Since the measure of angle [tex] \Theta [/tex] is [tex] \frac{7\Pi }{4} [/tex]
The measure of its reference angle = [tex] \frac{7\times 180^{\circ}}{4} [/tex]
=[tex] =315^{\circ} [/tex]
Now we have to compute the value of [tex] \tan \Theta [/tex]
[tex] \tan \Theta = \tan \frac{7\Pi }{4} [/tex]
[tex] = \tan (2\Pi -\frac{\Pi }{4}) [/tex]
The value of ([tex] (2\Pi -\frac{\Pi }{4}) [/tex]) lies in the fourth quadrant. In fourth quadrant, the value of tan is always negative.
So, [tex] \tan (2\Pi -\frac{\Pi }{4}) [/tex]
[tex] = -\tan (\frac{\Pi }{4}) [/tex]
= -1.
