数学API Math.atan() 和Math.atan2() 三角函数复习

今天在学习贝塞尔曲线看到需要结合三角函数 以及两个不认识的Api

:API Math.atan() 和Math.atan2()

先看下三角函数

正切函数图:(180为一个周期 即45=45+180)

正弦

正余弦函数方程为：

y = Asin(wx+b)+h ，这个公式里：w影响周期，A影响振幅，h影响y位置，b为初相；

w:周期就是一个完整正弦曲线图此数值越大sin的周期越小 (cos越大)

A:振幅两个山峰最大的高度.如果A越大两个山峰越高和越低

h:你正弦曲线和y轴相交点.(影响正弦图初始高度的位置)

b:初相会让你图片向x轴平移

<img src="data:image/jpeg;base64,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" alt="这里写图片描述" title="">

余弦

Math.atan() 和Math.atan2()

我们可以使用正切操作将角度转变为斜率,那么怎样利用斜率来转换为角度呢?可以利用斜率的反正切函数将他转换为相应的角度.as中有两个函数可以计算反正切,我们来看一下.

1、as中Math.atan()

Math.atan()接受一个参数:用法如下:

angel=Math.atan(slope)

angel为一个角度的弧度值,slope为直线的斜率,是一个数字,这个数字可以是负的无穷大到正无穷大之间的任何一个值.

不过,利用他进行计算比较复杂.因为他的周期性,一个数字的反正切值不止一个.例如atan(-1)的值可能是45度,也可能是225度.这样就是他的周期性,对于正切函数来说,他的周期是180度,所以两个相差180度的角具有相同的正切和斜率:

tanθ=tan(θ+180)

然而,Math.atan()只能返回一个角度值,因此确定他的角度非常的复杂,而且,90度和270度的正切是无穷大,因为除数为零,我们也是比较难以处理的~!因此我们更多的会采用第二个函数.

2、Math.atan2()

Math.atan2()接受两个参数x和y,方法如下:

angel=Math.atan2(y,x)

x 指定点的 x 坐标的数字。

y 指定点的 y 坐标的数字。

计算出来的结果angel是一个弧度值,也可以表示相对直角三角形对角的角，其中 x 是临边边长，而 y 是对边边长。

下面我们来测试一下这两个函数:

x=Math.atan(1)//计算正切值为1的数字对应的弧度值

trace(x) //输出一个弧度值0.785398163397448

x=180*x/Math.PI//转换为角度值

trace(x) //输出45

x=Math.atan2(7,7)

trace(x)//输出0.785398163397448

x=180*x/Math.PI//转换为角度值

trace(x)//输出45

x=Math.atan2(7,-7)

trace(x)2.35619449019234

x=180*x/Math.PI//转换为角度值

trace(x)135

x=Math.atan2(-7,7)

trace(x)//输出-0.785398163397448

x=180*x/Math.PI//转换为角度值

trace(x)//输出-45

x=Math.atan2(-7,-7)

trace(x)//输出-2.35619449019234

x=180*x/Math.PI//转换为角度值

trace(x)//输出-135

//从这些测试可以看出,通过坐标系的自动调整,我们可以很自由的计算出处于不同象限的位置相对应的角度.

3、计算两点间连线的倾斜角.

这种方法非常的有用.

Math.atan2()函数返回点(x,y)和原点(0,0)之间直线的倾斜角.那么如何计算任意两点间直线的倾斜角呢?只需要将两点x,y坐标分别相减得到一个新的点(x2-x1,y2-y1).然后利用他求出角度就可以了.使用下面的一个转换可以实现计算出两点间连线的夹角.

Math.atan2(y2-y1,x2-x1)

不过这样我们得到的是一个弧度值,在一般情况下我们需要把它转换为一个角度.

下面我们用一段代码来测试一下这样的转换.

//测试,计算点(3,3)和(5,5)构成的连线的夹角

x=Math.atan2(5-3,5-3)

trace(x)//输出0.785398163397448

x=x*180/Math.PI//转换为角度

trace(x)//输出45

弧度转角度

// 用角度表示的角

B = Math.toDegrees(B);

角度转弧度

public static double toRadians(double angdeg)