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Finding Exact Values For Trigonometry Functions (Then Using those Values to Evaluate Trigonometry functions and Solve Trigonometry Equations) Review: Special Right Triangles Find the exact values of the missing side lengths: π60° /3 1 30°-60°-90° The “short leg” is half the hypotenuse 1 2 π45° /4 1 π30° /6 The “long leg” is the short leg multiplied by √3 3 2 π /°4 45 The hypotenuse is any leg multiplied by √2 45°-45°-90° OR Isosceles Right 2 2 2 2 Exact Coordinates on the Unit Circle The angles The angles 0,1 1 that have the from the π90° /2 same special right 2π / 3 π60° /3 120° 3π / 4 π45° /4 reference 135° triangles angles as the have exact 5π / 6 π 30° /6 150° angles coordinates from 1, 0 180° π 0 1,0 0° special -1 1 right The x and 11π /6 triangles 7π / 6 330° 210° have exact 7π315° /4 y-intercepts 5π / 4 225° 5π /3 coordinates 4π /3 300° 240° obviously 3π /2 270° -1 0, 1 have exact coordinates Exact Coordinates on the Unit Circle 1 3 , 2 2 2 2 , 2 2 3 1 , 2 2 1 0,1 π/2 2π / 3 3π / 4 These 5π / 6 coordinates tell you 1, 0 π the exact -1 values of 3 1 cosine and 2 , 2 7π / 6 sine for 16 5π / 4 2 2 , angles. 4π / 3 2 2 1 3 , 2 2 1 3 , 2 2 π/3 π/4 1 1 2 2 , 2 2 1 45° 60° 30° 1/2 2 3 0 2 2 11π / 6 7π / 4 5π / 3 3π / 2 -1 0, 1 3 1 3π / 6 , 2 2 2 2 2 1/2 1 3 , 2 2 1,0 They need to be 1 memorized. 3 1 , 2 2 2 2 , 2 2 Exact Coordinates on the Unit Circle 1 3 , 2 2 2 2 , 2 2 120° 3 1 , 2 2 1 0,1 90° 1 3 , 2 2 2 2 , 2 2 60° 135° These 150° coordinates tell you 1, 0 180° the exact -1 values of 3 1 cosine and 2 , 2 210° sine for 16 225° 2 2 , angles. 240° 2 2 1 3 , 2 2 45° 3 1 , 2 2 30° 0° 330° 315° 270° 1,0 They need to be 1 memorized. 3 1 , 2 2 2 2 , 300° 2 2 1 3 , 2 2 -1 0, 1 NOTE The coordinates on that graph tell you the exact values of cosine and sine for 16 angles. They need to be memorized for all of the included angles. If you do not wish to memorize the unit circle or use special right triangles, the following is a trick to assist in memorization. Reference Angle On the left are 3 reference angles that we know exact trig values for. To find the reference angle for angles not in the 1st quadrant (the angles at right), ignore the integer in the numerator. 6 4 3 : 30 : 45 : 60 5 7 11 , , 6 6 6 3 5 7 , , 4 4 4 2 4 5 , , 3 3 3 NOTE: Multiply the number in the numerator by the degree to find the angle’s quadrant. Example Find the reference angle and quadrant of the following: 3 4 Or 45º Reference Angle: 4 Quadrant of Angle: Second Quadrant 3 45 135 Stewart’s Table: Finding Exact Values of Trig Functions R.A. Sin Cos 0 0 0 2 1 1 2 2 2 2 1 3 2 1 2 6 4 3 2 3 2 2 2 4 2 1 2 2 Each time the square root number goes up by 1 0 Reverse the order of the values from sine Tan 1. Find the value of the Reference Angle. 2. Find the angles quadrant to figure out the sign (+/-). How to Remember which Trigonometric Function is Positive 1 Just Sine S -1 Just Tangent A STUDENTS ALL TAKE CALCULUS T C -1 All 1 Just Cosine Example 1 Find the exact value of the following: Thought process cos 34 Reference Angle: 4 Cosine of Reference Angle: cos 4 2 2 Quadrant of Angle: 3 45 135 Second Quadrant Sign of Cosine in Second Quadrant: Therefore: cos 34 2 2 S A T C Negative The only thing required for a correct answer (unless the question says explain) Example 2 Find the exact solutions to the equation below if 0 ≤ x ≤ 2π: Isolate the Trig Function 2cos x 1 cos x 12 the answer in x cos 12 Finddegrees first x 2.094 or 120 1 Are there more answers? 120° 1 Find the Reference Angle -1 60° 60° Convert the answers to radians 1 Use the reference angle to -1 x 120 180 2 x 3 x find where Cosine is also negative 180°+60° =240° The answer must be in Radians 2 3 , 4 3 240 180 4 x 3 x Example 3 Find the exact value of the following: Thought process tan 53 Reference Angle: 3 Tangent of Reference Angle: tan 3 3 Quadrant of Angle: 5 60 300 Fourth Quadrant Sign of Tangent in Fourth Quadrant: , negative positive Negative , Therefore: tan 53 3 , , The only thing required for a correct answer (unless the question says explain)