Four identical mirror are made to stand vertically to form a square arrangement as shown in a top view. A ray starts from the midpoint M of mirror AD and after two reflections reaches corner D. Then, angle theta must be

Four identical mirror are made to stand vertically to form a square ar

1.	Four identical mirror are made to stand vertically to form a square arrangement as shown in a top view. A ray starts from the midpoint M of mirror AD and after two reflections reaches corner D. Then, angle theta must be
Answer» `tan^(-1)(0.75)` `COT^(-1)(0.75)` `sin^(-1)(0.75)` `COS^(-1)(0.75)` Solution :The ray starting from point M at an angle `theta` reaches the corner D at the right along a parallel path. Let a be the length of the side. From figure, `tan theta = (x)/((a//2)) "…."(i)` `tan theta = (a-x)/(y) "….."(ii) , tan theta = (a)/(a-y) "...."(iii)` From (i) and (ii) we get `(2X)/(a) = (a-x)/(y)` or `2xy = a^(2) - xa"......"(iv)` From (ii) and (iii), we get `(a-x)/(y) = (a)/(a-y) rArr 3xy = 2ay` (Using (iv)) `x = (2a)/(3)` Substituting this VALUE of x in equation (i), we get `tan theta = ((2a//3))/((a//2))= (4)/(3), :. cot theta = (1)/(tan theta) = 3/4` or `theta = cot^(-1)(0.75)`

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Four identical mirror are made to stand vertically to form a square arrangement as shown in a top view. A ray starts from the midpoint M of mirror AD and after two reflections reaches corner D. Then, angle theta must be

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