사용자:Dolicom/수학

전자공학자이므로 이와 관련된 수학에 관심이 많다. 따라서 생각나는데오 노트한다.

기초수학[편집]

자연로그[편집]

자연로그(natural logarithm)는 e를 밑으로 하는 로그를 뜻하며, ${\displaystyle e^{x}=y}$일 때, ${\displaystyle \ln y=x}$을 자연로그라 한다.

• 오일러의 공식과 자연로그

${\displaystyle re^{ix}=r(\cos x+i\sin x)}$

양변에 자연로그를 씌우면

${\displaystyle re^{ix}=r(\cos x+i\sin x)}$

${\displaystyle \therefore \ln r(\cos x+i\sin x)=ix+\ln r}$

전자공학과 수학[편집]

라플라스 변환[편집]

라플라스 변환

정의[편집]

함수 ${\displaystyle f(t)}$의 라플라스 변환은 모든 실수 t ≥ 0 에 대해, 다음과 같은 함수 ${\displaystyle F(s)}$로 정의된다^[1].

${\displaystyle F(s)={\mathcal {L}}\left\{f\right\}(s)=\int _{0^{-}}^{\infty }e^{-st}f(t)\,dt.}$

여기서 ${\displaystyle 0^{-}}$는 ${\displaystyle \lim _{\epsilon \rightarrow +0}-\epsilon }$를 간단히 나타낸 것이고 복소수 ${\displaystyle s=\sigma +i\omega \,}$, σ와 ω는 실수이다.

실제 사용시에는 엄밀히 정확하지는 않지만 ${\displaystyle F(s)={\mathcal {L}}\left\{f(t)\right\}}$로 표기하기도 한다.

변환 테이블[편집]

The following table provides Laplace transforms for many common functions of a single variable.^[2][3] For definitions and explanations, see the Explanatory Notes at the end of the table.

Because the Laplace transform is a linear operator:

• The Laplace transform of a sum is the sum of Laplace transforms of each term.

${\displaystyle {\mathcal {L}}\{f(t)+g(t)\}={\mathcal {L}}\{f(t)\}+{\mathcal {L}}\{g(t)\}}$

• The Laplace transform of a multiple of a function is that multiple times the Laplace transformation of that function.

