I'm trying to find an angle between 0 and 2π that is coterminal with -4π/3 in terms of pi.
How do I go about doing this?
I'm trying to find an angle between 0 and 2π that is coterminal with -4π/3 in terms of pi.
How do I go about doing this?
First, do you see that $-4 \pi/3$ is in Quadrant II? Drop a vertical line down from this terminal side to touch the negative $x$-axis. Since $-4 \pi/3$ is a little more than $-\pi$ you can use your sketch or think "$-\pi$ plus what gives $-4 \pi/3$ ? Keep in mind that reference angles are defined to be (positive) acute angles: $0<\alpha <0$. Quite often reference angles come out to $\pi/6, \pi/4$, or $\pi/3$.
Hint: The angles $\theta$ and $\phi$ are coterminal iff they differ by an integer multiple of $2\pi$. So try to find a $k$ such that $-\dfrac{4\pi}{3}$ is between $0$ and $2\pi$. It will not take long.
In general, you'll add or subtract $2\pi$ until it ends up in the desired range.
Rather than do this one at a time, if we want to find some angle coterminal with $\theta$ in the interval $[\theta_1,\theta_2]$, write $\theta_1\leq\theta+2k\pi\leq\theta_2,$ and find $k\in\Bbb Z$ so that this works. Once you've found this, $\theta+2k\pi$ will then be the desired angle.