Answer:
-0.555
Step-by-step explanation:
The terminal point of the vector in this problem is
(-2,-3)
So, it is in the 3rd quadrant.
We want to find the angle [tex]\theta[/tex] that gives the direction of this vector.
We can write the components of the vector along the x- and y- direction as:
[tex]v_x = -2\\v_y = -3[/tex]
The tangent of the angle will be equal to the ratio between the y-component and the x-component, so:
[tex]tan \theta = \frac{v_y}{v_x}=\frac{-3}{-2}=1.5\\\theta=tan^{-1}(1.5)=56.3^{\circ}[/tex]
However, since we are in the 3rd quadrant, the actual angle is:
[tex]\theta=180^{\circ} + 56.3^{\circ} = 236.3^{\circ}[/tex]
So now we can find the cosine of the angle, which will be negative:
[tex]cos \theta = cos(236.3^{\circ})=-0.555[/tex]
