Toronto Math Forum

MAT334--2020F => MAT334--Tests and Quizzes => Test 2 => Topic started by: Yuyan Liu on October 27, 2020, 06:19:33 PM

Title: Question 3c for 2020S Night Sitting
Post by: Yuyan Liu on October 27, 2020, 06:19:33 PM
Can someone explain how to get to the answer of $cosh(z)$?
Title: Re: Question 3c for 2020S Night Sitting
Post by: RunboZhang on October 27, 2020, 07:22:04 PM
$\text{Since we have: } \ cosh(x) = cos(ix) \ \text{ and } \ sinh(x) = -i \cdot sin(ix) \\
\text{By substituting and rearranging, we have the following: }$

$
\begin{gather}
\begin{aligned}

f(x,y) &= cosh(x) \cdot sin(y) + ( - sinh(x) \cdot cos(y)) \cdot i + C \cdot i \\\\
&= cos(ix) \cdot sin(y) - sin(ix) \cdot cos(y) + C \cdot i \\\\
&= sin(y - ix) + C \cdot i \\\\
&= sin(-i \cdot (x+iy)) + C \cdot i \\\\
&= - sin(i(x+iy)) + C \cdot i \\\\
&= -i \cdot sinh(x + iy) + C \cdot i \\\\
&= -i \cdot sinh(z) + C \cdot i \\\\

\end{aligned}
\end{gather}
$

$\text{I think the answer has a typo, I got} \ -i \cdot sinh(z) + C \cdot i \ \text{ instead of } cosh(z) + C \cdot i$
Title: Re: Question 3c for 2020S Night Sitting
Post by: Xuefeng Fan on December 07, 2020, 02:43:43 PM
f(x,y) = coshxsiny +i(-sinhxcosy+c)
=cos(ix)siny +i(-(-isin(ix)cosy +c)
=cos(ix)siny - sin(ix)cosy +ic
=sin(y-ix)+ic
=sin(-i(x+iy))+ic
=-sin(i(x+iy)) + ic
=-isinh(x+iy) +ic
=-isinhz+ic