Let S = set of points inside the square, T = the set of points inside the triangle and C = the set of points inside the circle. If the triangle and circle intersect each other and are contained in a square. Then

(a) S ∩ T ∩ C = φ

(b) S ∪ T ∪ C = C

(c) S ∪ T ∪ C = S

(d) S ∪ T = S ∩ C

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8 months ago

$\begin{array}{l} T h e g i v e n c o n d i t i o n s o f t h e q u e s t i o n m a y b e r e p r e s e n t e d b y t h e f o l l o w i n g V e n n d i a g r a m . \\ F r o m t h e g i v e n V e n n d i a g r a m, \\ W e c l e a r l y c o n c l u d e t h a t \\ S \cup T \cup C = s \\ H e n c e, t h e c o r r e c t o p t i o n i s (c) . \end{array}$

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