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Relations and Functions

Short Answer Type

361. how that f : A → B and g : B → C are onto, then g of : A → C is also onto.

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362. Let f : X → Y be an invertible function. Show that f has unique inverse.

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363.

Let f : x → Y be an invertible function. Show that the inverse of f^–1 is f,

i.e.(f^–1)^–1 = f.

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364. If f : R → R defined as $straight f left parenthesis straight x right parenthesis equals fraction numerator 2 straight x minus 7 over denominator 4 end fraction$ is an invertible function, find f^–1.

straight f left parenthesis straight x right parenthesis equals fraction numerator 2 straight x minus 7 over denominator 4 end fraction

Let y = f(x)

therefore

straight y equals fraction numerator 2 straight x minus 7 over denominator 4 end fraction

rightwards double arrow

4y = 2x - 7

rightwards double arrow

2x = 4y + 7

therefore space space space space straight x equals fraction numerator 4 straight y plus 7 over denominator 2 end fraction space space space space space space space space space space space space space space rightwards double arrow space straight f to the power of negative 1 end exponent left parenthesis straight y right parenthesis space equals space fraction numerator 4 straight y plus 7 over denominator 2 end fraction therefore space space space space straight f to the power of negative 1 end exponent left parenthesis straight x right parenthesis space space equals space fraction numerator 4 straight x plus 7 over denominator 2 end fraction

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365.

Let f : N → Y be function defined as f (x) = 4 x + 3, where, Y = {y ∈N : y = 4 x + 3 for some x ∈ N}. Show that f is invertible. Find the inverse.

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366. Let Y = { n² : n ∈ N} ⊂ N. Consider f : N → Y as f(n) = n². Show that f is invertible. Find the inverse of f.

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367.

Let R be the relation in the set N given by R = {(a, b) : a = b – 2, b > 6}. Choose the correct answer. (A) (2, 4) ∈ R (B) (3, 8) ∈ R (C) (6, 8) ∈ R (D) (8, 7) ∈ R

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368.

Show that the function f : R_. → R_. defined by $straight f left parenthesis straight x right parenthesis equals 1 over straight x$ is one-one and onto, where R_. is the set of all non-zero real numbers. Is the result true, if the domain R_. is replaced by N with co-domain being same as R_.?