Inverse Functions (1 Viewer)

jaychouf4n · Mar 7, 2009

Cambridge 3U 1A 18c)

The function f(x) is defined by f(x)=x-1/x

By completing the square or using the quadratic formula show that

inverse (f(x))=1/2(x+root(4+x^2)))

jpmeijer · Mar 7, 2009

Consider:

$y = x - \frac{1}{x}$

For the inverse, swap x and y:

$x = y - \frac{1}{y}$

$xy = y^{2} - 1$

$y^{2} - xy - 1 = 0$ , which is a quadratic in y.

Using the quadratic formula:

$y = \frac{x \pm \sqrt{x^{2} + 4}}{2}$

But now we need to decide whether to take the plus or the minus.
Try substituting a point into the original function. eg let x = 1, which gives y = 0
Therefore (1, 0) lies on the original function.

This means that (0, 1) lies on the inverse.
So if we let x = 0 in $y = \frac{x \pm \sqrt{x^{2} + 4}}{2}$ , then it is clear to get y = 1 we need to take the positive case.

So therefore:

$f^{-1}(x) = \frac{x + \sqrt{x^{2} + 4}}{2}$

jaychouf4n · Mar 7, 2009

OMG im a retard.... i screwed up the making a square.... quadratic formula is sooo much easier XD

thanks alot

I didn't know about the positive thing

You've given me a new technique

Trebla · Mar 7, 2009

Both the positive and negative case are valid, you just have to choose one of them, so that you get a function with 1-1 correspondance. The point (-1, 0) or (0, -1) on the inverse gives the negative case. In other words, either positive or negative case is correct unless some restriction was stated in the question.

jpmeijer · Mar 8, 2009

Trebla said:
Both the positive and negative case are valid, you just have to choose one of them, so that you get a function with 1-1 correspondance. The point (-1, 0) or (0, -1) on the inverse gives the negative case. In other words, either positive or negative case is correct unless some restriction was stated in the question.

Yeah my bad, thanks Trebla.

Inverse Functions (1 Viewer)

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