1. 4.1 正弦函数、余弦函数的图象
【教学目标】
1、 通过本节学习,理解正弦函数、余弦函数图象的画法.
2、 通过三角函数图象的三种画法:描点法、几何法、五点法,体会用“五点法”作图给我们学习带来的好处,并会熟练地画出一些较简单的函数图象.
【教学重点】正弦函数、余弦函数的图象.
【教学难点】将单位圆中的正弦线通过平移转化为正弦函数图象上的点;正弦函数与余弦函数图象间的关系.
【教学过程】
一、预习提案 (阅读教材第30—33页内容,完成以下问题:)
1、借助单位圆中的正弦线在下图中画出正弦函数y=sinx, x![](https://wkrtcs.bdimg.com/rtcs/image?w=13.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","r":"r_23","w":"13.00","h":"13.00","dataType":"png","c":"word/media/image1_1.png","imgOriW":320,"imgOriH":320})
[0,2]的图象。
![](https://wkrtcs.bdimg.com/rtcs/image?w=588.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","w":"588.00","h":"196.00","dataType":"gif","c":"word/media/image3.gif"})
![](https://wkrtcs.bdimg.com/rtcs/image?w=16.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","w":"16.00","h":"16.00","dataType":"gif","c":"word/media/image4.gif"})
说明:使用三角函数线作图象时,将单位圆分的份数越多,图象越准确。在作函数图象时,自变量要采用弧度制,确保图象规范。
2、 ![](https://wkrtcs.bdimg.com/rtcs/image?w=576.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","w":"576.00","h":"197.33","dataType":"gif","c":"word/media/image5.gif"})
由上面画出的x[0,2]的正弦函数图象向两侧无限延伸得到正弦函数的图象(正弦曲线),请画出:
3、 观察图象(正弦曲线),说明正弦函数图象的特点:
①由于正弦函数y=sinx中的x可以取一切实数,所以正弦函数图象向两侧 。
②正弦函数y=sinx图象总在直线 和 之间运动。
![](https://wkrtcs.bdimg.com/rtcs/image?w=564.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","w":"564.00","h":"1.33","dataType":"gif","c":"word/media/image6.gif"})
4、观察正弦函数y=sinx, x[0,2]的图象,找到起关键作用的五个点:
, , , ,
![](https://wkrtcs.bdimg.com/rtcs/image?w=564.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","w":"564.00","h":"204.00","dataType":"gif","c":"word/media/image7.gif"})
5、用“五点作图法”画出y=sinx, x[-,]的图象。
![](https://wkrtcs.bdimg.com/rtcs/image?w=193.33&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","w":"193.33","h":"1.33","dataType":"gif","c":"word/media/image8.gif"})
6、①函数ƒ(x+1)的图象相对于函数ƒ(x)的图象是如何变化的?
②函数y=sin(x+![](https://wkrtcs.bdimg.com/rtcs/image?w=17.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","r":"r_23","w":"17.00","h":"41.00","dataType":"png","c":"word/media/image9_1.png","imgOriW":416,"imgOriH":992})
)的图象相对于正弦函数y=sinx的图象是如何变化的?
![](https://wkrtcs.bdimg.com/rtcs/image?w=385.33&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","r":"r_78","w":"385.33","h":"1.33","dataType":"gif","c":"word/media/image10.gif"})
③由诱导公式知:sin(x+)= ,所以函数y=sin(x+)=
![](https://wkrtcs.bdimg.com/rtcs/image?w=553.33&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","r":"r_41","w":"553.33","h":"198.67","dataType":"gif","c":"word/media/image12.gif"})
④请画出y=cosx的图象(余弦曲线)
7、观察余弦函数y=cosx, x[0,2]的图象,找到起关键作用的五个点:
, , , ,
![](https://wkrtcs.bdimg.com/rtcs/image?w=557.33&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","w":"557.33","h":"198.67","dataType":"gif","c":"word/media/image13.gif"})
8、用“五点作图法”画出y=cosx, x[-,]的图象。
二、新课讲解
例1、用“五点作图法”作出y=![](https://wkrtcs.bdimg.com/rtcs/image?w=39.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","r":"r_8","w":"39.00","h":"27.00","dataType":"png","c":"word/media/image14_1.png","imgOriW":928,"imgOriH":640})
, x[0,2]的图象;并通过猜想画出y=在整个定义域内的图象。
练习:用“五点作图法”作出y=![](https://wkrtcs.bdimg.com/rtcs/image?w=41.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","r":"r_8","w":"41.00","h":"27.00","dataType":"png","c":"word/media/image15_1.png","imgOriW":992,"imgOriH":640})
, x[0,2]的图象;并通过猜想画出y=在整个定义域内的图象。
例2、用“五点作图法”作出下列函数的简图;(1)y=1+sinx, x![](https://wkrtcs.bdimg.com/rtcs/image?w=13.00&md5sum=6afb558e6dbb2e963af17458f5c700d1&sign=886d3678aa&rtcs_flag=1&rtcs_ver=4&l=webapp&bucketNum=477&ipr={"t":"img","r":"r_8","w":"13.00","h":"13.00","dataType":"png","c":"word/media/image1_1.png","imgOriW":320,"imgOriH":320})
[0,2];(2)y=2cos(2x-)
练习:用“五点作图法”作出下列函数的简图;(1)y=-cosx, x[0,2];(2)y=2sin(x-)+1
三、课堂小结 1、 会用“五点法”作图熟练地画出一些较简单的函数图象.
2、关键点是指图象的最高点,最低点及与x轴的交点。
四、作业布置 习题1.4 A组第1题
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