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쌍곡함수의 합성 공식 📂함수

쌍곡함수의 합성 공식

공식

다음이 성립한다.

c1coshx+c2sinhx={Acosh(x+y1)if c1>c2Bexif c1=c2=BCsinh(x+y2)if c1<c2 c_{1} \cosh x + c_{2} \sinh x = \begin{cases} A\cosh(x + y_{1}) & \text{if } c_{1} \gt c_{2} \\ B e^{x} & \text{if } c_{1} = c_{2} = B \\ C\sinh(x + y_{2}) & \text{if } c_{1} \lt c_{2} \end{cases}

  • A=c22c12A = \sqrt{c_{2}^{2} - c_{1}^{2}}
  • C=c22c12C = \sqrt{c_{2}^{2} - c_{1}^{2}}
  • y1=cosh1(c1c12c22)=sinh1(c2c12c22)y_{1} = \cosh^{-1}\left( \dfrac{c_{1}}{\sqrt{c_{1}^{2} - c_{2}^{2}}} \right) = \sinh^{-1} \left( \dfrac{c_{2}}{\sqrt{c_{1}^{2} - c_{2}^{2}}} \right)
  • y2=cosh1(c2c22c12)=sinh1(c1c22c12)y_{2} = \cosh^{-1}\left( \dfrac{c_{2}}{\sqrt{c_{2}^{2} - c_{1}^{2}}} \right) = \sinh^{-1} \left( \dfrac{c_{1}}{\sqrt{c_{2}^{2} - c_{1}^{2}}} \right)

증명

c1>c2c_{1} \gt c_{2}

c1coshx+c2sinhx=c12c22(c1c12c22coshx+c2c12c22sinhx) c_{1}\cosh x + c_{2}\sinh x = \sqrt{c_{1}^{2} - c_{2}^{2}}\left( \dfrac{c_{1}}{\sqrt{c_{1}^{2} - c_{2}^{2}}}\cosh x + \dfrac{c_{2}}{\sqrt{c_{1}^{2} - c_{2}^{2}}}\sinh x \right)

가정에 의해 c1c12c22>1\dfrac{c_{1}}{\sqrt{c_{1}^{2} - c_{2}^{2}}} > 1이므로, 이를 coshy\cosh y로 두면,

sinh2y=coshy1=c12c12c22c12c22c12c22=c22c12c22 \sinh^{2} y = \cosh^{y} - 1 = \dfrac{c_{1}^{2}}{c_{1}^{2} - c_{2}^{2}} - \dfrac{c_{1}^{2} - c_{2}^{2}}{c_{1}^{2} - c_{2}^{2}} = \dfrac{c_{2}^{2}}{c_{1}^{2} - c_{2}^{2}}

    sinhy=c2c12c22 \implies \sinh y= \dfrac{c_{2}}{\sqrt{c_{1}^{2} - c_{2}^{2}}}

이제 A=c12c22A = \sqrt{c_{1}^{2} - c_{2}^{2}}라 두면, 덧셈 정리에 의해

c1coshx+c2sinhx=A(coshycoshx+sinhysinhx)=Acosh(x+y) \begin{align*} c_{1}\cosh x + c_{2}\sinh x &= A(\cosh y \cosh x + \sinh y \sinh x) \\ &= A\cosh(x + y) \end{align*}

c1=c2c_{1} = c_{2}

B=c1=c2B = c_{1} = c_{2}라 하면, 쌍곡함수의 정의에 의해,

c1coshx+c2sinhx=B(coshx+sinhx)=B(ex+ex2+exex2)=Bex \begin{align*} c_{1}\cosh x + c_{2}\sinh x &= B(\cosh x + \sinh x) \\ &= B\left( \dfrac{e^{x} + e^{-x}}{2} + \dfrac{e^{x} - e^{-x}}{2} \right) \\ &= B e^{x} \end{align*}

c1<c2c_{1} \lt c_{2}

c1coshx+c2sinhx=c22c12(c1c22c12coshx+c2c22c12sinhx) c_{1}\cosh x + c_{2}\sinh x = \sqrt{c_{2}^{2} - c_{1}^{2}}\left( \dfrac{c_{1}}{\sqrt{c_{2}^{2} - c_{1}^{2}}}\cosh x + \dfrac{c_{2}}{\sqrt{c_{2}^{2} - c_{1}^{2}}}\sinh x \right)

가정에 의해 c2c22c12>1\dfrac{c_{2}}{\sqrt{c_{2}^{2} - c_{1}^{2}}} > 1이므로, 이를 coshy\cosh y로 두면,

sinh2y=coshy1=c22c22c12c22c12c22c12=c12c22c12 \sinh^{2} y = \cosh^{y} - 1 = \dfrac{c_{2}^{2}}{c_{2}^{2} - c_{1}^{2}} - \dfrac{c_{2}^{2} - c_{1}^{2}}{c_{2}^{2} - c_{1}^{2}} = \dfrac{c_{1}^{2}}{c_{2}^{2} - c_{1}^{2}}

    sinhy=c1c22c12 \implies \sinh y= \dfrac{c_{1}}{\sqrt{c_{2}^{2} - c_{1}^{2}}}

이제 C=c22c12C = \sqrt{c_{2}^{2} - c_{1}^{2}}라 두면, 덧셈 정리에 의해

c1coshx+c2sinhx=C(sinhycoshx+coshysinhx)=Csinh(x+y) \begin{align*} c_{1}\cosh x + c_{2}\sinh x &= C(\sinh y \cosh x + \cosh y \sinh x) \\ &= C\sinh(x + y) \end{align*}