with the above values, µ(x) (y' + f(x)y)) = (y · µ(x))' ii. Show that, with the above values, a solution to the differential equation is i. Use the integrating factor method with the given (r) to solve the given differential equations: ii. y = iii. 1 H(T) / (9(x)µ(x)] dr y' - 8y = 20, y' - Y x 2 3.x y' + 4xy = 20x³, 2 μ(x) = e-8x μ(x) = n(x) µ¹(x) = c²r²

B) use the integrating factor eith the given m(x) to solve the given differential equations. 

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i. onto both sides of the equation. i. Show that with the above values, μ(r) (y' + f(x)y)) = (y · µ(x))' ii. Show that, with the above values, a solution to the differential equation is ii. iii. O Search (b) Use the integrating factor method with the given u(x) to solve the given differential cquations: y = L y 1 1(T) / (9(T)µ(x)] da y' - 8y = 20, Y 2 X 3.x y' + 4xy = 20x³, || 2 A Page < µ(x) = c¹n(x) µ(x) = e-8x amazon Math 12 Worksheet 8.pdf acer µ¹(x) = c²x² 2 B > of 2 C C Aug 25, 2022 Aug 25, 2022