1.Let RRR be the region of the disc x2+y2≤1x^2 + y^2 \leq 1x2+y2≤1 in the first quadrant. Then the area of the largest possible circle contained in RRR isa.π(3−22)\pi(3 - 2\sqrt{2})π(3−22)b.π(4−32)\pi(4 - 3\sqrt{2})π(4−32)c.π6\frac{\pi}{6}6πd.π(22−2)\pi(2\sqrt{2} - 2)π(22−2)Login to continueOnly logged in users canattempt or see the solution.