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Consider the equation  This is numerically solved by using the forward Euler method with a step size. ∆t = 2. The absolute error in the solution at the end of the first time step is_________ 
    Correct answer is '8'. Can you explain this answer?
    Verified Answer
    Consider the equation This is numerically solved by using the forward...
    Approximation value by Euler's Method

    Exact value:

    u = t3 + t
    u (2) = 8 + 2 = 10
    ∴ absolute error = |10 − 2| = 8
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    Consider the equation This is numerically solved by using the forward Euler method with a step size. ∆t = 2. The absolute error in the solution at the end of the first time step is_________Correct answer is '8'. Can you explain this answer?
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    Consider the equation This is numerically solved by using the forward Euler method with a step size. ∆t = 2. The absolute error in the solution at the end of the first time step is_________Correct answer is '8'. Can you explain this answer? for Civil Engineering (CE) 2024 is part of Civil Engineering (CE) preparation. The Question and answers have been prepared according to the Civil Engineering (CE) exam syllabus. Information about Consider the equation This is numerically solved by using the forward Euler method with a step size. ∆t = 2. The absolute error in the solution at the end of the first time step is_________Correct answer is '8'. Can you explain this answer? covers all topics & solutions for Civil Engineering (CE) 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for Consider the equation This is numerically solved by using the forward Euler method with a step size. ∆t = 2. The absolute error in the solution at the end of the first time step is_________Correct answer is '8'. Can you explain this answer?.
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