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a)For all nonzero real numbers a, b, there exists a real number c such that the vectors ax + b, x + c ∈V are orthogonal to each other.b)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors x + b, x + c ∈ V are orthogonal to each other.c)For all positive real numbers c, there exist infinitely many realnumbers a, b such that the vectors ax + b, x + c∈V are orthogonal to each other.d)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors b, x + c∈V are orthogonal to each other.Correct answer is option 'C'. Can you explain this answer? for Mathematics 2024 is part of Mathematics preparation. The Question and answers have been prepared according to the Mathematics exam syllabus. Information about a)For all nonzero real numbers a, b, there exists a real number c such that the vectors ax + b, x + c ∈V are orthogonal to each other.b)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors x + b, x + c ∈ V are orthogonal to each other.c)For all positive real numbers c, there exist infinitely many realnumbers a, b such that the vectors ax + b, x + c∈V are orthogonal to each other.d)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors b, x + c∈V are orthogonal to each other.Correct answer is option 'C'. Can you explain this answer? covers all topics & solutions for Mathematics 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for a)For all nonzero real numbers a, b, there exists a real number c such that the vectors ax + b, x + c ∈V are orthogonal to each other.b)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors x + b, x + c ∈ V are orthogonal to each other.c)For all positive real numbers c, there exist infinitely many realnumbers a, b such that the vectors ax + b, x + c∈V are orthogonal to each other.d)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors b, x + c∈V are orthogonal to each other.Correct answer is option 'C'. Can you explain this answer?.

Solutions for a)For all nonzero real numbers a, b, there exists a real number c such that the vectors ax + b, x + c ∈V are orthogonal to each other.b)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors x + b, x + c ∈ V are orthogonal to each other.c)For all positive real numbers c, there exist infinitely many realnumbers a, b such that the vectors ax + b, x + c∈V are orthogonal to each other.d)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors b, x + c∈V are orthogonal to each other.Correct answer is option 'C'. Can you explain this answer? in English & in Hindi are available as part of our courses for Mathematics. Download more important topics, notes, lectures and mock test series for Mathematics Exam by signing up for free.

Here you can find the meaning of a)For all nonzero real numbers a, b, there exists a real number c such that the vectors ax + b, x + c ∈V are orthogonal to each other.b)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors x + b, x + c ∈ V are orthogonal to each other.c)For all positive real numbers c, there exist infinitely many realnumbers a, b such that the vectors ax + b, x + c∈V are orthogonal to each other.d)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors b, x + c∈V are orthogonal to each other.Correct answer is option 'C'. Can you explain this answer? defined & explained in the simplest way possible. Besides giving the explanation of a)For all nonzero real numbers a, b, there exists a real number c such that the vectors ax + b, x + c ∈V are orthogonal to each other.b)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors x + b, x + c ∈ V are orthogonal to each other.c)For all positive real numbers c, there exist infinitely many realnumbers a, b such that the vectors ax + b, x + c∈V are orthogonal to each other.d)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors b, x + c∈V are orthogonal to each other.Correct answer is option 'C'. Can you explain this answer?, a detailed solution for a)For all nonzero real numbers a, b, there exists a real number c such that the vectors ax + b, x + c ∈V are orthogonal to each other.b)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors x + b, x + c ∈ V are orthogonal to each other.c)For all positive real numbers c, there exist infinitely many realnumbers a, b such that the vectors ax + b, x + c∈V are orthogonal to each other.d)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors b, x + c∈V are orthogonal to each other.Correct answer is option 'C'. Can you explain this answer? has been provided alongside types of a)For all nonzero real numbers a, b, there exists a real number c such that the vectors ax + b, x + c ∈V are orthogonal to each other.b)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors x + b, x + c ∈ V are orthogonal to each other.c)For all positive real numbers c, there exist infinitely many realnumbers a, b such that the vectors ax + b, x + c∈V are orthogonal to each other.d)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors b, x + c∈V are orthogonal to each other.Correct answer is option 'C'. Can you explain this answer? theory, EduRev gives you an ample number of questions to practice a)For all nonzero real numbers a, b, there exists a real number c such that the vectors ax + b, x + c ∈V are orthogonal to each other.b)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors x + b, x + c ∈ V are orthogonal to each other.c)For all positive real numbers c, there exist infinitely many realnumbers a, b such that the vectors ax + b, x + c∈V are orthogonal to each other.d)For all nonzero real numbers b, there are infinitely many realnumbers c such that the vectors b, x + c∈V are orthogonal to each other.Correct answer is option 'C'. Can you explain this answer? tests, examples and also practice Mathematics tests.