- Question Papers
- Question Papers 2023
- Question Papers 2022
- Question Papers 2021
- Question Papers 2020
- Question Papers 2018
- Question Papers 2017
- Civil Engineering Papers
- CSE Question Paper
- ECE Question Paper
- EE Question Paper
- ME Question Paper
- AE Question Paper
- AG Question Paper
- AR Question Paper
- BM Question Paper
- CH Question Paper
- Chemistry Question Paper
- BT Question Paper
- EY Question Paper
- XE Question Paper
- ES Question Paper
- GG Question Paper
- GE Question Paper
- XH Question Paper
- IN Question Paper
- XL Question Paper
- MA Question Paper
- MT Question Paper
- MN Question Paper
- NM Question Paper
- PE Question Paper
- Physics Question Paper
- PI Question Paper
- Statistics Question Paper
- TF Question Paper
- Practice Papers
Content Curator updated | Updated On - Sep 13, 2024
GATE 2019 Question Paper PDFs with Answer Key are available for download. The exam was conducted by IIT Madras on February 2, 3, 8 and 10, 2019. IIT Madras introduced Statistics as a new GATE paper in 2020 raising the total available number of papers in the exam to 24. No new changes had been made to GATE Syllabus and Exam Pattern in 2019. IIT Madras reported the qualifying percentage for GATE 2019 to be 16.12% with 1.2 lakh candidates qualifying the exam out of over 7.5 lakh candidates who appeared for the same.
Latest News:
GATE is a highly competitive exam and with more than 7.50 lakhs students sitting for the 2019 exam alone. It is therefore highly crucial that the candidate utilizes each and every possibility of gaining an edge in preparation. Check GATE 2019 Question Paper in the section below.
GATE 2019 Question Papers with Answer Key- Download PDFs
GATE 2019 Paper/ Subject | GATE 2019 Exam Date | Session | GATE 2019 Question Paper Link |
---|---|---|---|
Aerospace Engineering (AE) | February 3 | Afternoon Session | Check Here |
Agricultural Engineering (AG) | February 3 | Afternoon Session | Check Here |
Architecture and Planning (AR) | February 3 | Afternoon Session | Check Here |
Biotechnology (BT) | February 3 | Afternoon Session | Check Here |
Civil Engineering (CE)- Slot 1 | February 10 | Forenoon Session | Check Here |
Civil Engineering (CE)- Slot 2 | February 10 | Afternoon Session | Check Here |
Chemical Engineering (CH) | February 2 | Forenoon Session | Check Here |
Computer Science and Information Technology (CS) | February 3 | Forenoon Session | Check Here |
Chemistry (CY) | February 2 | Forenoon Session | Check Here |
Electronics and Communication Engineering (EC) | February 9 | Forenoon Session | Check Here |
Electrical Engineering (EE) | February 9 | Afternoon Session | Check Here |
Ecology and Evolution (EY) | February 3 | Afternoon Session | Check Here |
Geology and Geophysics (GG) | February 3 | Afternoon Session | Check Here |
Instrumentation Engineering (IN) | February 3 | Afternoon Session | Check Here |
Mathematics (MA) | February 3 | Afternoon Session | Check Here |
Mechanical Engineering (ME)- Slot 1 | February 2 | Forenoon Session | Check Here |
Mechanical Engineering (ME)- Slot 2 | February 2 | Afternoon Session | Check Here |
Mining Engineering (MN) | February 2 | Forenoon Session | Check Here |
Metallurgical Engineering (MT) | February 3 | Afternoon Session | Check Here |
Petroleum Engineering (PE) | February 3 | Afternoon Session | Check Here |
Physics (PH) | February 3 | Afternoon Session | Check Here |
Production and Industrial Engineering (PI) | February 3 | Afternoon Session | Check Here |
Statistics (ST) (New Paper) | February 3 | Afternoon Session | Check Here |
Textile Engineering and Fibre Science (TF) | February 2 | Afternoon Session | Check Here |
Engineering Sciences (XE-A, B, C, D, E, F, G, H) | February 2 | Afternoon Session | Check Here |
Life Sciences (XL-P, Q, R, S, T, U) | February 2 | Afternoon Session | Check Here |
Quick Links:
GATE 2019 Questions
4. For the reaction, $H_{2} + I_{2} {\rightleftharpoons} 2HI, K= 47.6.$ If the initial number of moles of each reactant and product is 1 mole then at equilibrium
- $\left[I_{2}\right]=\left[H_{2}\right], \left[I_{2}\right] > \left[HI\right]$
- $({\frac{x^3}{9}})$
\(\left[I_{2}\right]>\left[H_{2}\right], \left[I_{2}\right] = \left[HI\right]\)
- $\omega\propto\,n^{\frac{1}{3}}$
5. The area of a rhombus whose vertices are (3, 0), (4, 5), (-1, 4) and (-2,-1) taken in order, is:
The area of a rhombus whose vertices are (3, 0), (4, 5), (-1, 4) and (-2,-1) taken in order, is:
12 sq.units
24 sq.units
*The article might have information for the previous academic years, which will be updated soon subject to the notification issued by the University/College.
Comments