Nghi N. May 22, 2015 \displaystyle{\sec{{180}}}=\frac{{1}}{{\cos{{180}}}}=\frac{{1}}{{-{{1}}}}=-{1}

\displaystyle{\sec{{\left({18}\pi\right)}}}={1} Explanation: \displaystyle{\sec{{\left({18}\pi\right)}}}=\frac{{1}}{{{\cos{{\left({18}\pi\right)}}}}} Since the cosine graph is oscillatory ...

\displaystyle{{\sec{{120}}}^{\circ}=}-{2} Explanation: Using the \displaystyle\text{trigonometric identity} \displaystyle{\left(\overline{{\underline{{{\left|{\left(\frac{{2}}{{2}}\right)}{\left({\sec{\theta}}=\frac{{1}}{{\cos{\theta}}};{\cos{\theta}}≠{0}\right)}{\left(\frac{{2}}{{2}}\right)}\right|}}}}}\right)} ...

\displaystyle{{\sec{{137}}}^{\circ}=}-{1.3672} Explanation: \displaystyle{{\sec{{137}}}^{\circ}=}\frac{{1}}{{\cos{{\left({137}^{\circ}\right)}}}}=\frac{{1}}{{\cos{{\left({180}-{137}^{\circ}\right)}}}} ...

\displaystyle-\frac{{{2}}}{{\sqrt{{{2}+\sqrt{{3}}}}}} Explanation: Use the trig identity: \displaystyle{2}{{\cos}^{{2}}{a}}={1}+{\cos{{2}}}{a}. (1) In this case a = 165, and 2a = 330. sec ...

2 Explanation: \displaystyle{\sec{{\left({780}\right)}}}=\frac{{1}}{{{\cos{{780}}}}}. Find cos (780). \displaystyle{\cos{{\left({780}\right)}}}={\cos{{\left({60}+{2}{\left({360}\right)}\right)}}}={\cos{{60}}} ...