2024年成考高起点《数学(理)》每日一练试题04月26日
聚题库
04/26
<p class="introTit">单选题</p><p>1、在△ABC中,若b=<img src="https://img2.meite.com/questions/202303/2864228792c7c59.png" />,c=<img src="https://img2.meite.com/questions/202303/286422879bef613.png" /><img src="https://img2.meite.com/questions/202303/28642287a3c143e.png" />则a等于()</p><ul><li>A:2</li><li>B:<img src='https://img2.meite.com/questions/202303/28642287b3e4835.png' /></li><li>C:<img src='https://img2.meite.com/questions/202303/28642287b8ca84c.png' /></li><li>D:无解</li></ul><p>答 案:B</p><p>解 析:此题是已知两边和其中一边的对角,解三角形时,会出现一解、两解、无解的情况,要注意这一点.用余弦定理<img src="https://img2.meite.com/questions/202303/286422888d98016.png" />可得<img src="https://img2.meite.com/questions/202303/28642288b870fd3.png" /><img src="https://img2.meite.com/questions/202303/28642288bcdcd26.png" /><img src="https://img2.meite.com/questions/202303/28642288cb0279a.png" /><img src="https://img2.meite.com/questions/202303/28642288d358a96.png" /><img src="https://img2.meite.com/questions/202303/28642288e0d440f.png" />解出<img src="https://img2.meite.com/questions/202303/28642288f8ec133.png" /><img src="https://img2.meite.com/questions/202303/286422890103ec2.png" /><img src="https://img2.meite.com/questions/202303/286422890874181.png" /><img src="https://img2.meite.com/questions/202303/2864228911473af.png" /></p><p>2、5名高中毕业生报考3所院校,每人只能报一所院校,则有()种不同的报名方法
</p><ul><li>A:<img src='https://img2.meite.com/questions/202303/28642253cbeb828.png' /></li><li>B:<img src='https://img2.meite.com/questions/202303/28642253cf87ee2.png' /></li><li>C:<img src='https://img2.meite.com/questions/202303/28642253d82d2a0.png' /></li><li>D:<img src='https://img2.meite.com/questions/202303/28642253d319585.png' /></li></ul><p>答 案:C</p><p>解 析:将院校看成元素,高中生看成位置,由重复排列的元素、位置的条件口诀: “元素可挑剩,位置不可缺”,重复排列的种数共有<img src="https://img2.meite.com/questions/202303/286422548fe3345.png" />种,即将元素的个数作为底数,位置的个数作为指数.即:元素(院校)的个数为 3,位置(高中生)的个数为5,共有<img src="https://img2.meite.com/questions/202303/28642254ad8b5e0.png" />种。
</p><p>3、(2-3i)<sup>2</sup>=()</p><ul><li>A:13-6i</li><li>B:13-12i</li><li>C:-5-6i</li><li>D:-5-12i</li></ul><p>答 案:D</p><p>解 析:<img src="https://img2.meite.com/questions/202303/15641169af99ac7.png" /></p><p>4、已知α∩β=a,b⊥β,b在α内的射影是b’,那么b'和α的关系是()</p><ul><li>A:b'//α</li><li>B:b'⊥α</li><li>C:b'与α是异面直线</li><li>D:b'与α相交成锐角</li></ul><p>答 案:B</p><p>解 析:<img src="https://img2.meite.com/questions/202303/28642296837771f.png" /> ∴由三垂线定理的逆定理知,b在α内的射影b'⊥α,故选B
</p><p class="introTit">主观题</p><p>1、设函数f(x)=<img src="https://img2.meite.com/questions/202303/28642286431b211.png" />
(Ⅰ)求f(x)的单调区间;
(Ⅱ)求 f(x)的极值</p><p>答 案:(Ⅰ)函数的定义域为<img src="https://img2.meite.com/questions/202303/28642286bee9cc3.png" /> <img src="https://img2.meite.com/questions/202303/28642286c7d68a9.png" />
(Ⅱ)<img src="https://img2.meite.com/questions/202303/28642286d3444c8.png" />
</p><p>2、设函数f(x)=xlnx+x.(I)求曲线y=f(x)在点((1,f(1))处的切线方程;<br />(II)求f(x)的极值.</p><p>答 案:(I)f(1)=1,f'(x)=2+lnx,故f'(1)=2.所以曲线y=f(x)在点(1,f(1))处的切线方程为y=2x-1.(II)令f'(x)=0,解得<img src="https://img2.meite.com/questions/202303/1564116d2d14a94.png" />当<img src="https://img2.meite.com/questions/202303/1564116d3d33026.png" />时,f'(x)<O;当<img src="https://img2.meite.com/questions/202303/1564116d6f6aec3.png" />时,f'(x)>O.故f(x)在区间<img src="https://img2.meite.com/questions/202303/1564116db9a0764.png" />单调递减,在区间<img src="https://img2.meite.com/questions/202303/1564116dc99fc91.png" />单调递增.因此f(x)在<img src="https://img2.meite.com/questions/202303/1564116ddb842d0.png" />时取得极小值<img src="https://img2.meite.com/questions/202303/1564116de4f1b79.png" /></p><p>3、建筑一个容积为8000<img src="https://img2.meite.com/questions/202303/2864224b406cbf6.png" />,深为6m的长方体蓄水池,池壁每<img src="https://img2.meite.com/questions/202303/2864224b5cac16d.png" />的造价为15元,池底每<img src="https://img2.meite.com/questions/202303/2864224b60ac28e.png" />的造价为30元。(I)把总造价y(元)表示为长x(m)的函数;(Ⅱ)求函数的定义域
</p><p>答 案:<img src="https://img2.meite.com/questions/202303/2864224be4311f4.png" /><img src="https://img2.meite.com/questions/202303/2864224bee67713.png" /></p><p>4、已知等差数列前n项和<img src="https://img2.meite.com/questions/202303/2864228a3204a03.png" />
(Ⅰ)求这个数列的通项公式;(Ⅱ)求数列第六项到第十项的和</p><p>答 案:<img src="https://img2.meite.com/questions/202303/2864228a568855e.png" /> <img src="https://img2.meite.com/questions/202303/2864228a63bc5a4.png" />
</p><p class="introTit">填空题</p><p>1、长方体的长、宽、高分别为2,3,6,则该长方体的对角线长为()</p><p>答 案:7</p><p>解 析:由题可知长方体的底面的对角线长为<img src="https://img2.meite.com/questions/202303/1564116b1132166.png" />,则在由高、底面对角线、长方体的对角线组成的三角形中,长方体的对角线长为<img src="https://img2.meite.com/questions/202303/1564116b3811959.png" /></p><p>2、椭圆的中心在原点,一个顶点和一个焦点分别是直线x+3y-6与两坐标轴的交点,则此椭圆的标准方程为()
</p><p>答 案:<img src="https://img2.meite.com/questions/202303/286422989dd2b03.png" /></p><p>解 析:原直线方程可化为<img src="https://img2.meite.com/questions/202303/28642298bab2d76.png" />交点(6,0),(0,2). 当点(6,0)是椭圆一个焦点,点(0,2) 是椭圆一个顶点时,c=6,b=2,<img src="https://img2.meite.com/questions/202303/28642298d6bc461.png" />当点(0,2) 是椭圆一个焦点,(6,0) 是椭圆一个顶点时,c=2,b-6,<img src="https://img2.meite.com/questions/202303/28642298ef2aa6b.png" /></p>
