U1S4V17 Tangent line of a polynomial.txt

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Hi, welcome to recitation.
In lecture, you've learned how to compute derivatives
of polynomials and you've learned
the relationship between derivatives and tangent lines.
So let's do a quick example that puts those two ideas together.
So here I have a question on the board--
compute the tangent line to the curve y
equals x cubed minus x at the point (2,6).
So why don't you take a minute, work on that yourself.
Pause the video.
We'll come back, and we'll do it together.

Welcome back.
So we have this function-- y equals x cubed minus x.
Let's just draw a quick sketch of it.

So looks to me like it has 0's at 0,1, and minus 1,
and it does something like this in between--
Very rough sketch there--
and way over-- well, we'll call that the point (2,6).
And that's a little sketchy, but all right.
So we want to know what the tangent line
to the curve at that point is.
So in order to do that, we need to know
what it's derivative is.
And then that will give us the slope.
And then with the slope, we have the slope and we have a point.
So we can slap that into, say, your point slope
formula for a line.
So the derivative of this function is y prime.
So here we have a sum of two things,
and they're both powers of x.
And so we learned our rules for a power
of x that the derivative of x to the n
is n times x to the n minus 1.
And so we also learned that the derivative
of a sum of two things is the sum of the derivatives.
So in this case, so the derivative
of x cubed minus x is 3x squared minus 1.
So this is the slope of the function in terms of x.
But in order to compute the tangent line,
we need the slope at the particular point in question.
This is really important.
So we aren't going to use 3x squared plus 1 as our slope.
We want the slope at the point x equals 2.

So what we want for the slope of the tangent line
is y prime of 2.
We want it at this point when x is equal to 2.
So that's equal to--
well, 3 times 2 squared is 12 minus 1 is 11.
So this is the slope.

This is the slope of the tangent line.
So I just want to say this one more time for emphasis.
This is a really common mistake that we
see on lots of homework and exams
when we're teaching calculus.
You have to remember that when you compute
the slope of the tangent line, you compute the derivative
and then you need to plug-in the value of x
at the point in question, or the value of x and y.
You need to plug-in the values of the point that you have.
So here the derivative is 3x squared minus 1.
So the slope at the (2,6) is 11.
It's just a number, that the slope at that point
is that particular number.
So now to compute the tangent line, we have a point (2,6),
and we have a slope 11.
So we can plug in the point slope form.

So the equation of the tangent line is--
so y minus 6 is equal to 11 minus x minus 2.
So it's y minus y0 is equal to the slope times x minus x0.
If you like, some people prefer to write
their equations of their lines in slope intercept form.
So if you wanted to do that, you could just
multiply through by 11 and then bring the constants together.
So we could also, say, or y equals 11x--
well, we get minus 22 plus 6.
It's minus 16.
So either of those is a perfectly good answer
to the question.
So that's that.