GATE 2022 Question Papers (Available): Download Branch-wise Question Paper with Solution PDFs
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GATE 2022 Question Papers- Download Paper-wise Question Paper and Answer Key PDFs

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Sonam Rana updated

Content Curator updated | Updated On - Sep 13, 2024

GATE 2022 Question Papers are now available. Candidates can download GATE 2022 Question Paper PDF using the links mentioned below. GATE 2022 CE and ME papers were held in two slots meanwhile all the other papers were held in a single slot. Two new papers have been added to the list of GATE 2022 papers- Naval Architecture & Marine Engineering (NM) and Geomatics Engineering (GE). Candidates preparing for GATE 2023 can check previous year GATE Question Papers for better preparation and in getting acquainted with the paper pattern and type of questions asked in the exam.

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GATE 2022 Question Papers with Answer Key- Download PDFs

Paper/ Subject Exam Date Session GATE 2022 Question Paper Link
Mechanical Engineering- ME February 13 Forenoon Session Check Here
Mechanical Engineering- ME February 13 Afternoon Session Check Here
Petroleum Engineering- PE February 13 Forenoon Session Check Here
Architecture and Planning- AR February 13 Forenoon Session Check Here
Geomatics Engineering- GE (New Paper) February 13 Afternoon Session Check Here
Aerospace Engineering- AE February 13 Afternoon Session Check Here
Civil Engineering- CE February 12 Forenoon Session Check Here
Civil Engineering- CE February 12 Afternoon Session Check Here
Biotechnology- BT February 12 Forenoon Session Check Here
Physics- PH February 12 Forenoon Session Check Here
Ecology and Evolution- EY February 12 Forenoon Session Check Here
Engineering Sciences- XE February 12 Afternoon Session Check Here
Life Sciences- XL February 12 Afternoon Session Check Here
Electronics and Communication Engineering- EC February 6 Forenoon Session Check Here
Environmental Science and Engineering- ES February 6 Forenoon Session Check Here
Statistics- ST February 6 Forenoon Session Check Here
Naval Architecture & Marine Engineering- NM (New Paper) February 6 Forenoon Session Check Here
Metallurgical Engineering- MT February 6 Forenoon Session Check Here
Mining Engineering- MN February 6 Forenoon Session Check Here
Chemistry- CY February 6 Afternoon Session Check Here
Chemical Engineering- CH February 6 Afternoon Session Check Here
Production and Industrial Engineering- PI February 6 Afternoon Session Check Here
Humanities and Social Sciences- Economics (XH- C1) February 6 Afternoon Session Check Here
Humanities and Social Sciences- English (XH- C2) February 6 Afternoon Session Check Here
Humanities and Social Sciences- Linguistics (XH- C3) February 6 Afternoon Session Check Here
Humanities and Social Sciences- Philosophy (XH- C4) February 6 Afternoon Session Check Here
Humanities and Social Sciences- Psychology (XH- C5) February 6 Afternoon Session Check Here
Humanities and Social Sciences- Sociology (XH- C6) February 6 Afternoon Session Check Here
Instrumentation Engineering- IN February 6 Afternoon Session Check Here
Agricultural Engineering- AG February 6 Afternoon Session Check Here
Geology and Geophysics- GG February 6 Afternoon Session Check Here
Textile Engineering and Fibre Science- TF February 6 Afternoon Session Check Here
Computer Science and Information Technology- CS February 5 Forenoon Session Check Here
Biomedical Engineering- BM February 5 Forenoon Session Check Here
Electrical Engineering- EE February 5 Forenoon Session Check Here
Mathematics- MA February 5 Forenoon Session Check Here

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GATE 2022 Questions

1. Question Text

    • A
    • B

    2.

    sample text 2

      • dsfdg

      • fdgd

      3.

      sample text

        • dfb

        • dfg

        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:

            • 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.

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