Facebook Page
Twitter
RSS
  • Recent Forum Posts

    MarkFL

    Re: Lagrange Multipliers 2

    I agree that the point $(2,2)$, is the only one that meets all criteria. Now we need to compare the value of $f$ at another point on the constraint, such

    MarkFL Today, 19:21 Go to last post
    MarkFL

    Re: Lagrange Multipliers

    I agree that of the 3 critical points, $(1,1)$ is the only one in quadrant I. Now, we know this is either a maximum or a minimum, and to determine which,

    MarkFL Today, 19:08 Go to last post
    lypena35

    Re: Java array and methods problem

    You are absolutely right. That was a perfect example to help me put things into perspective. It is working now thank you!

    lypena35 Today, 18:40 Go to last post
    Harpazo

    Re: Lagrange Multipliers 2

    Ok. I will take it from x^2 = y^2. I decided to plug x^2 for y^2 in the given constraint which is x^2 + y^2 = 8.

    x^2 + x^2 = 8

    Harpazo Today, 17:57 Go to last post
    Harpazo

    Re: Lagrange Multipliers

    Hello Mark. I got home about 20 minutes ago and decided to head straight to this question. Math helps me forget my problems in life. It may sound silly

    Harpazo Today, 17:40 Go to last post
Math Help Boards