[tex]\bf \textit{Pythagorean Identities}
\\ \quad \\
sin^2(\theta)+cos^2(\theta)=1
\\ \quad \\
1+cot^2(\theta)=csc^2(\theta)
\\ \quad \\
1+tan^2(\theta)=sec^2(\theta)\\\\
-----------------------------\\\\
csc(\theta)=\cfrac{1}{sin(\theta)}\qquad \qquad sec(\theta)=\cfrac{1}{cos(\theta)}[/tex]
so hmm let us use those ones
then
[tex]\bf sin^2(\theta)+cos^2(\theta)=1\implies cos^2(\theta)=1-sin^2(\theta)
\\\\\\
cos(\theta)=\sqrt{1-sin^2(\theta)}\implies cos(\theta)=\sqrt{1-\frac{1}{csc^2(\theta)}}
\\\\\\
cos(\theta)=\sqrt{\cfrac{csc^2(\theta)-1}{csc^2(\theta)}}\\\\
-----------------------------\\\\[/tex]
[tex]\bf 1+cot^2(\theta)=csc^2(\theta)\implies 1+\cfrac{1}{tan^2(\theta)}=csc^2(\theta)
\\\\\\
\cfrac{1}{tan^2(\theta)}=csc^2(\theta)-1\implies \cfrac{1}{csc^2(\theta)-1}=tan^2(\theta)
\\\\\\
\sqrt{\cfrac{1}{csc^2(\theta)-1}}=tan(\theta)\\\\
-----------------------------\\\\
sec(\theta)=\cfrac{1}{cos(\theta)}\implies sec(\theta)=\cfrac{1}{\sqrt{\frac{csc^2(\theta)-1}{csc^2(\theta)}}}
\\\\\\
sec(\theta)=\sqrt{\cfrac{csc^2(\theta)}{csc^2(\theta)-1}}[/tex]
