Domain, Codomain, and Range (Correction)

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@muhammadqasim7143 2 жыл бұрын

Very well explained. The idea of explaining codomain using Venn diagram and the use of Quadratic function made it crystal clear to understand the difference between codomain and range. Thank you !

@hbsgamer2877 Жыл бұрын

I agree it cleared a lot of confusion I had and it’s very clear

@faizanali8799 3 жыл бұрын

Best most talented teacher of math

@benjamingiosis4880 4 жыл бұрын

just explain the co domain please!

@Troglodyte2021 4 жыл бұрын

what's the use of codomain after we know the range already? What is the motivation for this concept?

@puruagarwal05 3 жыл бұрын

i have this same question

@tc_iraklis8508 6 ай бұрын

To be able to tell if the function is onto or not ( f is onto if for every y in the co domain there is an x in the domain such that y=f(x) )... Tbh , I don't find a reason for codomain's existence 😁

@alanp741 4 жыл бұрын

But....what's the point of the co-domain? I get that it's basically the possible output of the function but all of the examples you've shown all have the co-domain of ℝ. Are there times when the co-domain isn't just ℝ?

@wiggasknow8261 3 жыл бұрын

How is the codomain of x^2 all real numbers if codomain concerns output? How can x^2 give anything less than zero????

@josephameh882 Жыл бұрын

For f(x) = x^2, what happens to when x=0 so the range is not just positive real numbers but including 0

@HeadphoneTarnish 8 жыл бұрын

First off, given the definitions given in this video, it seems to me that the range can be defined as the minimal codomain- that is, Range = min({A such that A contains the set {f(x) : x is in X}}). Given this understanding, the codomain is a set that includes the range as a subset and possibly additional points that the domain is not mapped to under the function. What interest is the codomain to us then? Is it simply to tell us what kind of set we are mapping into (e.g. the real plane versus the integers), or does it give us some other information about the function? Thanks for the video!

@centerofmath 8 жыл бұрын

Hello! Thank you for watching and commenting on this video. The range is a subset of the codomain. It is dependent on the domain, what values go in the function, and the function itself. The codomain describes all values that could result from the function which is why there are often additional points that do not overlap with the range. This is because the given domain values do not always cover the entirety of what the function is capable of outputting, but the range is only concerned with those domain inputs. As for your question with the codomain, both statements are correct, and the codomain is important. The codomain is a part of the function and it is something that we are free to define as long as it is within reason. For the example of f(x) = x^2, saying the codomain is all real numbers is correct even though the range is positive real numbers. The range is a subset of the codomain and is therefore valid. In addition, defining the codomain (and domain) can change a question, so it is important to consider it. The function f(x) = 2x on the domain and codomain of real numbers is very different from f(x) = 2x on domain and codomain of integers. There are also cases where limiting the codomain allows for a function to be considered a function. The radical symbol does this; the codomain is limited to positive real numbers and zero. That is why you only get one, positive value of f(x) for each x value for f(x) = sqrt(x) even though both 4^2 and (-4)^2 both equal 16. Hope that helped. Let us know if you have any further questions!

@nahimafing 4 жыл бұрын

@@centerofmath I don't really understand codomain, you say its all possible output values but if the function f(x) = x^2 then all output values must be positive so how come you said negatives are included (your defininton of codomain was all possible results of the function with any domain) but anything squared is positive

@agustinbalmaceda3379 2 жыл бұрын

I like how she looks like is speedrunning the lecture.

@PrincessSakuno 3 ай бұрын

OHMYOGD THANK YOU!!!!!!!!! SUCH A GREAT EXPLANATION

@Hazellites 7 жыл бұрын

Cleared up years of confusion. Hahahaha thanks.

@maxwellspiano3580 4 жыл бұрын

I would appreciate it very much if you answer this question: a codomain is the possible outcomes and the range is all the outcomes when the input is a natural number?

@shinYa_ch 3 жыл бұрын

afaik not just N numbers, could be R numbers

@atikmahbubtanjim4279 4 жыл бұрын

Why only normal number become the domen of 3rd example

@pretty_ok 5 жыл бұрын

Are functions like f(x)=2x or f(x)=x^2 limited to Real numbers for convenience? Isn't it possible to use complex numbers as x?

@centerofmath 5 жыл бұрын

Hello William Torkington, It is possible to use complex numbers for x, real numbers were used just as an example.

@israrullah7727 9 ай бұрын

Nice way of instruction

@mlfacts7973 Жыл бұрын

thanks a lot for your explanation

@shlovaski8393 4 жыл бұрын

last example should be from 3 to positive infinity

@princesahu8186 3 жыл бұрын

That's why I disliked the video

@TheXxSPANKERxX 3 жыл бұрын

I FINALLY GET IT!!!!!!!!!!!!!!!!!

@angelopedralvez6388 4 жыл бұрын

The range is a subset of codomain with the same given function😊

@botswanastan7384 3 жыл бұрын

Isn't the domain of x^2+3 minus infinity to positive infinity????

@toby2237 3 жыл бұрын

It can be, but in this example it was defined as only positive wholes numbers including 0

@nishakarandikar8443 8 жыл бұрын

In second example range includes not only positive real numbers but also zero.

@centerofmath 8 жыл бұрын

Thank you for commenting on this video. You are correct! Apologies for the mistake. An annotation has been added to fix this.

@allanhenriques2694 3 жыл бұрын

I feel like the easiest way to differentiate range and codomain would be to say, -codomain is where all elements x in A map to some element(s) f(x) in B, -whereas for a range, each element x in B maps to element(s) in A, and each element in A maps to some element in B

@universalponcho 3 жыл бұрын

This was dope.

@thedeathofbirth0763 4 жыл бұрын

Wow! This person doesn't even know the difference between natural numbers and whole numbers! And she teaches in a college! Mathematics is about precision!

@suchandraac 6 жыл бұрын

Will the domain and the co-domain always be equal?

@centerofmath 6 жыл бұрын

Hi FallingOutWithBoys AtTheDisco, The domain and co-domain will not always be equal. Consider f(x) = x^0.5. The domain for the function can be defined to be only non-negative reals, while we can have the codomain be all reals.

@suchandraac 6 жыл бұрын

Worldwide Center of Mathematics And for that, range will be defined to be non-negetive reals? Thanks for replying :) Great video btw! Keep up the great work.

@centerofmath 6 жыл бұрын

Yup! The range will be non-negative reals.

@suchandraac 6 жыл бұрын

Worldwide Center of Mathematics Thanks again! The video was very helpful!

@yasir.3486 6 жыл бұрын

That means codomain can have all negative and positive real values? if so then could you please give me an example of a negative codomain value from the above function?

@emilywong4601 8 жыл бұрын

Who is the lecturer and where is she from? What level are this lecture?

@centerofmath 8 жыл бұрын

Hello, and thank you for your comment! The lecturer in this video is Chloe, a undergraduate student at Northeastern University. This lecture is at the level of a high school pre-Calculus or Algebra II course, or possibly a College Algebra course.