CUET-PG SERIES Mathematics
Cauchy S Integral Formula
5 previous year questions.
Volume: 5 Ques
Yield: Medium
High-Yield Trend
5
2023 Chapter Questions 5 MCQs
01
PYQ 2023
hard
mathematics ID: cuet-pg-
The value of , where C is the circle |z|= is:
1
0
2
1
3
πί
4
2πi
02
PYQ 2023
medium
mathematics ID: cuet-pg-
Given below are two statements: one is labelled as Assertion A and the other is labelled as Reason R
Assertion A: The integral , where C is the circle |z|=3
Reason R: If there is no pole inside and on the contour C, then the value of the integral of the function along C is zero
In the light of the above statements, choose the correct answer from the options given below
Assertion A: The integral , where C is the circle |z|=3
Reason R: If there is no pole inside and on the contour C, then the value of the integral of the function along C is zero
In the light of the above statements, choose the correct answer from the options given below
1
Both A and R are true and R is the correct explanation of A
2
Both A and R are true but R is NOT the correct explanation of A
3
A is true but R is false
4
A is false but R is true
03
PYQ 2023
medium
mathematics ID: cuet-pg-
A. f(z) is analytic then
B. Polar C-R equation is
C. Two curves are said to be orthogonal to each other, when they intersect at acute angle at each of their points of intersection
D. where
choose the correct answer from the options given below:
B. Polar C-R equation is
C. Two curves are said to be orthogonal to each other, when they intersect at acute angle at each of their points of intersection
D. where
choose the correct answer from the options given below:
1
A, B, C Only
2
B, C, D Only
3
A,B,D Only
4
A,C,D Only
04
PYQ 2023
medium
mathematics ID: cuet-pg-
Let where Z is a complex number on the unit circle then Z is a solution of _____:
1
2
3
4
05
PYQ 2023
medium
mathematics ID: cuet-pg-
The value of the integral is
1
2
3
4
About Cauchy S Integral Formula - CUET-PG
Cauchy S Integral Formula is a vital chapter for CUET-PG aspirants. Mastering the concepts covered in this chapter is essential for securing a top rank.
By rigorously practicing the previous year questions associated with this chapter, you can identify high-yield topics, understand the examiner's perspective, and boost your confidence during the actual exam.
Frequently Asked Questions
Why focus on Cauchy S Integral Formula PYQs?
Analyzing PYQs for this specific chapter reveals the most frequently tested concepts and the typical complexity of questions, allowing you to tailor your study plan efficiently.
How to best use this analysis?
Review the topic breakdown to see which sub-topics within Cauchy S Integral Formula carry the most weight. Then, tackle the questions iteratively to solidify your understanding.