How Can You Approximate 8.1^(1/3) Using a Tangent Line?

Neil6790 · Oct 28, 2008

Let f(x) = x^(1/3). The equation of the tangent line to f(x) at x = 8 can be written in the form y = mx+b where m is: and where b is:
Using this, we find our approximation for 8.1^(1.3) is:

I found the slope to be 1/12
I found b to be 1.3333333333333333333
I still can't get the answer for the approximation for 8.1^(1/3).
I plugged it correctly in the mx+b equation but it won't work.
Is there another way to do this? Please help.

Neil

Mark44 · Oct 29, 2008

The exact equation for your tangent line at (8, 2) is
y = 1/12 * x + 4/3

When x = 8.1, what is the value of y on the tangent line? That's your approximation for (8.1)^(1/3).

HallsofIvy · Oct 29, 2008

Perhaps simpler: y= (1/12)(x- 8)+ 2.

Edited thanks to Mark44.

Mark44 · Oct 29, 2008

HallsofIvy said:

Perhaps simpler: y= (1/12)(x- 4)+ 2

Halls,
The line has to pass through (8, 2), not (4, 2). You might have overlooked the fact that we're dealing with the cube root function, not the square root function.
Mark

Neil6790 · Oct 29, 2008

Thanks a lot for the help. I was able to get the answer.

Neil

How Can You Approximate 8.1^(1/3) Using a Tangent Line?

1. What is a math approximation problem?

2. How do you solve a math approximation problem?

3. What are the benefits of using approximation in math?

4. Can you provide an example of a math approximation problem?

5. How accurate should an approximation be in math?

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