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Let functions are defined from set `A` to set `B` where `B={alpha,beta}` and `alpha` & `beta` are the roots of the equation `t^(2)-sqrt(2)t-pi=0` then the number of functions which areA. discontinuous only at each even inegers if `A=[0,11]` is 682B. discontinuous only at each odd integer if `A=[0,11]` is 243C. discontinous only at prime numbers if `A=[0,11]` is 81D. discontinuous only at `x=5k(kepsilon I^(+))` if `A=0,11]` is 27 |
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Answer» Correct Answer - B::C (A) `2C_(1)(2xx2-1)^(5)` (B) `(2xx2-1)^(5)xx1` (C) `(2xx2-1)^(4)xx1` (D) `(2xx2-1)^(2)=9` |
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