MHB Boost Your Cosine-Sine Isotherm Sketching Skills | Expert Tips & Guidance

  • Thread starter Thread starter brunette15
  • Start date Start date
  • Tags Tags
    Graphing
brunette15
Messages
58
Reaction score
0
I am trying to sketch isotherms of the field cos(x)sinh(y). I am not sure how to begin with this. Can someone please help/hint me through what i have to do?
 
Physics news on Phys.org
Presumably, you actually have a temperature field, right? That is, $T=\cos(x)\sinh(y)$. In that case, you want to sketch whole bunch of curves in the $(x,y)$ plane of the form $C=\cos(x)\sinh(y)$. Why a constant? Because you're after the isotherms - the prefix "iso" meaning "same". In fact, you can solve this equation for $y$:
\begin{align*}
C&=\cos(x)\sinh(y) \\
\sinh(y)&=C \sec(x) \\
y&=\text{arcsinh}(C\sec(x)).
\end{align*}
So, pick a few $C$'s, plot the above function, and you've got your isotherms.
 
Ackbach said:
Presumably, you actually have a temperature field, right? That is, $T=\cos(x)\sinh(y)$. In that case, you want to sketch whole bunch of curves in the $(x,y)$ plane of the form $C=\cos(x)\sinh(y)$. Why a constant? Because you're after the isotherms - the prefix "iso" meaning "same". In fact, you can solve this equation for $y$:
\begin{align*}
C&=\cos(x)\sinh(y) \\
\sinh(y)&=C \sec(x) \\
y&=\text{arcsinh}(C\sec(x)).
\end{align*}
So, pick a few $C$'s, plot the above function, and you've got your isotherms.

Thankyou so much :)
 

Thread '##(A/\mathfrak{a})_{\mathfrak{p}/\mathfrak{a}}## and its isomorphism?'

I asked online questions about Proposition 2.1.1: The answer I got is the following: I have some questions about the answer I got. When the person answering says: ##1.## Is the map ##\mathfrak{q}\mapsto \mathfrak{q} A _\mathfrak{p}## from ##A\setminus \mathfrak{p}\to A_\mathfrak{p}##? But I don't understand what the author meant for the rest of the sentence in mathematical notation: ##2.## In the next statement where the author says: How is ##A\to...
View full post »

Thread 'Questions about non existence of GCDs vs (coimages, cokernels)'

The following are taken from the two sources, 1) from this online page and the book An Introduction to Module Theory by: Ibrahim Assem, Flavio U. Coelho. In the Abelian Categories chapter in the module theory text on page 157, right after presenting IV.2.21 Definition, the authors states "Image and coimage may or may not exist, but if they do, then they are unique up to isomorphism (because so are kernels and cokernels). Also in the reference url page above, the authors present two...
View full post »

Thread 'Decomposition into irreps of compact Lie group'

When decomposing a representation ##\rho## of a finite group ##G## into irreducible representations, we can find the number of times the representation contains a particular irrep ##\rho_0## through the character inner product $$ \langle \chi, \chi_0\rangle = \frac{1}{|G|} \sum_{g\in G} \chi(g) \chi_0(g)^*$$ where ##\chi## and ##\chi_0## are the characters of ##\rho## and ##\rho_0##, respectively. Since all group elements in the same conjugacy class have the same characters, this may be...
View full post »

Similar threads

B How can I accurately sketch a complex graph with functions like 2x-⅜+¾e^-2x?
Replies
7
Views
2K
MHB I want to visualise this vector expression
Replies
6
Views
2K
Lorentz transformation of infinitesimal boost and rotation?
Replies
8
Views
2K
MHB Find XYZ for Tip of Vector Given Info on 2 Other Vectors w/ Tails at Same Point
Replies
3
Views
2K
MHB Sketching graphs with extreme values with the Given Information
Replies
6
Views
2K
MHB Law of Cosines for C .... Remmert Section 1.3, Ch. 0 ....
Replies
1
Views
1K
MHB Yet Another Basic Question on Linear Transformations and Their Matrices
Replies
5
Views
2K
Summing sines and cosines with trig.
Replies
3
Views
3K
Sketch Graph: Tips for \frac{cos x}{x + \frac{\pi}{2}}
Replies
10
Views
2K
Sketch the graphs of solutions of diff. eqs
Replies
3
Views
5K

Hot Threads

Recent Insights

Back
Top