Question

How do you graph `r=2sec(theta+45^circ)`?

Answer 1

See graph and explanation.

Explanation:

Use `( x, y ) = r ( cos theta, sin theta )`.

Here,

2 = `r cos (theta + pi/4 )`

`= r ( cos theta cos (pi/4) - sin theta sin (pi/4))`

`=1/sqrt2( x - y )`, giving

`x - y = 2 sqrt 2`.

Note that the general polar equation of a straight line is

`r = p sec (theta - alpha)`, with polar `( p, alpha )` as the foot of

the altitude, from the pole, upon the straight line.

Here, the foot of the perpendicular is `( 2, -pi/4)`. See this plot on

the graph. In Cartesians, this is `( sqrt 2, - sqrt 2 )`

graph{(x - y - 2 sqrt 2)((x-1.414)^2+ (y+1.414)^2-0.01) = 0}