1.(4分)\(\dfrac{6×30^{2024}+30^{2025}}{30^{2024}-10×30^{2023}} =\)____.
【答案】\(54\)
【解答】原式\(=\dfrac{30^{2023} (6×30+900)}{30^{2023} (30-10)} =\dfrac{180+900}{20} =9+45=54\).
【小结】考核幂的化简;提取公约数.
2.(4分) 方程\(\dfrac{9}{x+\sqrt{32-x^2} } +\dfrac{9}{x-\sqrt{32-x^2} } =x\)的正解为____.
【答案】\(5\)
【解答】\(\dfrac{9}{x+\sqrt{32-x^2} } +\dfrac{9}{x-\sqrt{32-x^2} } =x\)
\(⟹\dfrac{18x}{x^2-(32-x^2 )} =x⟹\dfrac{18}{2x^2-32} =1⟹x=5\).
【小结】考核根式方程;分母含根式想到分母有理化,或者直接通分.
3.(4分) 等腰\(△ABC\)的底边\(AC\)长为\(30\),腰上的高为\(24\),则\(△ABC\)的腰长为____.
【答案】\(25\)
【解答】当\(△ABC\)是锐角三角形,如下图,
\(∵AC=30\),\(AD=24\),\(∴CD=18\),
设\(AB=x\),则\(BD=x-18\),
\(∴x^2=24^2+(x-18)^2\),解得\(x=25\);
当\(△ABC\)是钝角三角形,如下图,
\(∵AC=30\),\(AD=24\),\(∴CD=18\),
设\(AB=x\),则\(BD=18-x\),
\(∴x^2=24^2+(18-x)^2\),解得\(x=25\);该情况不存在.
综上\(△ABC\)的腰长为\(25\).
【小结】考核三角形;注意分类讨论.
4.(4分) 已知实数\(m,n\)满足\(20m^2+24m+1=0\),\(n^2+24n+20=0\)且\(mn≠1\),则\(\left|\dfrac{60n}{1+mn} \right|=\)____.
【答案】\(50\)
【解答】由\(n^2+24n+20=0\),两边同除以\(n^2\)得\(20⋅\dfrac{1}{n^2} +24⋅\dfrac{1}{n} +1=0\),
\(∵mn≠1\),\(∴\dfrac{1}{n}≠m\),
\(∴\dfrac{1}{n}\)与\(m\)为方程\(20x^2+24x+1=0\)的两根,
\(∴m+\dfrac{1}{n} =-\dfrac{24}{20} =-\dfrac{6}{5} ⟹\dfrac{mn+1}{n} =-\dfrac{6}{5}\),
\(∴\left|\dfrac{60n}{1+mn} \right|=\left|60×(-\dfrac{5}{6} )\right|=50\).
【小结】考核方程组;
若互不相等的\(m,n\)都满足\(ax^2+bx+c=0\),则\(m,n\)为方程\(ax^2+bx+c=0\)的两根;
进而想到韦达定理.
5.(4分) 若\(x\)为全体实数,则函数\(y=x^2-2|x|+3\)与\(y=2x^2-4x+3\)的交点有____个.
【答案】\(2\)
【解答】****方法1
\(y=x^2-2|x|+3=\left\{
\begin{array}{c}
x^2-2x+3,x>0\\
x^2+2x+3,x<0
\end{array}
\right.
\),
画出两个函数的图象如下图,
所以交点有\(2\)个;
方法2 由\(\left\{
\begin{array}{c}
y=x^2-2|x|+3\\
y=2x^2-4x+3
\end{array}
\right.
\)得\(x^2-2|x|+3=2x^2-4x+3\)(※),
化简得\(x^2-4x+2|x|=0\),
当\(x≥0\)时,\(x^2-2x=0⟹x=0\),\(x=2\);
当\(x<0\)时,\(x^2-6x=0⟹x=0\),\(x=6\),均不符合\(x<0\);
所以方程(※)有两个解,所以交点有\(2\)个.
【小结】考核二次函数;遇到含绝对值,想到利用\(|x|=\left\{
\begin{array}{c}
x,x≥0\\
-x,x<0
\end{array}
\right.
