Provide examples relevant to one’s self, family, or community that illustrate the need to define a standard position for angles.

Sketch an angle in standard position given the measure of the angle.

Determine and justify, with or without sketching, the quadrant in which an angle in standard position terminates.

Determine the reference angle for an angle in standard position.

Analyze, describe, and generalize the relationship between the reference angles for angles (in standard positions) that are reflections of each other across both the $x-$ and $y-$ axes (e.g., $30°$ and $150°$, or $-60°$ and $60°$).

Sketch an angle in standard position given a point $P(x,y)$ on the terminal arm of the angle.

Develop, generalize, explain, and apply strategies for determining a point on the terminal arm of the angle in each quadrant that has the same reference angle as the angle with $P(x,y)$ on its terminal arm.

Develop, explain, and apply strategies for determining the distance between the origin and a point $P(x,y)$ on the terminal arm of an angle.

Develop, generalize, explain, and apply strategies for determining the value of $sinθ$, $cosθ$, and $tanθ$ when given a point $P(x,y)$ on the terminal arm of $θ$.

Develop, generalize, explain, and apply strategies for determining $sinθ$, $cosθ$, and $tanθ$ for quadrantal angles.

Develop, generalize, explain, and apply strategies for determining the sign (without calculation or the use of technology) of $sinθ$, $cosθ$, or $tanθ$ for a given value of $θ$.

Develop, explain, and apply strategies for solving, for all values of $θ$, equations of the form $sinθ = a$ or $cosθ =a$, where $-1 ≤ a ≤ 1$, and equations of the form $tanθ = a$, where $a$ is a real number.

Analyze $30°- 60°- 90° \and 45°- 45°- 90°$ triangles to generalize about the relationship between pairs of sides in such triangles in relation to the angles.

Develop, generalize, explain, and apply strategies for determining the exact value of the sine, cosine, or tangent (without the use of technology) of an angle with a reference angle of $30°, 45°, \or 60°$.

Describe and generalize the relationships and patterns in and among the values of the sine, cosine, and tangent ratios for angles from $0° \to 360°$.

Create and solve a situational question relevant to one’s self, family, or community which involves a trigonometric ratio.

Identify angles for which the tangent ratio does not exist and explain why.