2024年成考高起点《数学(文史)》每日一练试题05月12日
聚题库
05/12
<p class="introTit">单选题</p><p>1、设<img src="https://img2.meite.com/questions/202303/296423e8404792c.png" />成等比数列,则x等于
</p><ul><li>A:0或-2</li><li>B:1或-1</li><li>C:0或-2</li><li>D:-2</li></ul><p>答 案:C</p><p>解 析:由已知条件的得<img src="https://img2.meite.com/questions/202303/296423e8f3e39ea.png" /><img src="https://img2.meite.com/questions/202303/296423e8f926be1.png" /></p><p>2、在等比数列{an}中,a2=1,公比q=2,则a5=()。</p><ul><li>A:<img src='https://img2.meite.com/questions/202404/206623804f54544.png' /></li><li>B:<img src='https://img2.meite.com/questions/202404/20662380549e27b.png' /></li><li>C:4</li><li>D:8</li></ul><p>答 案:D</p><p>解 析:本题主要考查的知识点为等比数列。<img src="https://img2.meite.com/questions/202404/206623805b484fe.png" /></p><p>3、设α是第一象限角<img src="https://img2.meite.com/questions/202404/206623807aa6ab5.png" />,则sin2α=()。</p><ul><li>A:<img src='https://img2.meite.com/questions/202404/206623808d49729.png' /></li><li>B:<img src='https://img2.meite.com/questions/202404/206623809425f6a.png' /></li><li>C:<img src='https://img2.meite.com/questions/202404/206623809941d59.png' /></li><li>D:<img src='https://img2.meite.com/questions/202404/206623809ec41ee.png' /></li></ul><p>答 案:C</p><p>解 析:本题主要考查的知识点为三角函数的二倍角公式。 α在第一象限,则<img src="https://img2.meite.com/questions/202404/20662380a76bfd2.png" /></p><p>4、已知点M(1,2),N(2,3),则直线MN的斜率为()。</p><ul><li>A:<img src='https://img2.meite.com/questions/202404/2066237fb036c25.png' /></li><li>B:1</li><li>C:-1</li><li>D:<img src='https://img2.meite.com/questions/202404/2066237fb68f8ce.png' /></li></ul><p>答 案:B</p><p>解 析:本题主要考查的知识点为直线的斜率。 直线MN的斜率为<img src="https://img2.meite.com/questions/202404/2066237fbc46e3f.png" /></p><p class="introTit">主观题</p><p>1、设椭圆的中心是坐标原点,长轴在x轴上,离心率<img src="https://img2.meite.com/questions/202303/2964239c71aeb01.png" />已知点P<img src="https://img2.meite.com/questions/202303/2964239c7e7d039.png" />到圆上的点的最远距离是<img src="https://img2.meite.com/questions/202303/2964239c8cba609.png" />求椭圆的方程
</p><p>答 案:由题意,设椭圆方程为<img src="https://img2.meite.com/questions/202303/2964239cdfdcc2f.png" /> 由<img src="https://img2.meite.com/questions/202303/2964239cef23e00.png" /><img src="https://img2.meite.com/questions/202303/2964239cf5cc660.png" />
设P<img src="https://img2.meite.com/questions/202303/2964239d01ba1aa.png" />点到椭圆上任一点的距离为 d,
<img src="https://img2.meite.com/questions/202303/2964239d0dd8af6.png" />
<img src="https://img2.meite.com/questions/202303/2964239d1e44fb3.png" />则在y=-b时,<img src="https://img2.meite.com/questions/202303/2964239d2c1a969.png" />最大,即d也最大。
<img src="https://img2.meite.com/questions/202303/2964239d43183b3.png" /><img src="https://img2.meite.com/questions/202303/2964239d48e58c6.png" />
<img src="https://img2.meite.com/questions/202303/2964239d5187168.png" />
</p><p>2、设函数<img src="https://img2.meite.com/questions/202303/1564111c65679ad.png" /><br />(I)求f'(2);<br />(II)求f(x)在区间[一1,2]的最大值与最小值.</p><p>答 案:(I)因为<img src="https://img2.meite.com/questions/202303/1564111dd4eb139.png" />,所以f'(2)=3×2<sup>2</sup>-4=8.(II)因为x<-1,f(-1)=3.<img src="https://img2.meite.com/questions/202303/1564111ea39de57.png" />f(2)=0.<br />所以f(x)在区间[一1,2]的最大值为3,最小值为<img src="https://img2.meite.com/questions/202303/1564111eb99e49a.png" /></p><p>3、如图:已知在△ADC中,∠C=90°,∠D=30°,∠ABC=45°,BD=20,求AC(用小数表示,保留一位小数)
<img src="https://img2.meite.com/questions/202303/296423e7b58f8d3.png" />
</p><p>答 案:如图 <img src="https://img2.meite.com/questions/202303/296423e7cbcb7ab.png" />
<img src="https://img2.meite.com/questions/202303/296423e7dd72c9c.png" />
</p><p>4、设函数f(x)<img src="https://img2.meite.com/questions/202303/296423a66bbdb95.png" />且f'(-1)=-36
(Ⅰ)求m
(Ⅱ)求f(x)的单调区间</p><p>答 案:(Ⅰ)由已知得f'=<img src="https://img2.meite.com/questions/202303/296423a74f41b7f.png" /> 又由f'(-1)=-36得
6-6m-36=-36
故m=1.
(Ⅱ)由(Ⅰ)得f'(x)=<img src="https://img2.meite.com/questions/202303/296423a792d1aff.png" />
令f'(x)=0,解得<img src="https://img2.meite.com/questions/202303/296423a7b14cf3f.png" />
当x<-3时,f'(x)>0;
当-3<x<2时,f'(x)<0;
当x>2时,f'(x)>0;
故f(x)的单调递减区间为(-3,2),f(x)的单调递增区间为(-∞,-3),(2,+∞)
</p><p class="introTit">填空题</p><p>1、函数y=-x²+ax图像的对称轴为x=2,则a=______。</p><p>答 案:4
</p><p>解 析:本题主要考查的知识点为二次函数的性质。 由题意,该函数图像的对称轴为<img src="https://img2.meite.com/questions/202404/20662381471af77.png" />得a=4。</p><p>2、曲线在点(1,1)处的切线方程是______。
</p><p>答 案:2x+y-3=0
</p><p>解 析:本题主要考查的知识点为切线方程。
由题意,该切线斜率<img src="https://img2.meite.com/questions/202404/206623813f54152.png" />,又过点(1,1),所以切线方程为y-1=-2(x-1),即2x+y-3=0。</p>
