Question

Find the degree measure of alpha to the nearest tenth of a degree.

Answer 1

tanα=y/x

α=arctan(y/x), we are given the point (3.2, 6.2) so:

α=arctan(6.2/3.2)°

α=arctan(1.9375)°

α≈62.7° (to nearest tenth of a degree)

Answer 2

`\bf \begin{array}{rllll} (3.2&,&6.2)\\ x&&y \end{array}\\\\ -------------------------------\\\\ sin(\theta)=\cfrac{y}{r} \qquad % cosine cos(\theta)=\cfrac{x}{r} \qquad % tangent tan(\theta)=\cfrac{y}{x}\\\\ -------------------------------\\\\ tan(\theta)=\cfrac{y}{x}\implies tan^(-1)[tan(\theta )]=tan^(-1)\left( (y)/(x) \right) \\\\\\ \theta =tan^(-1)\left( (y)/(x) \right)\implies \measuredangle \theta =tan^(-1)\left( (6.2)/(3.2) \right)`

make sure your calculator is in Degree mode