解答
sinh(i)
解答
isin(1)
求解步骤
sinh(i)
使用双曲函数恒等式: sinh(x)=2ex−e−x=2ei−e−i
化简 2ei−e−i:2−cos(−1)+cos(1)+i2−sin(−1)+sin(1)
2ei−e−i
ei−e−i=cos(1)+isin(1)−(cos(−1)+isin(−1))
ei−e−i
使用虚数运算法则: eia=cos(a)+isin(a)=cos(1)+isin(1)−e−i
使用虚数运算法则: eia=cos(a)+isin(a)=cos(1)+isin(1)−(cos(−1)+isin(−1))
=2cos(1)+isin(1)−(cos(−1)+isin(−1))
乘开 cos(1)+sin(1)i−(cos(−1)+sin(−1)i):cos(1)+sin(1)i−cos(−1)−sin(−1)i
cos(1)+sin(1)i−(cos(−1)+sin(−1)i)
=cos(1)+isin(1)−(cos(−1)+isin(−1))
−(cos(−1)+sin(−1)i):−cos(−1)−sin(−1)i
−(cos(−1)+sin(−1)i)
打开括号=−(cos(−1))−(sin(−1)i)
使用加减运算法则+(−a)=−a=−cos(−1)−sin(−1)i
=cos(1)+sin(1)i−cos(−1)−sin(−1)i
=2cos(1)+isin(1)−cos(−1)−isin(−1)
将 2cos(1)+sin(1)i−cos(−1)−sin(−1)i 改写成标准复数形式:2cos(1)−cos(−1)+2sin(1)−sin(−1)i
2cos(1)+sin(1)i−cos(−1)−sin(−1)i
使用分式法则: ca±b=ca±cb2cos(1)+sin(1)i−cos(−1)−sin(−1)i=2cos(1)+2sin(1)i−2cos(−1)−2sin(−1)i=2cos(1)+2isin(1)−2cos(−1)−2isin(−1)
对同类项分组=2cos(1)+2isin(1)−2cos(−1)−2isin(−1)
将复数的实部和虚部分组=(2cos(1)−2cos(−1))+(2sin(1)−2sin(−1))i
2sin(1)−2sin(−1)=2sin(1)−sin(−1)
2sin(1)−2sin(−1)
使用法则 ca±cb=ca±b=2sin(1)−sin(−1)
=(2cos(1)−2cos(−1))+2sin(1)−sin(−1)i
2cos(1)−2cos(−1)=2cos(1)−cos(−1)
2cos(1)−2cos(−1)
使用法则 ca±cb=ca±b=2cos(1)−cos(−1)
=2cos(1)−cos(−1)+2sin(1)−sin(−1)i
=2cos(1)−cos(−1)+2sin(1)−sin(−1)i
=2−cos(−1)+cos(1)+i2−sin(−1)+sin(1)
利用以下特性:sin(−x)=−sin(x)sin(−1)=−sin(1)=2−cos(−1)+cos(1)+i2−(−sin(1))+sin(1)
利用以下特性:cos(−x)=cos(x)cos(−1)=cos(1)=2−cos(1)+cos(1)+i2−(−sin(1))+sin(1)
化简=isin(1)