Probability that a one-one function from `{a,b,c,d}` to `{1,2,3,4,5}` satisfies `f(a)+2f(b)-f(c)=f(d)`

If |z|=min(|z-1|,|z+1|}, where z is the complex number and f be a one -one function from {a,b,c} to {1,2,3} and f(a)=1 is false, f(b)!=1 is false and f(c)!=2 is true then |z+barz|= (A) f(a) (B) f(c) (C) 1/2f(a) (D) f(b)

Assertion (A) : The function f:(1,2,3)to(a,b,c,d) defined by f={(1,a),(2,b),(3,c)} has no inverse. Reason (R) f is not one-one.

Which of the following functions from A to B are one-one and onto? f_(1)={(1,3),(2,5),(3,7)};A={1,2,3},B={3,5,7}f_(2)={(2,a),(3,b),(4,c)};A={2,3,4},B={a,b,c}f_(3)={(a,x),(b,x),(c,z),(d,z)};A={a,b,c,d},B={x,y,z}

Let f(x) be continuous functions f:R rarr R satisfying f(0)=1 and f(2x)-f(x)=x Then the value of f(3) is 2 b.3 c.4d.5

Let f" ":" "{1," "2," "3}->{a ," "b ," "c} be one-one and onto function given by f" "(1)" "=" "a , f" "(2)" "=" "b and f" "(3)" "=" "c . Show that there exists a function g" ":" "{a ," "b ," "c}->{1," "2," "3} such that gof=I_x and fog=

Let S" "=" "{a ," "b ," "c}" "a n d" "T" "=" "{1," "2," "3} . Find F^(-1) of the following functions F from S to T, if it exists. (i )" "F" "=" "{(a ," "3)," "(b ," "2)," "(c ," "1)} (ii) F" "=" "{(a ," "2)," "(b ," "1)," "(c ," "1)}

Suppose |[f'(x),f(x)],[f''(x),f'(x)]|=0 is continuously differentiable function with f^(prime)(x)!=0 and satisfies f(0)=1 and f'(0)=2 then (lim)_(x->0)(f(x)-1)/x is 1//2 b. 1 c. 2 d. 0

For all x in [1, 2] Let f"(x) of a non-constant function f(x) exist and satisfy |fprimeprime(x)|<=2. If f(1)=f(2), then (A) There exist some a in (1,2) such that f'(a)=0 (B) f(x) is strictly increasing in (1,2) (C) There exists atleast one c in (1,2) such that f'(c)>0 (D) |f'(x)| lt 2 AA x in [ 1,2]

If f(x) is continuous in [a, b] and differentiable in (a, b), prove that there is atleast one c in (a, b) , such that (f'(c))/(3c^(2))= (f(b)-f(a))/(b^(3)-a^(3)) .