011: Use Euler's method to calculate the first three approximations to the given initial value problem for the specified increment size. Calculate the exact solution and investigate the accuracy of your approximations. Round your results to four decimal places. Y₁ = y₁+ y ५. Yo XX0 + 2D 0.5+ 20. y' = 1-²y(2) = -1, dx = 0.5. X Sol. y₁=yo+(1-2) dx = -1 + (1-¹)45)= Y2 = y₁ + (1 - 4) dx = -0.25 + (1--235) 0.5) y3 = y₂ + (1-2) dx = 0.3+(1-3) 6.5) = 0.75 Y3 y2 +(¹)y=1 P(x) = Q(x) =D=> [P(x) dx = S dx = ln |x| = ln x, x > 0 ⇒ v(x) = elnxx ⇒ y = √x + 1 dx = ( + C) ; x = 2, y = -1 4 / ⇒ −1 = 1 + ⇒ C=4y = - X )=0.3, ⇒y(3.5)= 3,5-3 = 4.250.6071 first three approximations to the given i

Please in details how to solve it , thank you so much.

Transcribed Image Text:

Q11: Use Euler's method to calculate the first three approximations to the given initial value problem for the specified increment size. Calculate the exact solution and investigate the accuracy of your approximations. Round your results to four decimal X=X0 + 2DX places. Y₁ = you y 0.54 2015) y' = 1-² X y(2)=-1, dx= dx = 0.5. Sol. y₁ = y + (1-2) dx = -1 + (1-¹) 4.5)=-0.25, Y2 = y₁ + (1-4) dx = -0.25+ (1--235) 0.5) 0.3, Y3y2 + (1-2) dx = 0.3+(1-3) 6.5) -0.75; + (1) y = 1 + P(x) = Q(x) =D⇒ [P(x) dx = Sdx = ln |x| = In x, x > 0 ⇒ v(x) = elnx-x ⇒ y = ¹ √x · 1 dx = ( + C) ; x = 2, y = − 1 1 dx X ⇒ −1 = 1 + - ⇒ y(3.5)=3,5 4 ⇒ C=4y= 1 - X ext - 3 = 4,250.6071 method to calculate the first three approximations to the given init on and