\displaystyle\frac{{\cos{\theta}}}{{3}}=\pm\frac{{1}}{{{3}\sqrt{{{{\tan}^{{2}}\theta}+{1}}}}} Explanation: We know that \displaystyle\frac{{\sin{\theta}}}{{\cos{\theta}}}={\tan{\theta}} \displaystyle\Rightarrow{\sin}^{{2}}\frac{\theta}{{{\cos}^{{2}}\theta}}={{\tan}^{{2}}\theta} ...

\displaystyle\frac{{1}}{{{4}{\csc{{\left(\frac{\pi}{{2}}-\theta\right)}}}}} Explanation: \displaystyle\frac{{{\cos{\theta}}}}{{4}}= Using co-function identity: \displaystyle\frac{{\sin{{\left(\frac{\pi}{{2}}-\theta\right)}}}}{{4}}= ...

I've figured it out thanks to another figure I found on someone's lecture notes : It turns out we don't need to use surface elements in spherical coordinates or anything like that; all that is ...

Basically, your first two equations involve square roots, and the third doesn't. The first requires a \pm as \sin u/2 may be positive or negative, but by convention square roots are positive. ...

I just asked a professor this question, and he thinks that the concentration of return current below the circuit trace is actually just an AC effect. The rapidly oscillating electric and magnetic ...

HINT...You have the x coordinate, now find the y coordinate, and eliminate the parameter \theta using \cos^2\theta+\sin^2\theta=1 to obtain the cartesian equation of the ellipse.