Question
Given that the two curves arg(z) = and intersect in two distinct points, then
(Note : represents integral part of )
Found 3 tutors discussing this question
Discuss this question LIVE
9 mins ago
Text solutionVerified
Let,
...(1)
... (2)
Substitute equation (1) in equation (2), we get
Since the straight line intersects the circle in two distinct points.
for the above quadratic
For , .
Hence, the product of the roots of must be positive.
Hence,
. Hence,
Hence, .
Hence, options A and D are correct.
Was this solution helpful?
150
Share
Report
One destination to cover all your homework and assignment needs
Learn Practice Revision Succeed
Instant 1:1 help, 24x7
60, 000+ Expert tutors
Textbook solutions
Big idea maths, McGraw-Hill Education etc
Essay review
Get expert feedback on your essay
Schedule classes
High dosage tutoring from Dedicated 3 experts
Practice questions from similar books
Stuck on the question or explanation?
Connect with our maths tutors online and get step by step solution of this question.
231 students are taking LIVE classes
Question Text | Given that the two curves arg(z) = and intersect in two distinct points, then (Note : represents integral part of ) |
Answer Type | Text solution:1 |
Upvotes | 150 |