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CAT 2021 DILR Slot 3 Question Paper with Answer Key is available. As per test-takers, CAT DILR slot 3 was easier than slot 2 and tougher than slot 1. As per the changes introduced in CAT Exam Pattern last year, DILR section comprised a total of 20 questions worth 3 marks each. CAT 2021 DILR slot 3 question paper had a combination of 5 TITA questions and 15 MCQs. Both Data Interpretation and Logical Reasoning had 2 sets each.
Aspirants targeting CAT can download CAT 2021 DILR Slot 3 question paper with answer key PDFs to prepare well.
CAT 2021 DILR Question Paper Slot 3- Nov 28, 2021
| CAT 2021 DILR Question Paper | CAT 2021 DILR Answer Key | CAT 2021 DILR Solution |
|---|---|---|
| Download PDF | Download PDF | Download PDF |
Also Check:
CAT 2021 Question Paper DILR Slot 3: Sectional Analysis
DILR section carried a total of 60 marks out of 198 marks. The number of LR (Logical Reasoning) sets in CAT 2021 DILR slot 3 was 2, each set carried 6 questions. The other two sets came from DI (Data Interpretation) and consisted of 4 questions each.
Have a look the the below-mentioned table to see the complete analysis of CAT DILR 2021 slot 3:
| Sections | No. Of Questions | Marks Carried | Good Attempt |
|---|---|---|---|
| Review of Academic Qs | 6 | 18 | 2-4 |
| Pure & Impure Solutions | 4 | 12 | 3-4 |
| Bar Chart | 4 | 12 | 3-4 |
| Javelin Tournament | 6 | 18 | 2-4 |
Also Check:
CAT Previous Year Question Papers
| CAT 2022 Question Papers | CAT 2019 Question Papers | CAT 2020 Question Papers |
| CAT 2018 Question Papers | CAT 2017 Question Papers | CAT 2016 Question Papers |
Other MBA Exam Question Papers
CAT Questions
1. If \(\sqrt{5x+9}\)+\(\sqrt{5x-9}\)=\(3(2-\sqrt2)\) then \(\sqrt{10x+9}\) is equal to
- \(3\sqrt7\)
- \(4\sqrt5\)
- \(3\sqrt31\)
- \(2\sqrt7\)
2. Let both the series \(a_1,a_2,a_3,....\) and \(b_1,b_2,b_3,....\) be in arithmetic progression such that the common differences of both the series are prime numbers. If \(a_5=b_9,a_{19}=b_{19}\) and \(b_2=0\) , then \(a_{11}\) equals
- 79
- 83
- 84
- 86
3. The value of \(1+\bigg(1+\frac{1}{3}\bigg)\frac{1}{4}+\bigg(1+\frac{1}{3}+\frac{1}{9}\bigg)\frac{1}{16}+\bigg(1+\frac{1}{3}+\frac{1}{9}+\frac{1}{27}\bigg)\frac{1}{64}+....\),is
- \(\frac{15}{13}\)
- \(\frac{27}{12}\)
- \(\frac{16}{11}\)
- \(\frac{15}{8}\)
4. Suppose \(f(x,y)\) is a real-valued function such that \(f(3x+2y,2x-5y)=19x\), for all real numbers \(x\) and \(y\) . The value of x for which \(f(x,2x) = 27\) , is
- 3
- 4
- 42
- None of Above
5. The number of coins collected per week by two coin-collectors A and B are in the ratio 3 : 4. If the total number of coins collected by A in 5 weeks is a multiple of 7, and the total number of coins collected by B in 3 weeks is a multiple of 24, then the minimum possible number of coins collected by A in one week is
- 20
- 42
- 66
- None of Above
6. If x and y are real numbers such that x2 + (x-2y-1)2 = 4y(x+y), here the value x-2y is?
1
2
0
-1
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