Paramentric eq. of tangent line

Calcgeek123 · Dec 6, 2009

Homework Statement

Find the equation of the tangent line to f(t)=<cot(t),csc(t)> at the point (1/sq.rt of 3, 2/sq.rt of 3)

Homework Equations

n/a

The Attempt at a Solution

I started by finding the slope, y'/x', so I got csc(t)cot(t)/csc^2(t). I then used the equation of a line, y=mx+b. Doesn't a tangent line have the opposite slope? So I think i'd plug in 2/sq.rt of 3 for y, csc^2(t)/csc(t)cot(t) for the slope, 1/sq.rt of 3 for x, and then solve for b. Do I need to plug in my x and y points though into the slope? Then that gets tough because I don't know what csc^2(1/sq. rt of 3) is. Any suggestions?

LCKurtz · Dec 6, 2009

Calcgeek123 said:

Homework Statement

Find the equation of the tangent line to f(t)=<cot(t),csc(t)> at the point (1/sq.rt of 3, 2/sq.rt of 3)

Homework Equations

n/a

The Attempt at a Solution

I started by finding the slope, y'/x', so I got csc(t)cot(t)/csc^2(t).

Any law against simplifying that?

I then used the equation of a line, y=mx+b.

Why use that form instead of the form y - y₀ = m(x - x₀)? After all, you are given a point on the curve through which the line must pass.

Doesn't a tangent line have the opposite slope?

Opposite? Isn't the slope of the tangent line defined to be the slope of the curve?

So I think i'd plug in 2/sq.rt of 3 for y, csc^2(t)/csc(t)cot(t) for the slope, 1/sq.rt of 3 for x, and then solve for b. Do I need to plug in my x and y points though into the slope? Then that gets tough because I don't know what csc^2(1/sq. rt of 3) is. Any suggestions?

Can't you figure out what t gives the point in question and just use it in your calculations?

ramb · Dec 6, 2009

I say you should try to figure out what value of t makes that point. Once you do that you can derive that vector equation, then with the derivative you can find the slope at any given point. With that slope you can find the equation of the line.

Calcgeek123 · Dec 7, 2009

Thank you! I took the advice from the first post, and I've ended up with y-csc(t)=cos(t) (x-csc(t)). Now I'm just lost as to what to do with the point I've been given, (1/sq. rt of 3, 2/sq. rt of 3). I could plug in those numbers into the equation i arrived at for x and y, but then what would i solve for?

ramb · Dec 7, 2009

do what i said on my post after that, because if you have the derived vector equation, you need to plug in a t value

Paramentric eq. of tangent line

Homework Statement

Homework Equations

The Attempt at a Solution

Homework Statement

Homework Equations

The Attempt at a Solution

Related to Paramentric eq. of tangent line

1. What is the point-slope form of the parametric equation of a tangent line?

2. How do you find the slope of a tangent line using parametric equations?

3. Can you find the equation of a tangent line using only parametric equations?

4. How do you determine if a point lies on a tangent line using parametric equations?

5. Can parametric equations be used to find the equation of a tangent line to a curve at a point that is not on the curve?

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