GATE Exam  >  GATE Questions  >  A vector field is defined aswhere,are unit ve... Start Learning for Free
A vector field is defined as

where,  are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral (where is an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, is
  • a)
    0
  • b)
  • c)
  • d)
Correct answer is option 'A'. Can you explain this answer?
Verified Answer
A vector field is defined aswhere,are unit vectors along the axes of a...


By divergence theorem
View all questions of this test
Explore Courses for GATE exam
A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer?
Question Description
A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer? for GATE 2024 is part of GATE preparation. The Question and answers have been prepared according to the GATE exam syllabus. Information about A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer? covers all topics & solutions for GATE 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer?.
Solutions for A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer? in English & in Hindi are available as part of our courses for GATE. Download more important topics, notes, lectures and mock test series for GATE Exam by signing up for free.
Here you can find the meaning of A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer? defined & explained in the simplest way possible. Besides giving the explanation of A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer?, a detailed solution for A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer? has been provided alongside types of A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer? theory, EduRev gives you an ample number of questions to practice A vector field is defined aswhere,are unit vectors along the axes of a right-handed rectangular/Cartesian coordinate system. The surface integral(whereis an elemental surface areavector) evaluated over the inner and outer surfaces of a spherical shell formed by two concentric spheres with origin as the center, and internal and external radii of 1 and 2, respectively, isa)0b)2πc)8πd)4πCorrect answer is option 'A'. Can you explain this answer? tests, examples and also practice GATE tests.
Explore Courses for GATE exam
Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
10M+ students study on EduRev