Answer:
Picture 1: b
Picture 2: d
Picture 3: c
Step-by-step explanation:
Hi there,
For Picture 1, to solve for an inverse function, just simply solve for x. Since the closest you can get is arccos(πx)=2y+6, you just
solve for cosine as a function: cos(2y+6)=πx and solving for x:
x= (1/π)cos(2y+6) but since variable choice is arbitrary, you can now redefine y and x:
y= (1/π)cos(2x+6)
For Picture 2, tanx is equivalent to sinx/cosx and cscx is just the reciprocal of sinx. So, it becomes:
[tex]\frac{sinx}{cosx} *\frac{1}{sinx} =\frac{1}{cosx} =cscx[/tex]
We have already been giving the cosine value of 2, and its inverse is thus 1/2.
For Picture 3, I would recommend revisiting polar coordinates.
Polar coordinates are in the form (r, θ).
[tex]r = \sqrt{x^{2} +y^{2} } }[/tex] and θ [tex]=arctan(\frac{y}{x})[/tex] . Recognize there are two possible radii, depending on what side of the circle you start from!
thanks,
