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विषय
मुख्य विषय
अध्याय
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Applied Mathematics 1
Solve the following equation by Gauss Seidal method:
`10x_1+x_2+x_3=12`
`2x_1+10x_2+x_3-13`
`2x_1+2x_2+10x_3=14`
Chapter: [10] Indeterminate Forms, Numerical Solutions of Transcendental Equations and System of Linear Equations
Concept: Gauss Seidal Iteration Method
Concept: Gauss Seidal Iteration Method
Obtain the root of 𝒙𝟑−𝒙−𝟏=𝟎 by Regula Falsi Method
(Take three iteration).
Chapter: [10] Indeterminate Forms, Numerical Solutions of Transcendental Equations and System of Linear Equations
Concept: Regula – Falsi Equation
Concept: Regula – Falsi Equation
Solve by Gauss Jacobi Iteration Method: 5x – y + z = 10, 2x + 4y = 12, x + y + 5z = -1.
Chapter: [10] Indeterminate Forms, Numerical Solutions of Transcendental Equations and System of Linear Equations
Concept: Gauss Jacobi Iteration Method
Concept: Gauss Jacobi Iteration Method
By using Regular falsi method solve 2x – 3sin x – 5 = 0.
Chapter: [10] Indeterminate Forms, Numerical Solutions of Transcendental Equations and System of Linear Equations
Concept: Regula – Falsi Equation
Concept: Regula – Falsi Equation
Solve using Gauss Jacobi Iteration method
2𝒙 + 12y + z – 4w = 13
13𝒙 + 5y - 3z + w = 18
2𝒙 + y – 3z + 9w = 31
3𝒙 - 4y + 10z + w = 29
Chapter: [10] Indeterminate Forms, Numerical Solutions of Transcendental Equations and System of Linear Equations
Concept: Gauss Jacobi Iteration Method
Concept: Gauss Jacobi Iteration Method
