1.5 Trigonometry

    Cards (21)

    • What is the first step in solving trigonometric equations?
      Isolate the trig function
    • To solve trigonometric equations, you first need to isolate the trigonometric function
    • The reference angle for sinθ=\sin{\theta} =12 \frac{1}{2} is π6\frac{\pi}{6}.
    • In which quadrants is sine positive?
      First and second
    • What is the Pythagorean identity relating sine and cosine?
      sin2θ+\sin^{2}{\theta} +cos2θ= \cos^{2}{\theta} =1 1
    • The Pythagorean identity 1+1 +tan2θ \tan^{2}{\theta} is equal to sec2θ\sec^{2}{\theta}
    • secθ=\sec{\theta} =1cosθ \frac{1}{\cos{\theta}} is a reciprocal identity.
    • Match the trigonometric function with its quotient identity:
      tanθ\tan{\theta} ↔️ sinθcosθ\frac{\sin{\theta}}{\cos{\theta}}
      cotθ\cot{\theta} ↔️ cosθsinθ\frac{\cos{\theta}}{\sin{\theta}}
    • What is the reciprocal identity for cscθ\csc{\theta}?

      1sinθ\frac{1}{\sin{\theta}}
    • The general solution for sinθ\sin{\theta} is θ=\theta =α+ \alpha +2nπ 2n\pi or θ=\theta =πα+ \pi - \alpha +2nπ 2n\pi, where nn is an integer
    • The reference angle for \sin{\theta} = \frac{1}{2}</latex> is π6\frac{\pi}{6}.
    • What is the general solution for tanθ\tan{\theta}?

      θ=\theta =α+ \alpha +nπ n\pi
    • The general solution for sinθ=\sin{\theta} =12 \frac{1}{2} includes the term 2n\pi
    • Steps to solve trigonometric equations
      1️⃣ Isolate the trig function
      2️⃣ Find the reference angle
      3️⃣ Determine the quadrants
      4️⃣ Express the general solutions
    • What is the reference angle for cosθ=\cos{\theta} =12 \frac{1}{2}?

      π3\frac{\pi}{3}
    • Cosine is positive in the first and fourth quadrants.
    • What are the solutions for 2cosθ1=2 \cos{\theta} - 1 =0 0 in [0,2π][0, 2\pi]?

      π3\frac{\pi}{3} and 5π3\frac{5\pi}{3}
    • The range of arccosx\arccos{x} is [0, \pi]
    • What trigonometric function is used to find height when given angle and hypotenuse?
      \sin{\theta}</latex>
    • What formula is used to find distance given height and angle using tangent?
      d=d =htanθ \frac{h}{\tan{\theta}}
    • The formula to find the hypotenuse given angle and height is d=d =hsinθ \frac{h}{\sin{\theta}}.
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