Find the point of intersection of the pair of straight lines. -5x+7y-0 (x, y) Submit Answer...
(1 point) Find y as a function of x if y" – 7y" + 10y' = 12et, y(0) = 10, y(0) = 29, y' (0) = 10. y(x) = (21/2)+(41/2)^(2x)-3e^(5x)+3e^(x) 000 (1 point) Find a particular solution to y" + 36y = –24 sin(6t). yp = 16-3e^(-3t)-8cos(3t)
Find fxx(x,y), fxy(x,y), fyx(x,y), and fyy(x,y) for the following function. f(x,y)=6x/7y-9y/5x Find fx(x,y), fxy(x,y), fyx(x,y), and fyy(x,y) for the following function. 6x 9y f(x,y) = 7y 5x fox(x,y) = fxy(x,y) = fyx(x,y)=0 fyy(x,y)=0
2.Determine whether the lines x + y = 1 and 5x + y = 3 intersect. If they do, find points of intersection.
1 point) (a) Find the general solution to y" +7y'-0. Give your answer as y -.. . In your answer, use ci and c2 to denote arbitrary constants and x the independent variable. Enter ci as c1 and c as c2 help (equations) (b) Find the particular solution that satisfies y(0) 1 and y'(0)1 help (equations)
Determine if each pair of lines are parallel, skew or intersecting. If the lines intersect, find the point of intersection. Otherwise, find the distance between the lines. Then find a point on each line such that the distance between the points is the distance between the lines. Draw a picture, and use vectors instead of distance formulas to find the distance. Line #1 = < -2,2,8> + t< 1,2,2> Line#2 = < 0,1,5 > + t< -2,-4, -4>
(1 point) Find the point of intersection of the lines in the figure, given that line A, in red, has equation y = x + 2 and line B, in blue, has equation 2x + 3y = 15. (Click on graph to enlarge) x = help (fractions) y = help (fractions)
vectors. Need help with those questions please 1a). In three-space, find the intersection point of the two lines: (x, y, z) = (-1,2,0] + [3,-1, 4) and [x, y, ) = -6, 8, -1] + [2,-5, -3). b) Determine a direction vector in integer form of the line of intersection of the two planes 2x + 2y+2-12-0 and (x, y, z)=(2,0,0]+${1,2,0]+(1.0,-2) [2,3] 2. What is the distance between the point (-81) and the plane 5x-2-2y+52 [2] 3. Find the point(s)...
QUESTION 2 The general solution of the ODE y" -7y +6y=0 is a.y=c1 e^(6x) + c2 e^(5x) b.y=c1 e^(3x) + c2 e^(6x) c.yu ch enx + C20M-6X) d. y cle'x .2016) -k Save and Submit to save and submit. Click Save All Answers to save all answers.
(1 point) Find the point of intersection of the lines in the figure, given that line A, in red, has equation y = x + 2 and line B, in blue, has equation 2x + 3y = 12. 3 Help on fractions. Help on fractions. (Click on graph to enlarge)
(17 points) Find y as a function of x if y" – 7y" — y' + 7y = 0, y(0) = -9, y'(0) = 2, y" (O) = 87. y(x) =