Register

Bijective function

596 views
0 votes
0 votes
Let R be set of all real numbers, and

A = B = R*R

A function A-> B is defined by

f(a,b) = (a+b,a-b)

How to prove it is a bijective function?
User Avatar

1 Answer

0 votes
0 votes
Let's there is a value $(x, y)$  in co-domain of $RXR$. From there we can get $a=(x+y)/2$ & $b=(x-y) /2$ and $a, b \epsilon R$. Thus proves Range = Co domain... This also proves for every $(x, y)$, there is unique pair or $(a, b) $. Thus proves function is bijective.
User Avatar
Voting & Accepting an answer helps improve the community
← PreviousNext →
← Previous in categoryNext in category →

Related questions

2 votes
2 votes
0 answers
1
Lakshman Bhaiya asked Oct 7, 2018
575 views
Function f and g
Let $f(x)$ mean that function $f$ ,applied to $x$,and $f^{n}(x)$ mean $f(f(........f(x)))$,that is $f$ applied to $x$ ,$n$ times.Let $g(x) = x+1$ and $h_{n}(x)=g^{n}(x).$Then what is $h_{9}^{8}(72)?$
Let $f(x)$ mean that function $f$ ,applied to $x$,and $f^{n}(x)$ mean $f(f(........f(x)))$,that is $f$ applied to $x$ ,$n$ times.Let $g(x) = x+1$ and $h_{n}(x)=g^{n}(x).$...
User Avatar
2 votes
2 votes
1 answer
2
srestha asked Jan 29, 2018
560 views
Function
User Avatar
2 votes
2 votes
1 answer
3
Shivi rao asked Oct 7, 2017
818 views
Inverse of a function
Consider a function f from A to B such that f : A → B is bijective. f–1 represents inverse of f. Than could we say that f-1 :B->A is also bijective..Please give proper reasoning thanks
Consider a function f from A to B such that f : A → B is bijective.f–1 represents inverse of f.Than could we say that f-1 :B->A is also bijective..Please give proper ...
User Avatar
Link Copied!