推荐回答(5个)
1、首先将A、B两点坐标带入解析式,得到两个关于a、b、c的方程,消去a得到一个关于b、c的等式:c=2b+5。
函数与X轴有两个不同交点,即判别式:b的平方-4ac>0,将c=2b+5带入,得到一个关于b的二次不等式:b的平方-8ab+20a>0。这个不等式的几何意义就是二次函数y=b的平方-8ab+20a在x轴的上方,即判别式<0,即(8a)的平方-4·20a<0,结合题目中说的a为正整数,化简得到0<a<5/4.所以a=1。
将a带入最先有两点坐标得到的两个关于a、b、c的方程,解方程组得到c=1,b=-2。
因此b+c=-1。
2、令y=0,得到X²-2004x+2005=0,由韦达定理可得方程的两根之和为2004.两根之积为2005.方程的跟与函数与X轴的交点是对应的,所以m+n=2004;mn=2005.
(m的平方-2005m+2005)(n的平方-2005n+2005)注意到括号内的形式,可以化简为(m的平方-2004m+2005-m)(n的平方-2004n+2005-n)。由于点(m,0)(n,0)为函数与X轴的交点,所以
m的平方-2004m+2005=n的平方-2004n+2005=0.所以原式=(-m) ·(-n)=mn=2005.
3、此题我是通过图像的拉伸和平移来做的。令y=aX²+bx+c,通过a>0,c<0可以画出函数的图像,将原函数位于x轴下部的图像作关于x轴对称得到y=|aX²+bx+c|的图像,进行图像的伸缩得到 y=-2|aX²+bx+c|的图像,再将图像向下移动一个单位得到y=-2|aX²+bx+c|-1。通过图像可以直观看出,其最大值为-1,且满足条件的点有2个。
4、由于喷水器的喷射半径是一定的,要覆盖整个花坛,花坛最小面积的情况就是两喷射器重合的时候,花坛为喷射范围,也就是半径为10的圆的内接矩形。当两个圆逐渐分离,直到两圆的交点连线的长度=矩形花坛的宽度时,此时喷射器覆盖的面积达到最大。分析到这一步,接下来就可以根据矩形和圆的数量关系得到,两圆圆心与两圆的两个交点所围成的图形为边长为10的正方形。计算得到:当矩形花坛的:宽为10倍的根号2,长为20倍的根号2时,矩形花坛的面积达到最大。 此时两喷水器之间的距离为10倍的根号2.
当然此题也可以通过设两圆相交后,两交点之间的距离为x,最终表达出矩形的面积,再根据二次函数的最值问题来进行求解,这样是比较严谨的做法。
5、X=0 直接对角线相乘,最后得到16X3=0,X=0
1.a在哪?
2.=mn=2005
3.|aX²+bx+c|能取到最小值为0,所以函数最大值为-1
4.当两个喷水器之间的距离为(10根号2)cm时,
矩形的长(20根号2)cm,宽为(10根号2)cm,此时面积最大
5.对角线相乘,化简得x=0
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