Given f(x) = 2x + 1
⇒ f = {(1, 2(1) + 1), (2, 2(2) + 1), (3, 2(3) + 1), (4, 2(4) + 1)}
= {(1, 3), (2, 5), (3, 7), (4, 9)}
Also given g(x) = x2 − 2
⇒ g = {(3, 32 − 2), (5, 52 − 2), (7, 72 − 2), (9, 92 − 2)}
= {(3, 7), (5, 23), (7, 47), (9, 79)}
So, f and g are bijections and,
Hence, f−1: B → A and g−1: C → B exist.
Therefore, f−1= {(3, 1), (5, 2), (7, 3), (9, 4)}
And g−1= {(7, 3), (23, 5), (47, 7), (79, 9)}
Now, (f−1og−1): C → A
f−1og−1 = {(7, 1), (23, 2), (47, 3), (79, 4)} ...(1)
Also, f: A → B and g: B → C,
⇒ gof: A → C, (gof)−1 : C → A
Therefore, f−1og−1 and (gof)−1 have same domains.
(gof)(x) = g(f(x))
=g(2x + 1)
=(2x +1 )2 − 2
⇒ (gof)(x) = 4x2 + 4x + 1 − 2
⇒ (gof)(x) = 4x2 + 4x − 1
Now, (gof)(1) = g(f(1))
= 4 + 4 − 1
= 7,
(gof)(2) = g(f(2))
= 4 + 4 – 1 = 23,
(gof)(3) = g(f(3))
= 4 + 4 – 1 = 47 and
(gof)(4) = g(f(4))
= 4 + 4 − 1 = 79
Therefore, gof = {(1, 7), (2, 23), (3, 47), (4, 79)}
⇒ (gof) – 1 = {(7, 1), (23, 2), (47, 3), (79, 4)} …(2)
From equations (1) and (2), we get:
(gof)−1 = f−1og−1