\)去掉绝对值符号.
两函数的交点问题可转化为求解方程组.
6.(4分) 若\(abc≠0\),\(\dfrac{a}{b+c} +\dfrac{b}{c+a} +\dfrac{c}{a+b} =1\),则\(\dfrac{a^2}{b+c} +\dfrac{b^2}{c+a} +\dfrac{c^2}{a+b} =\)____.
【答案】\(0\)
【解答】由\(\dfrac{a}{b+c} +\dfrac{b}{c+a} +\dfrac{c}{a+b} =1\),
两边乘\(a+b+c\)得\(\dfrac{a^2+a(b+c)}{b+c} +\dfrac{b^2+b(c+a)}{c+a} +\dfrac{c^2+c(a+b)}{a+b} =a+b+c\),
所以\(\dfrac{a^2}{b+c} +\dfrac{b^2}{c+a} +\dfrac{c^2}{a+b} +a+b+c= a+b+c\)
\(⟹\dfrac{a^2}{b+c} +\dfrac{b^2}{c+a} +\dfrac{c^2}{a+b} =0\).
【小结】考核代数式;注意已知等式与所求式子之间的联系.
7.(4分)\(K\)为\(△ABC\)内一点,过点\(K\)作三边的垂线\(KM\),\(KN\),\(KP\),若\(AM=3\),\(BM=5\),\(BN=4\),\(CN=2\),则\(AP^2=\)____.
【答案】\(12\)
【解答】连接\(KA\),\(KB\),\(KC\),
由\(KA^2-9=KB^2-25=MK^2\)得\(KA^2-KB^2=-16\),
由\(KB^2-16=KC^2-4=NK^2\)得\(KB^2-KC^2=12\),
由\(KA^2-PA^2=KC^2-16=PK^2\)得\(KC^2-KA^2=16-PA^2\),
以上三等式相加得\(0=12-PA^2\),
\(∴PA^2=12\).
【小结】考核三角形和勾股定理;遇到两个含公共边的直角三角形,可以针对公共边用两次勾股定理.
8.(4分) 已知\(a,b,c\)、令\(a,b,c\)的最小值为\(\min\{a,b,c\}\),已知\(f(x)=\min\{4x+1,x+2,-2x+4\}\),若\(f(x)\)的最大值为\(M\),则\(6M=\)____.
【答案】\(16\)
【解答】利用数形结合的方法求解,先画出三个一次函数图象\(y=4x+1\)、\(y=x+2\)、\(y=-2x+4\),如图\(1\);根据题意,\(a,b,c\)的最小值为\(\min \{a,b,c\}\),则\(y=f(x)\)图象为三条直线中最低的部分组成,如图\(2\)红色部分,即\(M=y_A\);
由\(\left\{
\begin{array}{c}
y=x+2\\
y=-2x+4
\end{array}
\right.
\)解得\(\left\{
\begin{array}{c}
x=\dfrac{2}{3}\\
y=\dfrac{8}{3}
\end{array}
\right.
\),所以\(M=\dfrac{8}{3}\),\(6M=16\).
【小结】考核新定义;新定义理解定义是关键.
9.(4分) 已知正方形\(OBAC\),以\(OB\)为半径作圆,过\(A\)的直线交\(⊙O\)于\(M\),\(Q\),交\(BC\)于\(P\),\(R\)为\(PQ\)中点,若\(AP=18\),\(PR=7\),则\(BC=\)____.
