Find a solution of x dy = y2 - y that passes through the indicated points....
Reproduce the given computer-generated direction field. Then sketch an approximate solution curve that passes through each of the indicated points. dy-- dx (a) y(-2) = 1 (ь) у(3) - 0 (c) y(0) 2 (d) y(0) 0 Reproduce the given computer-generated direction field. Then sketch an approximate solution curve that passes through each of the indicated points. dy-- dx (a) y(-2) = 1 (ь) у(3) - 0 (c) y(0) 2 (d) y(0) 0
Find the dy/dx for the following equations (e) (y+1)= x +42 (f) x3 + y2 = 4.1 (g) xy = 3ry +3 (h) ya = r sin(1)
Find the general solution or particular solution of each the following DE's 1) (y-y2 tanx)dx + (2y+tanx)dy=0 2) (x2+y2+x)dx + xydy-0 i y(-1)-1 4) For the initial value problem y' + xy - xy? ex2 ; y(0)-1 Find the explicit solution if y>0 dy dae dy
Find the G.S. of the DE: (3xy - y2)dx + x(x - y)dy = 0
How to find an integrating factor ? Solve (y2 + y) dx - x dy = 0.
Find the solution to the initial value problem dy 6xy + y2 + (3x2 + 2xy + 2y) dx =0 y(1) = 3 OA x+y + 2xy2 + y2 + x = 31 OB. 6xy + 2y2 + x = 37 3x²y + 2x2y + x3 + 2x2 + 2y = 24 OD 3x2y + xy2 + y2 = 27 ОЕ xºy + x2y2 + y2 + x = 22
2 + COS- 2.ry dy d 1+y2 = y(y + sin x), 7(0) = 1. 3. [2cy cos(x+y) - sin x) dx + x2 cos (+²y) dy = 0. 4. Determine the values of the constants r and s such that (x,y) = x'y is an Integrating Factor for the following DE. (2y + 4x^y)dr + (4.6y +32)dy = 0. 2. C = -1 You need to find the solution in implicit form. 3. y = arcsin (C-cos) 4. r=...
Which one is the solution to this equation (1 + y2 sin 2x)dx – 2y(cos x){dy = 0 denkleminin çözümü aşağıdakilerden hangisidir? 19- x + √y²+1=c O A) xy - Inx=0 B) x-y(cos x)2 = C xye-y - 2 = 0 D) ce-x = y E
(8 points) Solve the following differential equation: (y - x)dx + (x + y2)dy = 0. = constant. help (formulas)
[-/1.25 Points] DETAILS ZILLDIFFEQMODAP11 4.2.007. The indicated function y(x) is a solution of the given differential equation. Use reduction of order or formula (5) in Section 4.2, e-P(x) dx r2 = y g(x) / dx (5) as instructed, to find a second solution v2(X). Ay" - 20y + 25y = 0; Y-S/2 Y2 Need Help?