Place the unit circle coaster under the tracing paper. Locate mark on the x axis. Locate the point on the unit circle that corresponds to the arc. Align the tracing paper and the coaster so the end of the vertical line segment generated by this point is passing through (and is perpendicular) mark on the x axis (USE THE RULER). Use a marker to transfer this line segment to the tracing paper. This represents the y-value for the point on the function graph where a = . Note: Since this point is above the x-axis in the unit circle, the corresponding point on the function graph should also be above the x-axis. Continue transferring lengths for all marks on the unit circle (Dont forget to notice if the corresponding points are above or below the x-axis). After you have drawn all line segments, draw a smooth curve to connect their ends. The vertical height to each point on the unit circle matches the vertical heights on the function graph. The graph you have created is the graph of Sine Function. f(x) = sin(x) y = sin(x) or what is the period of the sine function? 1 O 27 O Tr2 O 7? What are the zeros of this function? (Select all that are correct.) 3 2 O 2n

there 6 question in total

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Place the unit circle coaster under the tracing paper. Locate mark on the x axis. Locate the point on the unit circle that corresponds to the arc. Align the tracing paper and the coaster so the end of the vertical line segment generated by this point is passing through (and is perpendicular) mark on the x axis (USE THE RULER). Use a marker to transfer this line segment to the tracing paper. This represents the y-value for the point on the function graph where r = . Note: Since this point is above the x-axis in the unit circle, the corresponding point on the function graph should also be above the x-axis. Continue transferring lengths for all marks on the unit circle (Dont forget to notice if the corresponding points are above or below the x-axis). After you have drawn all line segments, draw a smooth curve to connect their ends. The vertical height to each point on the unit circle matches the vertical heights on the function graph. The graph you have created is the graph of Sine Function. f(x) = sin(x) y = sin(x) or what is the period of the sine function? O 27 Tr? O T? What are the zeros of this function? (Select all that are correct.) 2 3 3 O 27 kla O O O O

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Page 8 Question 5 What is the x-value (between O and 27) at the minima of this function? Page 8 Question 6 What is the y-value at the minima? O -1 O 1 O v3 3 2 Page 8 Question 5 What is the x-value (between 0 and 27 ) at the maxima of this function ? Page 8 Question 6 What is the y-value at the maxima? O -1 1 3 V3 2 O O O O O