【答案】\(\dfrac{96\sqrt{46} }{23}\)
【解答】过点\(O\)作\(OH⊥BC\)交\(BC\)于点\(H\),
依题意得\(PQ=14\),\(AQ=32\),
设正方形边长为\(a\),\(AM=x\),则\(BC=\sqrt{2} a\),\(PM=18-x\),
由圆的切割线定理可得\(AB^2=AM\cdot AQ⟹a^2=32x\),
相交弦定理可得\(PM\cdot PQ=CP\cdot BP=(BH+PH)(OH-PH)=BH^2-PH^2\),
易得\(∆APC≅∆OPC\),所以\(OP=AP=18\),
所以\(PH^2=OP^2-OH^2=18^2-\left(\dfrac{\sqrt{2}a}{2}\right)^2=18^2-\dfrac{a^2}{2}\),
所以\(14(18-x)=\left(\dfrac{\sqrt{2} a}{2} \right)^2-\left(18^2-\dfrac{a^2}{2} \right)⟹14(18-x)=a^2-18^2=32x-18^2\),
解得\(x=\dfrac{288}{23}\),
所以\(BC=\sqrt{2} a=\sqrt{2} \cdot \sqrt{32x} =8\sqrt{x} =\dfrac{96\sqrt{46} }{23}\).
【小结】考核平行四边形与圆;
相交弦定理\(AP\cdot BP=CP\cdot DP\);切割线定理\(AB^2=AC\cdot AD\);割线定理\(AB\cdot AC=AD\cdot AE\).
10.(4分) 若\(a,b,c,d,e\)为两两不同的整数,则\((a-b)^2+(b-c)^2+(c-d)^2+(d-e)^2+(e-a)^2\)的最小值为____ .
【答案】\(14\)
【解答】设\(x_1=a-b,x_2=b-c,x_3=c-d,x_4=d-e,x_5=e-a\),
则问题转化为均不为\(0\)的\(x_1,x_2,x_3,x_4,x_5\)满足\(x_1+x_2+x_3+x_4+x_5=0\),
求\(x_1^2+x_2^2+x_3^2+x_4^2+x_5^2\)的最小值.
从\(5\)个数的奇偶数出发,求最小值则\(5\)个数中奇数取\(1\),偶数取\(2\);
\(5\)个数不可能全是奇数或\(3\)奇\(2\)偶,则有如下\(3\)种情况:
① 若是\(2\)奇\(3\)偶,
则\(x_1^2+x_2^2+x_3^2+x_4^2+x_5^2=1^2+1^2+2^2+2^2+2^2=14\),
比如\(a=2,b=4,c=3,d=1,e=0\);
② 若是\(4\)奇\(1\)偶,
可能\(x_1^2+x_2^2+x_3^2+x_4^2+x_5^2=1^2+1^2+1^2+1^2+2^2=8\),但\(4\)个奇数都是\(1\),说明\(5\)个数是相邻的,第五个差是\(4\)不可能是\(2\);
或可能\(x_1^2+x_2^2+x_3^2+x_4^2+x_5^2=1^2+1^2+1^2+3^2+2^2=16\),但它比\(14\)大;
③ 若全是偶数,则最小值为\(2^2+2^2+2^2+2^2+2^2=20\),但它比\(14\)大;
综上所述,所求最小值为\(14\).
【小结】考核代数;本题可翻译为“\(5\)个互不相等的数,使得它们每两两差平方和最小”,那数字当然尽量接近,比如\(5\)个数是\(0、1、2、3、4\),接着是如何排序的问题了,比如
| \(a\) | \(b\) | \(c\) | \(d\) | \(e\) |
|---|---|---|---|---|
| 0 | 1 | 2 | 3 | 4 |
| 0 | 2 | 3 | 4 | 1 |
| 2 | 3 | 1 | 4 | 0 |
| …… |
每个两两数之间相差\(1、2、3、4\),要求最小值还是有些复杂;
注意到\(a-b、b-c、c-d、d-e、e-a\)的和为\(0\),用换元法,简化问题;对\(x_1+x_2+x_3+x_4+x_5=0\)中五个数进行奇偶数分析.
11.(6分)\(PA\),\(PB\)分别为\(⊙O_1\)和\(⊙O_2\)的切线,连接\(AB\)交\(⊙O_1\)于\(C\)交\(⊙O_2\)于\(D\),且\(AC=BD\),已和\(⊙O_1\)和\(⊙O_2\)的半径分别为\(20\)和\(24\),则\(180\left(\dfrac{PA}{PB} \right)^2=\)____.
