Find the point(s) on the parabola x= y^2-8y+18 closest to (-2,4)

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Homework Help Overview

The problem involves finding the point(s) on the parabola defined by the equation x = y² - 8y + 18 that are closest to the point (-2, 4). This falls within the subject area of optimization in calculus, specifically dealing with distances in a coordinate plane.

Discussion Character

  • Exploratory, Conceptual clarification, Mathematical reasoning, Problem interpretation

Approaches and Questions Raised

  • Participants discuss using the distance formula to find the closest point, with one poster expressing uncertainty about their differentiation process. Others suggest considering geometric interpretations, such as the perpendicular line from the point to the parabola. There is mention of using Lagrange's multipliers as an alternative approach, and some participants question the necessity of calculus for this problem.

Discussion Status

The discussion is ongoing, with various approaches being explored. Some participants have provided guidance on using geometric considerations and completing the square, while others are still focused on the algebraic method involving the distance formula. There is no explicit consensus on the best method yet.

Contextual Notes

Some participants note that the problem may not require calculus, suggesting that completing the square could simplify the process. There is also a reference to the Rational Root Theorem and numerical methods for solving cubic equations, indicating the complexity of the algebra involved.

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Homework Statement



Find the point(s) on the parabola x= y^2-8y+18 closest to (-2,4)

Homework Equations





The Attempt at a Solution


Using the distance formula I found that d^2 = y^4 - 16y^3 + 105y^2 - 328y + 416
after differentiating I have 2d' = 4y^3 - 48y^2 + 210y -328
I'm not sure what to do now, or what I may have done wrong, any help is appreciated.
Thanks!
 
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I'd have used the fact that the point closest to (-2,4) will lie on the line that passes through (-2,4) and is perpendicular to the parabola at the point where they cross.
 
Unredeemed said:
I'd have used the fact that the point closest to (-2,4) will lie on the line that passes through (-2,4) and is perpendicular to the parabola at the point where they cross.

I don't understand what you mean. We were just taught to use the distance formula D^2 = (X2-X1)^2 + (Y2-Y1)2
I subbed in -2 as x1 and 4 as y1 then the equation of x= y^2 -8y + 18 as X2. Am I doing it wrong?
 
I feel like using the distance formula is over complicating things. After all, you haven't been asked to find the ACTUAL distance, just the point which is closest. You could do that by minimising the distance, but I think it's easier to think about what this would look like on the graph.

So, the closest point on the parabola is the point which lines on the line which passes through (-2, 4) and intersects the parabola at a right angle.
 
If you have studied Lagrange's multipliers, that might be the easiest solution.

Otherwise, stick with Unredeemed's advice about the geometrical consideration: minimizing the metric formula yields a cubic equation, as you have already learnt.
 
Unredeemed, can you please show me how to go on with the process you are talking about? We were taught to find the distance formula then differentiate and solve when it is 0. I've never studies Lagrange's multipliers.
 
Voko, what would the constraint equation be if you applied the method of Lagrange multipliers?
 
physphys said:

Homework Statement



Find the point(s) on the parabola x= y^2-8y+18 closest to (-2,4)

Homework Equations





The Attempt at a Solution


Using the distance formula I found that d^2 = y^4 - 16y^3 + 105y^2 - 328y + 416
after differentiating I have 2d' = 4y^3 - 48y^2 + 210y -328
I'm not sure what to do now, or what I may have done wrong, any help is appreciated.
Thanks!

So far, so good. Now you just need to solve a cubic equation in y. You could try using the Rational Root Theorem, or try to solve the equation numerically, or use the exact formula for the roots of a cubic.
 
You don't have to use any Calculus for this particular problem. Completing the square, x= y^2-8y+18= y^2- 8y+ 16+ 2= (y- 4)^2+ 2. Notice what the vertex is.
 
  • #10
Alcubierre said:
Voko, what would the constraint equation be if you applied the method of Lagrange multipliers?

The equation of the parabola. Minimizing the square of the distance to the point given.
 
  • #11
physphys said:
1

The Attempt at a Solution


Using the distance formula I found that d^2 = y^4 - 16y^3 + 105y^2 - 328y + 416
after differentiating I have 2d' = 4y^3 - 48y^2 + 210y -328


Follow HallsofIvy's hint, write the equation of the parabola in the form x=(y-4)^2+2, by completing the square. Write up d^2 with that formula without expanding it and differentiate. You can also plot out the function and the point and see the solution at once

ehild
 

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