calculus 2
posted by Geminese .
Use euler's method with step size 0.2 to estimate y(1), where y(x) is the solution of the initialvalue problem
y'= 3x+y^2, y(0)=1
Respond to this Question
Similar Questions

Calculus
Use Euler's method with step size 0.2 to estimate y(1.4), where y(x) is the solution of the initialvalue problem below. Give your answer correct to 4 decimal places. y' = x  xy y(1) = 0 h = 0.2 Since I am at y(1) = 0 and not y(0) … 
calculus 2
Use euler's method with step size 0.2 to estimate y(1), where y(x) is the solution of the initialvalue problem y'= 3x+y^2, y(0)=1 
calculus
Use Euler's method with step size 0.2 to estimate y(1), where y(x) is the solution of the initialvalue problem. y' = 5x + y^2, y(0)=1. 
CAL 2
Use Euler's method with step size 0.2 to estimate y(1), where y(x) is the solution of the initialvalue problem y'=5x+y^2, y(0)=1 y(1)= 
Cal
Use Euler's method with step size 0.2 to estimate y(1), where y(x) is the solution of the initialvalue problem. y' = 5x + y^2, y(0)=1. y(1)= 
Really need help in Calculus Problem?!
Use Euler's method with step size .2 to estimate y(.4), where y(x) is the solution of the initial value problem y=x+y^2, y=0. Repeat part a with step size .1 
calculus
Use Euler's method with step size .2 to estimate y(.4), where y(x) is the solution of the initial value problem y=x+y^2, y=0. Repeat part a with step size .1 
Euler's method help in Calculus?????
Let dy/dx=xy . Use Euler's method with step size of 0.5 and the initial condition of y(0) = 3 to estimate y(2). I really am not sure if I did this right, but I got 3.4568 for y(2). I actually feel like it is wrong. 
Calculus
Use Euler's method with step size 0.2 to estimate y(1), where y(x) is the solution of the initialvalue problem given below. (Round your answer to four decimal places.) y' = 1 − xy y(0) = 0 I don't even know how to start! 
calculus 2
Use Euler's method with a step size of 0.2 to estimate y(1), where y(x) is the solution of the initial value problem y' = 6x+y^2, y(0)=0. Round your final answer to 4 places, but keep more places on the intermediate steps for accuracy.