【答案】\(125\)
【解答】过点\(O_1\)作\(O_1 M⊥AB\),过点\(O_2\)作\(O_2 N⊥AB\),过点\(P\)作\(PH⊥AB\),如下图,
由于\(PA\),\(PB\)分别为\(⊙O_1\)和\(⊙O_2\)的切线,
易得\(∆APH\sim ∆O_1 AM\),\(∆BPH\sim ∆O_2 BN\),
所以\(\dfrac{PA}{O_1 A} =\dfrac{PH}{AM} ⇒\dfrac{PA}{20} =\dfrac{PH}{AM}\),\(\dfrac{PB}{O_2 B} =\dfrac{PH}{BN} ⇒\dfrac{PB}{24} =\dfrac{PH}{BN}\),
因为\(AC=BD\),由垂径定理可得\(AM=BN\),
所以\(\dfrac{PA}{20} =\dfrac{PB}{24} ⇒\dfrac{PA}{PB} =\dfrac{20}{24} =\dfrac{5}{6}\),所以\(180\left(\dfrac{PA}{PB} \right)^2=180×\left(\dfrac{5}{6}\right )^2=125\).
【小结】考核圆;三垂直模型,易想到相似求解.
12.(6分) 已知\(a,b,c\)正整数,且只要\(\dfrac{1}{a} +\dfrac{1}{b} +\dfrac{1}{c} <1\)则\(\dfrac{1}{a} +\dfrac{1}{b} +\dfrac{1}{c} ≤m\),得\(m\)的最小值为\(\dfrac{r}{s}\)(\(\dfrac{r}{s}\)为最简分数),则\(r+s=\)____.
【答案】\(83\)
【解答】理解题意:求\(m\)最小值,即找\(a,b,c\)使得\(\dfrac{1}{a} +\dfrac{1}{b} +\dfrac{1}{c}\)最接近\(1\),尽量使得\(a,b,c\)的值小些;
\(a,b,c\)不可能有\(2\)个\(2\),从取\(1\)个\(2\)开始列举,
令\(a=2,b=3,c=6\),得\(\dfrac{1}{a} +\dfrac{1}{b} +\dfrac{1}{c} =1\)不符合题意;
令\(a=2,b=3,c=7\)得\(\dfrac{1}{a} +\dfrac{1}{b} +\dfrac{1}{c} =\dfrac{41}{42}\),此时不会再取\(c\)比\(7\)的数,要不最后\(\dfrac{1}{a} +\dfrac{1}{b} +\dfrac{1}{c}\)一定比\(\dfrac{41}{42}\)要小;
令\(a=2,b=4,c=5\)得\(\dfrac{1}{a} +\dfrac{1}{b} +\dfrac{1}{c} =\dfrac{19}{20} <1\),\(b,c\)的值不能再取大了;
令\(a=3,b=3,c=4\)得\(\dfrac{1}{a} +\dfrac{1}{b} +\dfrac{1}{c} =\dfrac{11}{12} <1\),\(b,c\)的值不能再取大了;
此时\(a,b,c\)不能再取大了,否则\(\dfrac{1}{a} +\dfrac{1}{b} +\dfrac{1}{c}\)的值均会比以上\(3\)个数离\(1\)更远;
由于\(\dfrac{41}{42} >\dfrac{19}{20} >\dfrac{11}{12}\),所以最接近\(1\)的是\(\dfrac{r}{s} =\dfrac{41}{42}\),即\(r+s=83\).
【小结】考核代数;要懂得把题意用自己通俗语言翻译出来.
- (6分) 对于任意实数\(x,y\)定义运算符号\(*\),且\(xy\)有唯一解,满足\((a*b)+c=(a*c)+(b*c)\),\(0*(a+b)=(0*a)+(0*b)\),则\(20*24=\)___.
