Answer:
θ = 23 degrees
Step-by-step explanation:
We know that [tex]sin(67)=0.9205[/tex] (I)
We also know that cos(θ) = 0.9205 (II)
Because the angle 67 degrees is less than 90 degrees we can use the complementary angles equations
The equations are :
cos (θ) = sin ( 90° - θ ) (III)
sin (θ) = cos ( 90° - θ ) (IV)
tg (θ) = cotg ( 90° - θ ) (V)
We can use the equation (III) to find the angle.
If we equalize (I) and (II) :
[tex]0.9205=0.9205[/tex] ⇒
cos(θ) = sin(67)
Now, If we use the equation (III) :
cos(θ) = sin(67) = sin ( 90° - θ ) ⇒
67 ° = 90 ° - θ
θ = 23 °
We find that the angle θ is 23 °
