What is the length of the the shortest path by which one can go from (-2,0) to (2,0) without entering the interior of `x^2+y^2=1`

Let C be the circle of radius 12 centred at (0,0). Then the length of the shortest path in the plane between (8sqrt(3),0) and (0,12sqrt(2)) that does not pass through the interior of C is

In the xy-plane, the length of the shortest path from (0,0) to (12,16) that does not go inside the circle (x- 6)^2+ (y-8)^2= 25 is 10sqrt(3) 10sqrt(5) 10sqrt(3)+(5pi)/(3) 10+5pi

In the xy-plane, the length of the shortest path from (0,0) to (12,16) that does not go inside the circle (x- 6)^2+ (y-8)^2= 25 is 10sqrt(3) 10sqrt(5) 10sqrt(3)+(5pi)/(3) 10+5pi

Q.ys In the xy-plane, the length of the shortest path from (0.0) to (12.16) that does not go inside the circle 6) (y-8) 25 is (D) 10 (B) 10 5 (A) 10 Dps' on Circle

Q.ys In the xy-plane,the length of the shortest path from (0.0) to (12.16) that does not go inside the circle 6)(y-8)25 is (D)10( B )105 (A) 10 Dps' on Circle

The shortest distance of the point (1, 3, 5) from x^(2) + y^(2) = 0 is

The shortest distance of the point (1, 3, 5) from x^(2) + y^(2) = 0 is

The length of the tangent to the circle x^(2)+y^(2)-2x-y-7=0 from (-1, -3), is

The length of the tangent to the circle x^(2)+y^(2)-2x-y-7=0 from (-1, -3), is