Answer
A line with $x$-intercept =1 and $y$-intercept =1
Work Step by Step
The conversion of polar coordinates and Cartesian coordinates are described as follows:
1. $r^2=x^2+y^2$ and $r=\sqrt {x^2+y^2}$
2. $\tan \theta =\dfrac{y}{x} \implies \theta =\tan^{-1} (\dfrac{y}{x})$
3. $x=r \cos \theta$ and 4. $y=r \sin \theta$
As we know that $x=r \cos \theta$ and $y=r \sin \theta$
Thus, the Cartesian equation is $x+y=1$
Hence, its shows a line with $x$-intercept =1 and $y$-intercept =1