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Consider following comparative points of S.F.E.E with Bernoulli's equation:
1. These two have several terms in common.
2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.
3. The Bernoulli’s equation is a special limiting case of S.F.E.E
1. These two have several terms in common.
2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.
3. The Bernoulli’s equation is a special limiting case of S.F.E.E
Which of the above is/are correct?
- a)1 only
- b)1 and 3
- c)1 and 2
- d)1, 2 and 3
Correct answer is option 'B'. Can you explain this answer?
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Consider following comparative points of S.F.E.E with Bernoulli's ...
Bernoulli’s equation valid for frictionless incompressible fluids. S.F.E.E. valid for viscous compressible fluids.
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Consider following comparative points of S.F.E.E with Bernoulli's ...
's equation and the S.F.E.E (Steady Flow Energy Equation) are used to analyze fluid flow problems.
1. Both equations have several terms in common, including the velocity head (V^2/2g), the pressure head (P/ρg), and the elevation head (z). These terms represent the different forms of energy in a fluid system.
2. The Bernoulli's equation is a simplified form of the S.F.E.E, which is a more general equation that takes into account energy losses due to friction and other factors. The S.F.E.E includes additional terms such as the energy loss due to friction (hf) and the work done by or on the fluid (W).
3. Bernoulli's equation is based on the principle of conservation of energy along a streamline, neglecting energy losses. It is commonly used in applications where the flow is assumed to be ideal, such as in pipes with smooth walls or in fluid dynamics problems with no significant energy losses.
4. The S.F.E.E, on the other hand, accounts for energy losses due to friction and other factors. It is used in situations where the flow is not ideal and there are significant energy losses, such as in pipes with rough walls or in systems with pumps and turbines.
5. Both equations are derived from the same fundamental principles of fluid mechanics, but the S.F.E.E provides a more comprehensive analysis of fluid flow by considering energy losses. Bernoulli's equation can be seen as a simplified version of the S.F.E.E that neglects these losses for simpler calculations.
In summary, while both Bernoulli's equation and the S.F.E.E are used to analyze fluid flow problems, the S.F.E.E provides a more comprehensive analysis by considering energy losses due to friction and other factors. Bernoulli's equation is a simplified version of the S.F.E.E, neglecting these losses for simpler calculations in ideal flow situations.
1. Both equations have several terms in common, including the velocity head (V^2/2g), the pressure head (P/ρg), and the elevation head (z). These terms represent the different forms of energy in a fluid system.
2. The Bernoulli's equation is a simplified form of the S.F.E.E, which is a more general equation that takes into account energy losses due to friction and other factors. The S.F.E.E includes additional terms such as the energy loss due to friction (hf) and the work done by or on the fluid (W).
3. Bernoulli's equation is based on the principle of conservation of energy along a streamline, neglecting energy losses. It is commonly used in applications where the flow is assumed to be ideal, such as in pipes with smooth walls or in fluid dynamics problems with no significant energy losses.
4. The S.F.E.E, on the other hand, accounts for energy losses due to friction and other factors. It is used in situations where the flow is not ideal and there are significant energy losses, such as in pipes with rough walls or in systems with pumps and turbines.
5. Both equations are derived from the same fundamental principles of fluid mechanics, but the S.F.E.E provides a more comprehensive analysis of fluid flow by considering energy losses. Bernoulli's equation can be seen as a simplified version of the S.F.E.E that neglects these losses for simpler calculations.
In summary, while both Bernoulli's equation and the S.F.E.E are used to analyze fluid flow problems, the S.F.E.E provides a more comprehensive analysis by considering energy losses due to friction and other factors. Bernoulli's equation is a simplified version of the S.F.E.E, neglecting these losses for simpler calculations in ideal flow situations.
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Consider following comparative points of S.F.E.E with Bernoulli's equation:1. These two have several terms in common.2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.3. The Bernoulli’s equation is a special limiting case of S.F.E.EWhich of the above is/are correct?a)1 onlyb)1 and 3c)1 and 2d)1, 2 and 3Correct answer is option 'B'. Can you explain this answer?
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Consider following comparative points of S.F.E.E with Bernoulli's equation:1. These two have several terms in common.2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.3. The Bernoulli’s equation is a special limiting case of S.F.E.EWhich of the above is/are correct?a)1 onlyb)1 and 3c)1 and 2d)1, 2 and 3Correct answer is option 'B'. Can you explain this answer? for Mechanical Engineering 2024 is part of Mechanical Engineering preparation. The Question and answers have been prepared according to the Mechanical Engineering exam syllabus. Information about Consider following comparative points of S.F.E.E with Bernoulli's equation:1. These two have several terms in common.2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.3. The Bernoulli’s equation is a special limiting case of S.F.E.EWhich of the above is/are correct?a)1 onlyb)1 and 3c)1 and 2d)1, 2 and 3Correct answer is option 'B'. Can you explain this answer? covers all topics & solutions for Mechanical Engineering 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for Consider following comparative points of S.F.E.E with Bernoulli's equation:1. These two have several terms in common.2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.3. The Bernoulli’s equation is a special limiting case of S.F.E.EWhich of the above is/are correct?a)1 onlyb)1 and 3c)1 and 2d)1, 2 and 3Correct answer is option 'B'. Can you explain this answer?.
Consider following comparative points of S.F.E.E with Bernoulli's equation:1. These two have several terms in common.2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.3. The Bernoulli’s equation is a special limiting case of S.F.E.EWhich of the above is/are correct?a)1 onlyb)1 and 3c)1 and 2d)1, 2 and 3Correct answer is option 'B'. Can you explain this answer? for Mechanical Engineering 2024 is part of Mechanical Engineering preparation. The Question and answers have been prepared according to the Mechanical Engineering exam syllabus. Information about Consider following comparative points of S.F.E.E with Bernoulli's equation:1. These two have several terms in common.2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.3. The Bernoulli’s equation is a special limiting case of S.F.E.EWhich of the above is/are correct?a)1 onlyb)1 and 3c)1 and 2d)1, 2 and 3Correct answer is option 'B'. Can you explain this answer? covers all topics & solutions for Mechanical Engineering 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for Consider following comparative points of S.F.E.E with Bernoulli's equation:1. These two have several terms in common.2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.3. The Bernoulli’s equation is a special limiting case of S.F.E.EWhich of the above is/are correct?a)1 onlyb)1 and 3c)1 and 2d)1, 2 and 3Correct answer is option 'B'. Can you explain this answer?.
Solutions for Consider following comparative points of S.F.E.E with Bernoulli's equation:1. These two have several terms in common.2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.3. The Bernoulli’s equation is a special limiting case of S.F.E.EWhich of the above is/are correct?a)1 onlyb)1 and 3c)1 and 2d)1, 2 and 3Correct answer is option 'B'. Can you explain this answer? in English & in Hindi are available as part of our courses for Mechanical Engineering.
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ample number of questions to practice Consider following comparative points of S.F.E.E with Bernoulli's equation:1. These two have several terms in common.2. Both Bernoulli’s equation and S.F.E.E is valid for viscous compressible fluids.3. The Bernoulli’s equation is a special limiting case of S.F.E.EWhich of the above is/are correct?a)1 onlyb)1 and 3c)1 and 2d)1, 2 and 3Correct answer is option 'B'. Can you explain this answer? tests, examples and also practice Mechanical Engineering tests.
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