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Material Type: Assignment; Class: Precalculus; Subject: Mathematics; University: Washington State University; Term: Fall 2003;
Typology: Assignments
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A. You are given two Unit Circles: Circle A and Circle B. Notice that each Quadrant is 90°. What is the radian equivalent to this angle? ___________ Notice that in Circle A, the angle in each Quadrant bisects the Quadrant in which it exists. Notice that in Circle B, the angles in each Quadrant trisect the Quadrant in which they exist. The angles should increase by the same angle measure around the entire circle.
B. For each circle, write in the angle measures in both radians and degrees for all angles. Be sure to label the angles in a counterclockwise direction, starting with 0°=0 radians as the positive x -axis.
C. Examine the two circles. Be sure that the measures on each of the circles make sense.
D. For Circle A, what degree measure does each angle increase by? _____________ What radian measure does each angle increase by? ______________
E. For Circle B, what degree measure does each angle increase by? _____________ What radian measure does each angle increase by? ______________
F. How many degrees are there in one full revolution of a circle? ______________ How many radians are there in one full revolution of a circle? ______________
G. The angles are labeled in a counterclockwise direction. Would labeling the angles in a clockwise direction cause the degree and radian measures change in any way? If not, why not? If so, how?
A. Consider the Unit Square, meaning a square whose sides are all of an equal length of 1. The diagonal bisects the square into two equal triangles, each of which is called a right isosceles triangle. We will examine one of these triangles.
B. Now, consider the Unit Equilateral Triangle, a triangle whose sides are all of equal length of 1 and whose angles are all of equal measure of 60°. The altitude (height) of this triangle is drawn from one corner of the triangle to its opposite side, the base of the triangle, meeting the base perpendicularly. The altitude bisects the angle from where it is drawn as well as the base side that it connects to. This bisection creates two similar right triangles. We will examine one of these triangles. Recall: The sum of the interior angles of any triangle is 180°.
C. Now, use the coordinates that you found in the preceding figures to label the x - and y - coordinates of the angle in Quadrant I on Circle A and to label the x - and y - coordinates of the angles in Quadrant I on Circle B****.
D. Remember that the Circle A and Circle B are both Unit Circles****. What does that tell you about the points where the Unit Circle intersects the x - and y - axes on the Cartesian Plane? (In other words, what are those points?)
E. Label the x - and y - intercepts on both circles.
Think about the questions before responding. Be specific and be thorough.
a. Suppose that you did not have the Unit Circle on Circle A, but rather a circle of radius 5. Will the angle measures in degrees and/or radians change? Why or why not?
b. Suppose that you did not have the Unit Circle on Circle A , but rather a circle of radius 5. What do you suppose the x - and y - coordinates will be for that circle in Quadrant I? (You may want to consider the square and isosceles right triangle before responding.)
c. Consider the two points in Quadrant I on Circle B. What is the special relationship between them? (Consider the relationship between the angles whose terminal sides pass through these points.)
d. How would the point in Quadrant I on Circle A fit into the same kind of relationship? (Think about the angle whose terminal side passes through that point and the y = x line.)
those in Quadrants II, III, and IV, where the angle is reflected across the y -axis, x -axis, and the origin. What do you notice about the relationship? (Note: Look at the relationship of the angle measures in degrees and radians, and the x - and y - coordinates.)
those in Quadrants II, III, and IV, where the angle is reflected across the y -axis, x -axis, and the origin. What do you notice about the relationship?
Definitions of Trigonometric Functions on the Cartesian Plane
Reciprocal Identities of Trigonometric Functions
Co functions: sine, co sine tangent, co tangent co secant, secant
sin 30° = _______ cos 45° = _______ tan 30° = _______ sin (π/3)= _______ cot 30° = ______ cos 60° = _______ sin 45° = _______ cot 60° = _______ cos (π/6)= _______ tan 60° = ______
csc (π/6) = ______ sec (π/4) = ______ tan (π/4) = ______ csc (π/3) = ______ tan (π/2) = ______ sec (π/3) = ______ csc (π/4)= ______ cot (π/4) = ______ sec (π/6) = ______ cot 0 = ______
sin 40° = _______ sec 32° = _______ tan (3π/10) = _______ cos (π/9) = _______ tan 10° = ______ cos 50° = _______ csc 58° = _______ cot (π/5) = _______ sin (7π/18) = _______ cot 80° = ______
Pythagorean Theorem: x^2 + y^2 = r^2 for a circle of radius r.
Note: For the Unit Circle ( r = 1 )
Note: Use the Reciprocal Identities to evaluate the cosecant, secant, and cotangent functions in your calculator. sec 32° = 1 ÷ cos 32° csc 58° = 1 ÷ sin 58° cot (π/5) = 1 ÷ tan (3π/10) cot 80° = 1 ÷ tan 80°
Why doesn’t this fit here? Notice the angles. Are they complements?