【答案】\(22\)
【解答】在\(0*(a+b)=(0*a)+(0*b)\)中,令\(a=b=0\)得\(0*0=(0*0)+(0*0)\),
所以\(0*0=0\),
在\((a*b)+c=(a*c)+(b*c)\),令\(a=c=0\)得\(0*b=(0*0)+(b*0)=b*0\),
在\((a*b)+c=(a*c)+(b*c)\),令\(a=b=0\)得\(0*0+c=(0*c)+(0*c)\),
所以\((0*c)=\dfrac{c}{2}\),
在\((a*b)+c=(a*c)+(b*c)\)中,令\(c=0\)得\(a*b=(a*0)+(b*0)\),
所以\(20*24=(20*0)+(24*0)=(0*20)+(0*24)=0*44=\dfrac{44}{2} =22\),
【小结】考核新定义;本质是群的概念,要求出单位元:00,明确运算是否符合交换律:0b=(b0)=b0等.
14.(6分) 已知正整数\(A,B,C\)且\(A>B>C\),满足\(\overline{ABC}^2+\overline{BCA}^2+\overline{CAB}^2=879897\),则\(\overline{ABC}=\)___.
【答案】\(832\)
【解答】
方法1 \(\overline{ABC}^2+\overline{BCA}^2+\overline{CAB}^2\)
\(=(100A+10B+C)^2+(100B+10C+A)^2+(100C+10A+B)^2\)
\(=10000(A^2+B^2+C^2 )+100(A^2+B^2+C^2 )+A^2+B^2+C^2+2000(A\cdot B+A\cdot C+B\cdot C)\)
\(+200(A\cdot B+A\cdot C+B\cdot C)+20(A\cdot B+A\cdot C+B\cdot C)\)
\(=10101(A^2+B^2+C^2 )+2220(A\cdot B+A\cdot C+B\cdot C)=879897\),
所以\(91(A^2+B^2+C^2 )+20(A\cdot B+A\cdot C+B\cdot C)=7927\),
\(7927\)个位数为\(7\),则\(A^2+B^2+C^2\)的个位数为\(7\),\(A^2+B^2+C^2\)的可能值为\(87,77,67\)等,
而\(A\cdot B+A\cdot C+B\cdot C\)的最大值为\(9×8+9×7+8×7=191\);
①\(91×87=7917\),则\(A\cdot B+A\cdot C+B\cdot C= \dfrac{1}{2}\)不可能;
②\(91×67=6097\),则\(A\cdot B+A\cdot C+B\cdot C=91.5\)不可能;
③\(91×57=5187\),则\(A\cdot B+A\cdot C+B\cdot C=137\);
由\(\left\{
\begin{array}{c}
A^2+B^2+C^2=57\\
A\cdot B+A\cdot C+B\cdot C=137
\end{array}
\right.
\)
得\((A+B+C)^2=A^2+B^2+C^2+2A\cdot B+2A\cdot C+2B\cdot C=352\),不可能;
④\(91×47=4277\),则\(A\cdot B+A\cdot C+B\cdot C=182.5\)不可能;
⑤\(91×77=7007\),则\(A\cdot B+A\cdot C+B\cdot C=46\);
由\(\left\{
\begin{array}{c}
A^2+B^2+C^2=77\\
A\cdot B+A\cdot C+B\cdot C=46
\end{array}
\right.
\)得\(A+B+C=13\),
由正整数\(A,B,C\)且\(A>B>C\),
列举尝试可得\(A=8,B=3,C=2\),即\(\overline{ABC}=832\).
方法2\(1^2=1,2^2=4,3^2=9,4^2=16,5^2=25,6^2=36,7^2=49,8^2=64,9^2=81\),
\(879897\)个位数为\(7\),即在\(1,4,5,6,9\)中选出\(3\)个数(可重复)使得和个位数是\(7\),即\(27\)或\(17\)或\(7\),有以下几种情况:
①若和为\(7\),只有\(1+1+5=7\),此时\(A,B,C\)分别为\(9,5,1\);
②若和为\(17\),可能是\(5+6+6=17\),此时\(A,B,C\)分别为\(6,5,4\);
可能是\(4+9+4=17\),此时\(A,B,C\)分别为\(8,3,2\)或\(8,7,2\);
③若和为\(27\),只有\(9+9+9=27\),此时\(A,B,C\)没有符合的情况;
接着检验,
①当\(A=9,B=5,C=1\),而\(\overline{ABC}^2=9512>950^2=90250>879897\),舍去;
②当\(A=6,B=5,C=4\),而\(\overline{ABC}^2+\overline{BCA}^2+\overline{CAB}^2=6542+5462+4562=942057\),舍去;
③当\(A=8,B=7,C=2\),而\(\overline{ABC}^2+\overline{BCA}^2=8722+7822>8002+7002=1130000>879897\),故舍去;
④当\(A=8,B=3,C=2\),而\(\overline{ABC}^2+\overline{BCA}^2+\overline{CAB}^2=879897\);
综上,\(\overline{ABC}=832\).
