Answer: The positive co-terminal angle is [tex]\dfrac{9\pi}{4}.[/tex] and the negative co-terminal angle is [tex]-\dfrac{7\pi}{4}.[/tex]
Step-by-step explanation: We are to find the measures of the two angles, one positive and one negative, that are co-terminal with pi divided by four.
We know that
any two co-terminal angles differ from each other by an integral multiple of [tex]2\pi.[/tex]
So, to find the positive co-terminal angle, we will add [tex]2\pi[/tex] to [tex]\dfrac[\pi}{4}[/tex] and to find the negative co-terminal angle, we will subtract [tex]2\pi[/tex] from [tex]\dfrac[\pi}{4}[/tex].
Therefore, the required positive co-terminal angle is given by
[tex]C_p=\dfrac{\pi}{4}+2\pi=\dfrac{\pi+8\pi}{4}=\dfrac{9\pi}{4}.[/tex]
And, the required negative co-terminal angle is given by
[tex]C_n=\dfrac{\pi}{4}-2\pi=\dfrac{\pi-8\pi}{4}=-\dfrac{7\pi}{4}.[/tex]
Thus, the positive co-terminal angle is [tex]\dfrac{9\pi}{4}.[/tex] and the negative co-terminal angle is [tex]-\dfrac{7\pi}{4}.[/tex]