${\displaystyle {\mathcal {L}}\{af(t)\}=a{\mathcal {L}}\{f(t)\}}$

Function	Time domain ${\displaystyle f(t)={\mathcal {L}}^{-1}\{F(s)\}}$	Laplace s-domain ${\displaystyle F(s)={\mathcal {L}}\{f(t)\}}$	Region of convergence	Reference
unit impulse	${\displaystyle \delta (t)\ }$	${\displaystyle 1}$	all s	inspection
delayed impulse	${\displaystyle \delta (t-\tau )\ }$	${\displaystyle e^{-\tau s}\ }$		time shift of unit impulse
unit step	${\displaystyle u(t)\ }$	${\displaystyle {1 \over s}}$	Re(s) > 0	integrate unit impulse
delayed unit step	${\displaystyle u(t-\tau )\ }$	${\displaystyle {\frac {1}{s}}e^{-\tau s}}$	Re(s) > 0	time shift of unit step
ramp	${\displaystyle t\cdot u(t)\ }$	${\displaystyle {\frac {1}{s^{2}}}}$	Re(s) > 0	integrate unit impulse twice
nth power ( for integer n )	${\displaystyle t^{n}\cdot u(t)}$	${\displaystyle {n! \over s^{n+1}}}$	Re(s) > 0 (n > −1)	Integrate unit step n times
qth power (for complex q)	${\displaystyle t^{q}\cdot u(t)}$	${\displaystyle {\Gamma (q+1) \over s^{q+1}}}$	Re(s) > 0 Re(q) > −1	[4][5]
nth root	${\displaystyle {\sqrt[{n}]{t}}\cdot u(t)}$	${\displaystyle {1 \over s^{{\frac {1}{n}}+1}}\Gamma \left({\frac {1}{n}}+1\right)}$	Re(s) > 0	Set q = 1/n above.
nth power with frequency shift	${\displaystyle t^{n}e^{-\alpha t}\cdot u(t)}$	${\displaystyle {\frac {n!}{(s+\alpha )^{n+1}}}}$	Re(s) > −α	Integrate unit step, apply frequency shift
delayed nth power with frequency shift	${\displaystyle (t-\tau )^{n}e^{-\alpha (t-\tau )}\cdot u(t-\tau )}$	${\displaystyle {\frac {n!\cdot e^{-\tau s}}{(s+\alpha )^{n+1}}}}$	Re(s) > −α	Integrate unit step, apply frequency shift, apply time shift
exponential decay	${\displaystyle e^{-\alpha t}\cdot u(t)}$	${\displaystyle {1 \over s+\alpha }}$	Re(s) > −α	Frequency shift of unit step
two-sided exponential decay (only for bilateral transform)	${\displaystyle e^{-\alpha |t|}\ }$	${\displaystyle {2\alpha \over \alpha ^{2}-s^{2}}}$	−α < Re(s) < α	Frequency shift of unit step
exponential approach	${\displaystyle (1-e^{-\alpha t})\cdot u(t)\ }$	${\displaystyle {\frac {\alpha }{s(s+\alpha )}}}$	Re(s) > 0	Unit step minus exponential decay
sine	${\displaystyle \sin(\omega t)\cdot u(t)\ }$	${\displaystyle {\omega \over s^{2}+\omega ^{2}}}$	Re(s) > 0	Bracewell 1978, 227쪽 괄호 없는 하버드 인용 error: 대상 없음: CITEREFBracewell1978 (help)
cosine	${\displaystyle \cos(\omega t)\cdot u(t)\ }$	${\displaystyle {s \over s^{2}+\omega ^{2}}}$	Re(s) > 0	Bracewell 1978, 227쪽 괄호 없는 하버드 인용 error: 대상 없음: CITEREFBracewell1978 (help)
hyperbolic sine	${\displaystyle \sinh(\alpha t)\cdot u(t)\ }$	${\displaystyle {\alpha \over s^{2}-\alpha ^{2}}}$	Re(s) > |α|	Williams 1973, 88쪽 괄호 없는 하버드 인용 error: 대상 없음: CITEREFWilliams1973 (help)
hyperbolic cosine	${\displaystyle \cosh(\alpha t)\cdot u(t)\ }$	${\displaystyle {s \over s^{2}-\alpha ^{2}}}$	Re(s) > |α|	Williams 1973, 88쪽 괄호 없는 하버드 인용 error: 대상 없음: CITEREFWilliams1973 (help)
exponentially decaying sine wave	${\displaystyle e^{-\alpha t}\sin(\omega t)\cdot u(t)\ }$	${\displaystyle {\omega \over (s+\alpha )^{2}+\omega ^{2}}}$	Re(s) > −α	Bracewell 1978, 227쪽 괄호 없는 하버드 인용 error: 대상 없음: CITEREFBracewell1978 (help)
exponentially decaying cosine wave	${\displaystyle e^{-\alpha t}\cos(\omega t)\cdot u(t)\ }$	${\displaystyle {s+\alpha \over (s+\alpha )^{2}+\omega ^{2}}}$	Re(s) > −α	Bracewell 1978, 227쪽 괄호 없는 하버드 인용 error: 대상 없음: CITEREFBracewell1978 (help)
natural logarithm	${\displaystyle \ln(t)\cdot u(t)}$	${\displaystyle -{1 \over s}\,\left[\ln(s)+\gamma \right]}$	Re(s) > 0	Williams 1973, 88쪽 괄호 없는 하버드 인용 error: 대상 없음: CITEREFWilliams1973 (help)
Bessel function of the first kind, of order n	${\displaystyle J_{n}(\omega t)\cdot u(t)}$	${\displaystyle {\frac {\left({\sqrt {s^{2}+\omega ^{2}}}-s\right)^{n}}{\omega ^{n}{\sqrt {s^{2}+\omega ^{2}}}}}}$	Re(s) > 0 (n > −1)	Williams 1973, 89쪽 괄호 없는 하버드 인용 error: 대상 없음: CITEREFWilliams1973 (help)
Error function	${\displaystyle \mathrm {erf} (t)\cdot u(t)}$	${\displaystyle {\frac {1}{s}}e^{{\frac {1}{4}}s^{2}}\left(1-\operatorname {erf} {\frac {s}{2}}\right)}$	Re(s) > 0	Williams 1973, 89쪽 괄호 없는 하버드 인용 error: 대상 없음: CITEREFWilliams1973 (help)
Explanatory notes: u(t) represents the Heaviside step function. ${\displaystyle \delta (t)\,}$ represents the Dirac delta function. Γ(z) represents the Gamma function. γ is the Euler–Mascheroni constant. t, a real number, typically represents time, although it can represent any independent dimension. s is the complex angular frequency, and Re(s) is its real part. α, β, τ, and ω are real numbers. n is an integer.

s-도메인에서의 회로 등가모델과 임피던스(impedances)[편집]

The Laplace transform is often used in circuit analysis, and simple conversions to the s-Domain of circuit elements can be made. Circuit elements can be transformed into impedances, very similar to phasor impedances.

Here is a summary of equivalents:

Note that the resistor is exactly the same in the time domain and the s-Domain. The sources are put in if there are initial conditions on the circuit elements. For example, if a capacitor has an initial voltage across it, or if the inductor has an initial current through it, the sources inserted in the s-Domain account for that.

The equivalents for current and voltage sources are simply derived from the transformations in the table above.

같이 보기[편집]

• 기초수학

자연로그

• 전자공학 관련수학

라플라스 변환

각주[편집]