Find the secant of an angle $ heta$ in a unit circle
Answer 1
Benjamin Clark
To find the secant of an angle $\theta$ in a unit circle, we use the formula:
$ \sec(\theta) = \frac{1}{\cos(\theta)} $
Suppose $\theta$ is an angle in the first quadrant where cos(θ) = 0.6. Then:
$ \sec(\theta) = \frac{1}{0.6} = \frac{5}{3} $
Answer 2
Christopher Garcia
To find the secant of an angle $ heta$ in a unit circle, we use the formula:
$ sec( heta) = frac{1}{cos( heta)} $
For an angle $ heta$ in the second quadrant where cos(θ) = -0.5, we get:
$ sec( heta) = frac{1}{-0.5} = -2 $
Answer 3
Alex Thompson
For an angle $ heta$ in a unit circle, the secant is given by:
$ sec( heta) = frac{1}{cos( heta)} $
If $ heta$ is an angle in the third quadrant where cos(θ) = -0.8, then:
$ sec( heta) = frac{1}{-0.8} = -1.25 $
Start Using PopAi Today