> 【答案带解析】若M=3x2-8xy+9y2-4x+6y+13(x,y是实数),则M的值一定是(...
若M=3x2-8xy+9y2-4x+6y+13(x,y是实数),则M的值一定是( )A.零B.负数C.正数D.整数
本题可将M进行适当变形,将M的表达式转换为几个完全平方式的和,然后根据非负数的性质来得出M的取值范围.
M=3x2-8xy+9y2-4x+6y+13,
=(x2-4x+4)+(y2+6y+9)+2(x2-4xy+4y2),
=(x-2)2+(y+3)2+2(x-2y)2>0.
考点分析:
考点1:非负数的性质:偶次方
常用的非负数的性质有:
(1)有限个非负数之和,仍为非负数;
(2)若有限个非负数之和等于零,则每一个非负数必为零。
&&&& 解多个元只有一个方程而有求值问题的重要而基本的方法,就是应用非负数的性质,或通过配方变形,应用非负数的性质,列方程组求解。
考点2:完全平方公式
(1)完全平方公式:(a±b)2=a2±2ab+b2.可巧记为:“首平方,末平方,首末两倍中间放”.(2)完全平方公式有以下几个特征:①左边是两个数的和的平方;②右边是一个三项式,其中首末两项分别是两项的平方,都为正,中间一项是两项积的2倍;其符号与左边的运算符号相同.(3)应用完全平方公式时,要注意:①公式中的a,b可是单项式,也可以是多项式;②对形如两数和(或差)的平方的计算,都可以用这个公式;③对于三项的可以把其中的两项看做一项后,也可以用完全平方公式.
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如果记,并且f(1)表示x=1时y的值,即,表示时y的值,即,那么=&&& (结果用含n的代数式表示,n为正整数.)
如图,正方形ABCD的边AB=1,和都是以1为半径的圆弧,则无阴影部分的两部分的面积之差是&&& .
如图,梯形ABCD的对角线交于O,过O作两底的平行线分别交两腰于M、N.若AB=18,CD=6,则MN的长为&&& .
如图,△ABC中,AB=2AC,AD平分BC且AD⊥AC,则∠BAC=&&& .
设m2+m-1=0,则m3+2m2+2010=&&& .
题型:选择题
难度:中等
Copyright @
满分5 学习网 . All Rights Reserved.有选择,A是正数,负数,零,或整数.四个选择
正规解法:
由于整个式子中所有项的字母和系数都是整数,没有开方或除法运算
所以计算结果必为整数
3x^2-8xy+9y^2-4x+6y+13
=[(2x)^2-8xy+(2y)^2]-x^2-4x+5y^2+6y+13
=(2x-2y)^2-(x^2+4x+4)+4+5[y^2+(6/5)y+9/25]-9/25+13
=(2x-2y)^2-(x+2)^2+5(y+5/3)^2+(13+4-9/25)
由于 (2x-2y)^2-(x+2)^2+5(y+5/3)^2 大于或等于0;(13+4-9/25)大于0
所以 (2x-2y)^2-(x+2)^2+5(y+5/3)^2+(13+4-9/25)大于0,是正数
综上所述,A是正整数
其他答案(共3个回答)
3x^2-8xy+9y^2-4x+6y+13=(x^2-4x+4)+(y^2+6y+9)+(2x^2-8xy+8y^2)=(x-2)^2+(y+3)^2+2(x-2y)^2>=0.Yinwei x y yiji suoyou xishu doushi "integer", bingqie pingfanghe yiding shi "pos相关信息计算机体系结构的技术革新有什么接收器的采样是怎样的?如何理解雷达原理呢?面向对象化语言有什么作用如何进行液晶面板的鉴别早期的小型机如何恢复程序红旗Linux版本有什么优点SVG格式是什么意思?VisualBasic5.0的IDE有什...如何找回丢掉的系统栏图标开机显蓝屏系统双通道电脑互联网默认网关+扫描仪操作itive number", yushi yuanshi shi zhengzhengshu "positive intiger".yinci,A shizhengzhengshu.Hen baoqian! Diannao chu le maobingbu nenggou da chu hanzi, zhihao pinyin & english
hunzhe shiyong.
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var lowerColor = &97b0d9&;
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.noise001 span {
background-image: 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&);
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&);
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
