📅  最后修改于: 2020-12-15 04:22:50             🧑  作者: Mango
它实现了复杂类,以包含笛卡尔形式的复数以及用于对其进行操作的若干函数和重载。
以下是std :: complex的声明。
template< class T >
class complex;
T-复数的实部和虚部的类型。
Sr.No. | Complex values | Definition |
---|---|---|
1 | real | It is used to real part of complex |
2 | imag | It is an imaginary part of complex |
3 | abs | It is an absolute value of complex |
4 | arg | It is a phase angle of complex |
5 | norm | It is a norm of complex |
6 | conj | It is a complex conjugate |
7 | polar | It is a complex from polar components |
8 | proj | It is a complex projection |
Sr.No. | Overloads | Definition |
---|---|---|
1 | cos | It is a cosine of complex |
2 | cosh | It is a hyperbolic cosine of complex |
3 | exp | It is an exponential of complex |
4 | log | It is a natural logarithm of complex |
5 | log10 | It is a common logarithm of complex |
6 | pow | It is a power of complex |
7 | sin | It is a sine of complex |
8 | sinh | It is a hyperbolic sine of complex |
9 | sqrt | It is a square root of complex |
10 | tan | It is a tangent of complex |
11 | tanh | It is a hyperbolic tangent of complex |
12 | acos | It is an arc cosine of complex |
13 | acosh | It is an arc hyperbolic cosine of complex |
14 | asin | It is an arc sine of complex |
15 | asinh | It is an arc hyperbolic sine of complex |
16 | atan | It is an arc tangent of complex |
17 | atanh | It is an arc hyperbolic tangent of complex |