【小结】考核代数;从奇偶数或尾数的角度思考是常见的方法,出现多种情况要穷举时,尽量缩小范围.
15.(6分) 等腰三角形边长为整数,其的面积为周长的\(12\)倍,则所有可能的等腰三角形的腰长之和为___.
【答案】\(560\)
【解答】设等腰三角形\(ABC\)的腰\(AB=AC=x\),底\(BC=t\),
过点\(A\)作\(AD⊥BC\)交\(BC\)于\(D\),则\(CD= \dfrac{t}{2}\),
则\(S_{∆ABC}= \dfrac{1}{2} ×t×\sqrt{x^2- \dfrac{t^2}{4}} = \dfrac{1}{4} t\sqrt{4x^2-t^2}\),
若\(t\)是奇数,则\(\sqrt{4x^2-y^2}\)是奇数,\(S_{∆ABC}\)是个分数,不可能是周长的\(12\)倍,
故\(t\)是偶数;
底\(BC=2y\),则\(CD=y\)(\(y\)是整数),
依题意可得\(12(2x+2y)= \dfrac{1}{2} ×2y×\sqrt{x^2-y^2}\)
\(⇒24(x+y)=y\sqrt{x^2-y^2}\)
\(⇒24^2 (x+y)^2=y^2 (x^2-y^2)\)
\(⇒24^2 (x+y)=y^2 (x-y)\)
\(⇒ \dfrac{24^2}{y^2} = \dfrac{x-y}{x+y} =1- \dfrac{2y}{x+y} =1- \dfrac{2}{ \dfrac{x}{y} +1}\)
\(⇒ \dfrac{2}{\dfrac{x}{y} +1} =1- \dfrac{24^2}{y^2} = \dfrac{y^2-24^2}{y^2}\)
\(⇒ \dfrac{x}{y} +1= \dfrac{2y^2}{y^2-24^2}\)
\(⇒ \dfrac{x}{y} = \dfrac{2y^2}{y^2-24^2} -1=1+ \dfrac{2×24^2}{y^2-24^2}\)
\(⇒x=y+ \dfrac{2×24^2y}{y^2-24^2} =y+576× \dfrac{2y}{y^2-24^2}\)\(=y+576×\left( \dfrac{1}{y+24} + \dfrac{1}{y-24} \right)\)
因为\(x,y\)为整数,所以\(y+24\)与\(y-24\)均是\(576\)的因数,它们还相差\(48\),
而\(576\)的因数有\(1,576,2,288,3,192,4,144,6,96,8,72,\)\(9,64,12,48,
16,36,18,32, 24\);
所以\(\left\{
\begin{array}{c}
y-24=16\\
y+24=64
\end{array}
\right.
\),\(\left\{
\begin{array}{c}
y-24=24\\
y+24=72
\end{array}
\right.
\),\(\left\{
\begin{array}{c}
y-24=48\\
y+24=96
\end{array}
\right.
\),\(\left\{
\begin{array}{c}
y-24=96\\
y+24=144
\end{array}
\right.
\),\(\left\{
\begin{array}{c}
y-24=144\\
y+24=192
\end{array}
\right.
\),
所以\(y=40\)或\(48\)或\(72\)或\(120\)或\(168\),
对应的\(x=85\)或\(80\)或\(90\)或\(130\)或\(175\),
则所求的值为\(85+80+90+130+175=560\).
【小结】考核综合分析;本题用到了裂项\(\dfrac{2y}{y^2-24^2 } = \dfrac{1}{y+24} + \dfrac{1}{y-24}\),从奇偶数的角度缩小讨论范围.
