Computational Fluid Dynamics Classification Pde 1 Online Exam Quiz
Computational Fluid Dynamics Classification Pde 1 GK Quiz. Question and Answers related to Computational Fluid Dynamics Classification Pde 1. MCQ (Multiple Choice Questions with answers about Computational Fluid Dynamics Classification Pde 1
The mathematical classification of inviscid flow equations are different from that of the viscous flow equations because of __________
Options
A : absence of viscosity coefficients
B : absence of higher order terms
C : absence of convective terms
D : absence of diffusive terms
Which of these is not a type of flows based on their mathematical behaviour?
Options
A : Circular
B : Elliptic
C : Parabolic
D : Hyperbolic
Find the nature of the one-dimensional heat equation.
Options
A : Circular
B : Elliptic
C : Hyperbolic
D : Parabolic
Type of compressible flows depend upon _________
Options
A : free stream pressure
B : free stream density
C : free stream velocity
D : free stream temperature
Find the nature of the second-order wave equation.
Options
A : Hyperbolic/elliptic
B : Parabolic
C : Hyperbolic
D : Elliptic
The lines along which the derivatives of the dependent variables are indeterminate are called ___________
Options
A : parabolic lines
B : characteristic lines
C : hyperbolic lines
D : transition lines
The classification of PDEs are governed by ________
Options
A : Their highest order derivatives
B : Their least order derivatives
C : The number of terms
D : The constants
Chemical Engineering Basics - Part 1 more Online Exam Quiz
Computational Fluid Dynamics Calculation Pressure
Computational Fluid Dynamics Campus Interviews
Computational Fluid Dynamics Central Difference Schemes
Computational Fluid Dynamics Cfd Softwares
Computational Fluid Dynamics Characteristics Turbulent Flows
Computational Fluid Dynamics Components Numerical Methods
Computational Fluid Dynamics Conservation Equation
Computational Fluid Dynamics Conservativeness
Computational Fluid Dynamics Consistency
Computational Fluid Dynamics Continuity Equation Finite Control Volume