC的面积的最大值=27/8.
(2)设l:y=k(x-1),②
代入①,x^2+(k+2)x-k-3=0,
x=1,或-k-3,
∴xM=-k-3,
将该抛物线在x轴上方的部分沿x轴翻折到x轴的下方,得到抛物线y=x^2+2x-3(-3<x<0),③
把②代入③,x^2+(2-k)x+k-3=0,
x=1或k-3,
∴xN=k-3,
△ABM的面积恰好被AN平分,
<==>MN=NB,<==>k-3-(-k-3)=0-(k-3),<==>2k=3-k,<==>k=1,
∴直线l的函数关系式是y=x-1.
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绛旓細濡傚浘1,宸茬煡鐩寸嚎y=x+3涓巟杞翠氦浜庣偣A,涓巠杞翠氦浜庣偣B,鎶涚墿绾縴=-x2+bx+c缁忚繃A銆丅涓ょ偣,涓巟杞翠氦浜庡彟涓涓偣C,瀵圭О杞翠笌鐩寸嚎AB浜や簬鐐笶,鎶涚墿绾块《鐐逛负D.(1)姹傛姏鐗╃嚎鐨勮В鏋愬紡;(2)鍦ㄧ涓... 濡傚浘1,宸茬煡鐩寸嚎y=x+3涓巟杞翠氦浜庣偣A,涓巠杞翠氦浜庣偣B,鎶涚墿绾縴=-x2+bx+c缁忚繃A銆丅涓ょ偣,涓巟杞翠氦浜庡彟涓涓偣C,...
绛旓細瑙o細锛1锛夆埖鐩寸嚎y=2x+4涓巟杞翠氦浜庣偣A锛屼笌y杞翠氦浜庣偣B锛鈭磞=0鏃锛寈=-2锛寈=0鏃讹紝y=4锛屾晠A锛-2锛0锛锛孊锛0锛4锛夛紝鐢辩洿绾緼B涓婃湁涓鐐筈鍦ㄧ涓璞¢檺涓斿埌y杞寸殑璺濈涓2锛庡緱鐐筈鐨勬í鍧愭爣涓2锛屾鏃秠=4+4=8锛屾墍浠ワ細Q锛2锛8锛夛紱锛2锛夌敱A锛-2锛0锛夊緱OA=2鐢盦锛2锛8锛夊彲寰椻柍APQ涓瑼P...
绛旓細鈭碅F=BD鈭碅C锛滲D鈶$偣D鍦ㄧ偣B涓婃柟鏃讹紝鍚岀悊鍙瘉锛欰C=BD缁间笂锛欰C=BD鈶舵柟娉曚竴鈶燗(锛4,0)锛孊(0锛4)锛孌(0锛2a+8)锛孧(a锛宎+4)锛屸柍BDE銆佲柍ABO鍧囦负绛夎叞鐩磋涓夎褰紝E鐨勭旱鍧愭爣涓篴+6锛屸埓ME= (y E 锛峺 M )= =2 AB=4 鈭碅B=2ME鈶M= ( y M 锛峺 A )锛 (...
绛旓細锛2锛夎嫢鈻矨OB琚垎鎴愮殑涓ら儴鍒嗛潰绉瘮涓1锛5锛屾湁涓ょ鎯呭喌銆備竴鏄綋宸﹁竟鐨勯儴鍒嗘槸1浠芥椂锛岄偅涔堣鐩寸嚎y=kx+b涓嶻杞寸殑浜ょ偣鏄疍锛0锛宐锛夛紝鍒欌柍COD鐨勯潰绉槸鈻矨OB闈㈢Н鐨1/6锛屼簬鏄細1/2*1*b=2*1/6锛宐=2/3銆俴=-2/3銆備簩鏄綋鍙宠竟鐨勯儴鍒嗘槸1浠芥椂锛岄偅涔堣鐩寸嚎y=-bx+b涓庣洿绾縴=-x+2鐨勪氦鐐逛负E銆
绛旓細5銆佽繃涓鐐规湁涓斿彧鏈変竴鏉$洿绾鍜屽凡鐭ョ洿绾鍨傜洿 6銆佺洿绾垮涓鐐逛笌鐩寸嚎涓婂悇鐐硅繛鎺ョ殑鎵鏈夌嚎娈典腑,鍨傜嚎娈垫渶鐭 7銆佸钩琛屽叕鐞 缁忚繃鐩寸嚎澶栦竴鐐,鏈変笖鍙湁涓鏉$洿绾夸笌杩欐潯鐩寸嚎骞宠 8銆佸鏋滀袱鏉$洿绾块兘鍜岀涓夋潯鐩寸嚎骞宠,杩欎袱鏉$洿绾夸篃浜掔浉骞宠 9銆佸悓浣嶈鐩哥瓑,涓ょ洿绾垮钩琛 10銆佸唴閿欒鐩哥瓑,涓ょ洿绾垮钩琛 11銆佸悓鏃佸唴瑙掍簰琛,涓ょ洿绾垮钩琛 ...
绛旓細瑙o細璁鐩寸嚎AB鐨勬柟绋嬩负y=kx+b,鎶婄偣A(6,0)鍜岀偣B(0,10)浠e叆鏂圭▼涓紝0=6x+b, 10=0+b 瑙e緱锛宬=-5/3锛宐=10 鎵浠ョ洿绾緼B鐨勬柟绋嬩负y=-5/3+10 (1)褰撯柍OPM鏄互OM涓哄簳杈圭殑绛夎叞涓夎褰㈡椂锛孭M=OP 鍥犱负PM^2=(x-0)^2+(y-4)^2锛孫P^2=x^2+y^2锛屼唬鍏ヤ笂闈㈠叧绯诲紡涓紝涓よ竟骞虫柟锛...
