Rachel Maddiee Posted December 16, 2019 Posted December 16, 2019 Can someone please help me with this question?
mathematic Posted December 16, 2019 Posted December 16, 2019 (edited) 9.\( d^2=(x-6)^2+(y-2)^2\), where \(y=6x+3\). Or \(d^2=(x-6)^2+(6x+1)^2.\) To minimize calculate derivative and set to 0. \(2(x-6)+12(6x+1)=0\) leading to x=0 and y=3 or \(d^2=37\). 10. Statement is incomplete. Edited December 16, 2019 by mathematic latex setup 1
Rachel Maddiee Posted December 17, 2019 Author Posted December 17, 2019 Can you help me with the justification/explanations?
mathematic Posted December 17, 2019 Posted December 17, 2019 First equation is distance between given point and any point on any line. Next replace y by function of x for given line. Use calculus to get minimum distance and get particular point on line that is minimum.
Rachel Maddiee Posted December 18, 2019 Author Posted December 18, 2019 Can you show me using this method?
mathematic Posted December 18, 2019 Posted December 18, 2019 The problem you have is different from the problem in the post (2.10) - distance between parallel lines.
Rachel Maddiee Posted December 19, 2019 Author Posted December 19, 2019 Yes, it’s an example of the accepted method.
mathematic Posted December 20, 2019 Posted December 20, 2019 It looks to me the first step for two parallel lines is pick a point on one line and then find the distance to the other line. An alternative (without calculus) to the solution I had described is to set up the general form of a line perpendicular to the given line and then adjust one parameter to make it pass through the given point. 1
Rachel Maddiee Posted December 20, 2019 Author Posted December 20, 2019 The shortest distance between a point and a line (which is what is meant by "the" distance between them) is along a line perpendicular to the line. The line is given by y= 6x+ 3 so has slope 6. A line perpendicular to that has slope -1/6. The line through (6, 2) with slope -1/6 is y= (-1/6)(x- 6)+ 2 so 6y= -x+ 6+ 12 or x+ 6y= 18 Substitute (two lines which intersect) y=6x+3 into x+6y=18 and you get: x + 6(6x+3) = 18. x + 36x +18 = 18 37x +18 =18 37x = 0 x = 0 So that means that x=0 at the point where the lines y=6x+3 into x+6y=18 intersect. Substitute y = 6x + 3 y = 6(0) + 3 = 3 y = 3 The point of intersection is (0, 3). Then, use the distance formula to find the exact distance between (0,3) and 6,2) d^2 = (x2 - x1)^2 + (y2 - y1)^2 So the distance between (0, 3) and (6, 2), squared, D^2= (0- 6)^2+ (3- 2)^2= 37 and then D= square root (37). 1
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