Consider set `A = {x_(1), x_(2), x_(3), x_(4), x_(5)}` and set `B = {y_(1), y_(2), y_(3)}`. Function f is defined from A to B.
Number of function from A to B such that `f(x_(1)) = y_(1)` and `f(x_(2)) != y_(2)` is

Consider set A={x_(1),x_(2),x_(3),x_(4)} and set B={y_(1),y_(2),y_(3)} Function f is defined from A to B

Let A={x_(1),x_(2),x_(3),x_(4)),B={y_(1),y_(2),y_(3),y_(4)} and function is defined from set Ato set B Number ofone- one function such that f(x_(1))!=y_(1) for i=1,2,3,4 is equal to

Let A={x_1,x_2,x_3,x_4,x_5},B={y_1,y_2,y_3,y_4}, Function f is defined from A to B. Such that f(x_1)=y_1, and f(x_2)=y_2 then, number of onto functions from A to B is (A) 12 (B) 6 (C) 18 (D) 27

If A = {x_(!) , y_(1), z_(1)} and B = {x_(2), y_(2)} , then the number of relations from A to B is

The function y=f(x) such that f(x+(1)/(x))=x^(2)+(1)/(x^(2))

The A={x_(1),y_(1),z_(1)} and B={x_(2),y_(2)}, then the number of relations from A to B is

A={x_(1),x_(2),x_(3),x_(4),x_(5)},B={y_(1),y_(2),y_(3),y_(4),y_(5)} A one-one mapping is selected at random from the set of mapping from A to B, the probability that it satisfies the condition f(x_(1))!=y_(1),i=1,2,3,4,5 is

Let A={x_(1),x_(2),x_(3)....,x_(7)},B={y_(1)y_(2)y_(3)} . The total number of functions f:AtoB that are onto and ther are exactly three elements x in A such that f(x)=y_(2) , is equal to

A set A={x_(1),x_(2),x_(3),x_(4)} and set B={y_(1),y_(2),y_(3),y_(4)} and a mapping is randomly selected out of all f:A rarr B . The probability that f is many to one is (A) (29)/(32) (B) (3)/(32) (C) (9)/(32) (D) (3)/(64)