To find the values of sin 2theta and cos 2theta when cos theta is given as 12/13, we can use the double angle formulas in trigonometry:
- sin 2theta = 2 * sin theta * cos theta
- cos 2theta = cos2theta – sin2theta
First, we need to determine the missing value: sin theta. Using the Pythagorean identity:
sin²θ + cos²θ = 1We know that:
cos²θ = (12/13)² = 144/169Now, substituting into the Pythagorean identity:
sin²θ + 144/169 = 1Solving for sin2θ:
sin²θ = 1 - 144/169 = 25/169Taking the square root of both sides, we find:
sinθ = ±√(25/169) = ±5/13Since we typically consider the range of angles for θ where both sine and cosine are positive in the first quadrant, we take sin θ = 5/13.
Now we can calculate sin 2theta:
sin 2θ = 2 * sin θ * cos θ = 2 * (5/13) * (12/13) = 120/169Next, let’s calculate cos 2theta:
cos 2θ = cos²θ - sin²θ = (12/13)² - (5/13)² = 144/169 - 25/169 = 119/169In conclusion, the values are:
- sin 2θ = 120/169
- cos 2θ = 119/169