Answer:
The solutions of the equation are 120° , 240° ⇒ 4th answer
Step-by-step explanation:
* Lets revise how to solve the trigonometry equation
- At first Look to the domain
- Use the ASTC rule to know the quadrants of the angle x
# A ⇒ in the 1st quadrant all trigonometry functions are positive
# S ⇒ in the 2nd quadrant sin only is positive
# T ⇒ in the 3rd quadrant tan only is positive
# T ⇒ in the 4th quadrant cos only is positive
- Use the calculator to find the acute angle α which has the positive
value of the trigonometry function of x
# In 1st quadrant x = α
# In 2nd quadrant x = 180° - α
# In 3rd quadrant x = 180° + α
# In 4th quadrant x = 360° - α
* Now lets solve the problem
∵ The domain is 0° ≤ x ≤ 360°
∵ cos x = -1/2
- The value of cos x is negative
∴ ∠x is in the 2nd or 3rd quadrants ⇒ according to ASTC rule
- Lets find the acute angle α, where cos α = 1/2
∵ cos α = 1/2
∴ α = 60°
∵ ∠x lies in the 2nd quadrant
∴ x = 180° - α = 180° - 60° = 120°
∵ ∠x lies in the 3rd quadrant
∴ x = 180° + α = 180° + 60° = 240°
* The solutions of the equation are 120° , 240°
