Functional Equations

ABC1234 · 2017-04-11 12:31:10

Please help on the following:

1) Suppose that f(x) and g(x) are functions which satisfy f(g(x)) = x^2 and g(f(x)) = x^3 for all x >= 1. If g(16) = 16, then compute

. (You may assume that f(x) >= 1 and g(x) >= 1 for all x >= 1.)

2) The function

satisfies for all real x. Find f(x).

3) Suppose we have the following identity:

Find the minimum of

Thanks for the help!

bobbym · 2017-04-11 22:26:38

Hi;

Bob · 2017-04-12 03:44:17

hi ABC1234

Q2. If you replace x with (1-x) throughout in the given equation, you can use both equations to eliminate f(1-x) and hence get an expression for f(x).

Still thinking about Q1.

LATER EDIT:

Let y = log (g(4)) then g(4) = 2^y

Evaluate f(g(4)) and g(f(2^y))

Using the given g(16) = 16 you can work out y.

Bob

Last edited by Bob (2017-04-12 06:53:01)

ABC1234 · 2017-04-12 10:39:41

for question 2 I got

. Is that right?

For Q1 I'm getting that y=4/3

Bob · 2017-04-12 20:44:14

Q1. That's what I got too.

Q2. Oh. So I've actually got to do the algebra. OK give me 5 mins or so.

BACK AGAIN. Took a bit longer because I got a slightly different result. So I tested each by setting x = 2 and evaluating the original equation left and right to see if that value of x gave the same result for both. Sorry to say mine worked and yours didn't.

So I think there's one sign mistake in your answer. I'll leave you to find it.

Bob

Last edited by Bob (2017-04-12 21:05:14)

ABC1234 · 2017-04-13 10:15:01

for Q2 I got

but it wasn't right...am I still doing something wrong?

UPDATE:
Never mind, I just had to simplify it

Last edited by ABC1234 (2017-04-13 10:16:16)

thickhead · 2017-04-13 18:59:25

Last edited by thickhead (2017-04-13 19:48:35)

Bob · 2017-04-13 23:25:10

hi ABC1234

That expression looks better. And it cancels down to thickhead's answer. So we are all in agreement.

Bob

ABC1234 · 2017-04-14 09:36:58

I also need some help on this problem:
Find all functions

that satisfy for all nonzero x.

I know I'm supposed to substitute (x-1)/x for x, but I don't seem to be getting anywhere with that. Thanks in advance!

zetafunc · 2017-04-14 10:44:25

Has the uniqueness of the solution to (2) been justified?

thickhead · 2017-04-14 15:50:24

ABC1234 wrote:

I also need some help on this problem:
Find all functions
that satisfy
for all nonzero x.
I know I'm supposed to substitute (x-1)/x for x, but I don't seem to be getting anywhere with that. Thanks in advance!

Being a homework problem I can give only hint.
In the previous problem you went from A to B and directly returned to A. Now try going from A to B , B to C and from there to A.

Bob · 2017-04-15 04:10:59

zetafunc wrote:

Has the uniqueness of the solution to (2) been justified?

Oh? Am I missing something here? The substitution x --> 1-x is valid for all real x. The pair of simultaneous equations have a unique solution; leading to f(x) as a quartic over a quadratic. The cancelling is valid providing the quadratic is not zero; which happens at two values. But f(x) is continuous through both so it's even ok then.

So I'll be most surprised when you supply a second function for f(x).

Bob

thickhead · 2017-04-15 22:06:54

(1) My answer is 4/3.

Math Is Fun Forum

#1 2017-04-11 12:31:10

Functional Equations

#2 2017-04-11 22:26:38

Re: Functional Equations

#3 2017-04-12 03:44:17

Re: Functional Equations

#4 2017-04-12 10:39:41

Re: Functional Equations

#5 2017-04-12 20:44:14

Re: Functional Equations

#6 2017-04-13 10:15:01

Re: Functional Equations

#7 2017-04-13 18:59:25

Re: Functional Equations

#8 2017-04-13 23:25:10

Re: Functional Equations

#9 2017-04-14 09:36:58

Re: Functional Equations

#10 2017-04-14 10:44:25

Re: Functional Equations

#11 2017-04-14 15:50:24

Re: Functional Equations

#12 2017-04-15 04:10:59

Re: Functional Equations

#13 2017-04-15 22:06:54

Re: Functional Equations

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