The Total solution for NCERT class 6-12
Answer - 11 : -
f:{1,2, 3,} –> {a,b,c} so that f(1) = a, f(2) = b, f(3) = cNow let X = {1,2,3}, Y = {a,b,c}∴ f: X –> Y∴ f-1: Y –> X such that f-1 (a)=1, f-1(b) = 2; f-1(c) = 3Inverse of this function may be written as(f-1)-1 : X –> Y such that(f-1)-1 (1) = a, (f-1)-1 (2)= b, (f-1)-1 (3) = cWe also have f: X –> Y such thatf(1) = a,f(2) = b,f(3) = c => (f-1)-1 = f
Answer - 12 : -
f:X —> Y is an invertible functionf is one-one and onto=> g : Y –> X, where g is also one-one and onto such thatgof (x) = Ix and fog (y) = Iy => g = f-1Now f-1 o (f-1)-1 = Iand fo[f-1o (f-1)-1] =folor (fof-1)-1 o (f-1)-1 =f=> Io (f-1)-1 = f=> (f-1)-1 = f
Answer - 13 : -
f:R-> R defined by f(x) = fof (x) = f[f(x)] = = = = x
Answer - 14 : - Range f–> given by(a) (b) (c) (d)
Solution
Itis given that
Let y bean arbitrary element of Range f.
Thus, g isthe inverse of f i.e., f−1 = g.
The correct answer is B.