Answer:
Step-by-step explanation:
Given the inequality cosθ>−sinθ, to get the value of [tex]\theta[/tex] that falls within the range π/2≤θ<3π/2, the following steps must be followed;
Step 1;
Divide both sides by cosθ;
cosθ/cosθ>−sinθ/cosθ
1>−sinθ/cosθ
1>-tanθ
Step 2;
Multiplying both sides by -1
-1<tanθ
tanθ>-1
θ>[tex]tan^{-1} -1[/tex]
θ>-45°
Since tan is negative in the second and 4th quadrant;
In the second quadrant θ>180-45
θ>135°
θ>3π/4
in the 4th quadrant, θ>360-45
θ>315°
θ>9π/4
The only value that falls within the range is at when θ>3π/4
