Discrete Math: Functions and Set Questions. 1) Consider the function: f:R rightarrow R (Real to Real Number), where f(x)=2+x^2, what would be all of the preimages of 3?

steveo963200054

steveo963200054

Answered question

2022-09-06

Discrete Math: Functions and Set Questions
1) Consider the function: f : R R (Real to Real Number), where f ( x ) = 2 + x 2 , what would be all of the preimages of 3?
1) 11
2) 11, -11
3) 1, -1
4) 1
2) Let D = { a , b , c } and let E = { 2 , 4 }, we will define the function f as f : D E with the following facts.
f ( a ) = 2
f ( b ) = 2
f ( c ) = 4
Based on this information, what is accurate regarding the function of f?
1) f is a "bijection"
2) f is considered to be "one-to-one"
3) f is "onto" and "one-to-one"
4) f is "onto"

Answer & Explanation

Azul Lang

Azul Lang

Beginner2022-09-07Added 20 answers

Step 1
The image f ( X ) = { f ( x ) : x X }. So to find the preimage of 3, you want { x : f ( x ) = 3 }. So set 3 = 2 + x 2 . You should be able to take it from here.
Step 2
For part (ii), a one-to-one function is a function such that f ( a ) = f ( b ) a = b. Here, you have f ( a ) = f ( b ), but a b. An onto function is one such that y E, x D such that f ( x ) = y. In other words, does every element in E get mapped to? Clearly, yes.
A bijection is a one-to-one and onto function.

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