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Get ready for AP® Calculus
Course: Get ready for AP® Calculus > Unit 3
Lesson 7: Verifying inverse functions by composition- Verifying inverse functions from tables
- Using specific values to test for inverses
- Verifying inverse functions by composition
- Verifying inverse functions by composition: not inverse
- Verifying inverse functions by composition
- Verify inverse functions
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Verifying inverse functions from tables
CCSS.Math:
Inverse functions undo each other. Functions s and t are inverses if and only if s(t(x))=x and t(s(x))=x for every x-value in the domains. Created by Sal Khan.
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first! first time I've seen a Khan video without any comments here. Awesome video! Keep it up!(23 votes)
THANK YOU! The videos are super helpful and straight to the point.(9 votes)
Is there a relationship between the composite function s(t(x)) having all of its values equal and function s(x) and function t(x) being inversible or is it just a coincidence in this particular problem?(2 votes)
If the composite function s(t(x)) has all of its values equal, this implies that the function t(x) maps all inputs to the same output, which means that t(x) is a constant function. Let's call this constant output "c".
If t(x) is a constant function with output "c", then the composite function s(t(x)) simplifies to s(c) for all inputs of x. Therefore, if s(t(x)) has all of its values equal, then s(c) must also have a constant value.
If s(c) has a constant value, this implies that the function s(x) must also be a constant function, since it maps all inputs to the same output.
In summary, if the composite function s(t(x)) has all of its values equal, then both function s(x) and function t(x) must be constant functions, and in this case, they are trivially inverses of each other. However, it should be noted that this is a special case and does not necessarily apply to all situations where the composite function has all of its values equal.(1 vote)
If the tables didn't give all of the function input-output pairs, would the function not have been inverses of each other?(1 vote)- If a function does not give all of the input-output pairs for both functions, then it is possible that the functions may not be inverses of each other. In order for two functions to be inverses of each other, they must satisfy the following criteria:
1. Each input of one function corresponds to a unique output of the other function.
2. The composition of the two functions in either order results in the identity function.
If the tables do not give all of the input-output pairs for both functions, it may be impossible to determine if the functions satisfy these criteria, and thus whether they are inverses or not. In such cases, additional information or data would be needed to determine if the functions are inverses of each other.(1 vote)
Here we haves(x) = t^-1(x).
Does this meant(x) = s^-1(x)?(0 votes)
Yes, assuming both functions are invertible to begin with. Taking the inverse of an inverse function will yield the original function.(1 vote)
Video transcript
- [Instructor] We're told
the following tables, give all of the input output pairs for the functions S and T. So we see this first table
here, we have some Xs and then they tell us what
the corresponding S of X is. And then in this table
that we have some Xs and they tell us the corresponding T of X. It says complete the table
for the composite function, S of T of X, we wanna fill
in these five entries here. And then they ask us our S and T inverses. So pause this video and see
if you can figure this out on your own before we
work through it together. All right, now let's work
through this together. So let's just remind ourselves what's going on with a
composite function like this. So you're going to take some X value and it looks like we're
first going to put it into the function T, that
is going to output T of X. And then we're gonna take
that output, take that T of X, and then it will be the input into S. So then we're gonna input that into S and then that would output
S of what we inputted which in this case is T of X. So let's go on that journey. So what we're gonna do is
first take these numbers, put them into the function,
T figure out what it outputs and then take that output and then put it into the function S, it's going to be a fun little ride. All right, so when X is equal to 12, we're gonna put it into
our function T first. So when X is an input into T the output is equal to negative one. So that's our T of X, and there
we're take this negative one and input it into S, so negative one here. And when you input that into
S you get as the output, S of negative one is 12,
so S of T of X is 12. So interestingly, this is 12. Now let's do the next one. So when we input 18 into
T, so the 18 is the input. The T of X, T of 18 is two. And then if we wanna do, if
we wanna input that into S, so this is gonna be the input
into S, the output is 18. Very interesting,
alright, let's keep going. So when we input 61 into
T, the output is eight. Then when we take eight
and we input it into S of X or S of eight I should
say, is going to be 61. All right, things are looking good so far and I'm running out of
colors, I'll do green. So when we take 70 and we input it into T, T of 7O is seven, when you
take seven and input it into S you get 70, all right. And then one last one I
will do in this blue color. When you take 100, input it
into T it outputs negative five you take negative five
input into S you get 100. So in every situation
that we have looked at right over here, in all
of these situations, we see that S of T of X is equal to X, which inclines us to believe
that they are inverses. Remember if these two are
inverses of each other, this would be true and also T of S of X is going to be equal to X. But we don't really know 100% unless we know that we have
looked at every combination in the domains for each of them. Now, when you look at these,
the two tables up here and I could have done this,
this is the one we looked at on our journey to get to
this 12 right over here. The following table gives
all of the input output pairs for the function S and T. So this right over here is
the domain for the function S and this right over here is
the domain for the function T. So because for every
member of the function S, every member of the
domain of the function S, the corresponding output right over there is the domain for the function T and it takes us back to where we began. And then the opposite is true as well, for every member of the
domain of T, what it outputs, that is the all of the
possible inputs for X and they all take us
back to where we began. So yes, the functions are inverses.