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Find the solutions of 2x1-3x2-7x3+5x4+2x5=-2 x1-2x2-4x5+3x4+x5=-2 2x1+0x2-4x3+2x4+x3=3 x1-5x2-7x3+6x4+2x5=-7
Find all points (x,y) where f(x,y) has a possible relative maximum or minimum. f(x,y) = 9X4 – 12xy + 2y2 - 4 What are all the possible points? (Type an ordered pair. Use a comma to separate answers as needed.)
Differentiate the following functions using logarithmic differentiation when appropriate... 2 y = (x3–4)^(6x+2)4 2x5+1 1 g(0) -tan? 20 4
; Let at be a linear transformation as follows : T{x1,x2,x3,x4,x5} = {{x1-x3+2x2x5},{x2-x3+2x5},{x1+x2-2x3+x4+2x5},{2x2-2x3+x4+2x5}] a.) find the standard matrix representation A of T b.) find the basis of Col(A) c.) find a basis of Null(A) d.) is T 1-1? Is T onto?
4. Evaluate the limit (4pts each) 9x4+x (a) lim x -3 (b) lim Vx +25 4. Evaluate the limit (4pts each) 9x4+x (a) lim x -3 (b) lim Vx +25
1. Compute the following limits. 9x4 - 4y4 (a) lim lim (x,y)–(0,0) 3x2 + 2y2
y" – 7y' +12 y = 0, y(0) = 3, y'(0) = -2. a. (4/10) Find the Laplace Transform of the solution, Y(8) = L[y(t)]. Y(8) = M b. (6/10) Find the function y solution of the initial value problem above, g(t) = M Consider the initial value problem for function y, y" + 10 y' + 25 y=0, y(0) = 5, y (0) = -5. a. (4/10) Find the Laplace Transform of the solution, Y(s) = L[y(t)]. Y(s) =...
Using MATLAB Solve 2x5 5х, x(0)0, a(0) 0.4, on the interval [-2,0] Use Taylor series method or Runge-Kutta method Using MATLAB Solve 2x5 5х, x(0)0, a(0) 0.4, on the interval [-2,0] Use Taylor series method or Runge-Kutta method
3. Find the length of the curve y = y=for 0 < x < 2.
3. For function y(t) with y(0) = 1, y'(0) = -2, y"(0) = 3, y"(0) = 2020, find c{dey!