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Title: Math Question Post by: µ on October 08, 2014, 03:42:24 AM FIGURED OUT THE ANSWER
Title: Re: Math Question Post by: nsimmons on October 08, 2014, 07:57:49 AM the plane is parallel to the lines, take the cross product of the lines, this is the normal of the plane, crossproduct can be in either direction, +/-
a(x-x0) + b(y-y0) +c(z-z0) = d Plug in the normal (a,b,c) and a point on the plane, simplify. http://tutorial.math.lamar.edu/Classes/CalcIII/EqnsOfPlanes.aspx [edit] line vectors l1 (1, -3, 1) l2 (-1, 1, 2) the equations given are parametric forms of lines l1xl2 = n = (a,b,c) Title: Re: Math Question Post by: µ on October 09, 2014, 01:58:55 AM Thank you for your answers to my question cryptworld, fsb4000 and nsimmons.
I will still take a look myself at this problem and see if i can get this to work, and if your replies was correct step by step with right answer i also want to give you a few parts of BTC for the help. After this post i don't need any more help with this anymore. Thanks so far :) Greetings from µ and we stay in touch cryptworld, fsb4000 and nsimmons. |