What type of questions are included in this paper?

This paper includes descriptive type questions, as indicated by the instructions to answer any five questions and the nature of the sample questions.

What is the paper code mentioned on the paper?

The paper code mentioned is 04/SBS/M-2020-10A/19.

Can I download the BPSC ACF Mathematics Paper-I question paper?

Yes, question papers like this are typically available for download for exam preparation.

What is the significance of the marks indicated in the margin?

The figures in the margin indicate the full marks allotted to each question.

BPSC ACF Mathematics Paper-I 2020 Question Paper PDF

Name: BPSC ACF Mathematics Paper-I 2020 Question Paper PDF
Creator: BPSC
Keywords: BPSC ACF Mathematics Paper-I, Assistant Conservator of Forests Exam Maths Paper, BPSC ACF Previous Year Paper, Mathematics Paper-I BPSC, BPSC ACF 2020 Question Paper, Bihar PSC ACF Maths, ACF Competitive Exam Maths, BPSC Mathematics Paper, Assistant Conservator of Forests Syllabus, BPSC Exam Preparation, Government Exam Maths Paper, Bihar Government Jobs ACF, ACF Exam Pattern, BPSC Question Paper, Mathematics Paper for ACF

Bihar Government Jobs Other Jobs

Conducted By BPSC
Maximum Marks 75
Duration 1.5 Hours
Languages English & Hindi

Exam Details

Detail	Information
Examination	Assistant Conservator of Forests Competitive Examination
Conducting Body	BPSC
Paper	Mathematics Paper-I
Subject	Mathematics
Duration	1.5 Hours
Maximum Marks	75
Question Type	Descriptive / Subjective

This document contains the Mathematics Paper-I from the BPSC Assistant Conservator of Forests Competitive Examination, likely from the year 2020. The paper is designed to assess candidates' mathematical abilities with a total of 75 marks and a time limit of 1.5 hours. It includes both Hindi and English versions of the questions, with English being the authentic version in case of ambiguity. Aspirants preparing for the BPSC ACF exam can use this paper to understand the question format, difficulty level, and important topics covered in Mathematics Paper-I.

Major Topics Covered

Linear Algebra
Differential Equations
Vector Systems
Mathematical Analysis

Why This Paper is Important

Useful for Assistant Conservator of Forests Competi preparation
Helps understand the latest exam pattern
Useful for practice and self-assessment
Covers frequently asked General Studies topics
Helpful for analysing question trends

Related Resources

BPSC ACF General Studies Paper
BPSC ACF Mathematics Paper-II
BPSC Civil Services Mains Mathematics Paper
BPSC ACF Mathematics Paper-I Answer Key 2020
BPSC ACF Syllabus
BPSC Mathematics Syllabus
BPSC ACF Exam Pattern
BPSC Exam Pattern

Instructions

पूर्णांक: 75 समय: 11/2 घण्टे Instructions: • The figures in the margin indicate full marks. Answer any five questions. • Candidates are required to give their answers in their own words as far as practicable. • All questions have been printed both in Hindi and English. In case of any ambiguity in Hindi version, the English version shall be considered authentic. Parts of the same question must be answered together and must not be interposed between answers to other questions. अनुदेश: • उपान्त के अंक पूर्णांक के द्योतक हैं। • किन्हीं पाँच प्रश्नों के उत्तर दें। • परीक्षार्थी यथासम्भव अपने शब्दों में ही उत्तर दें। • सभी प्रश्न हिन्दी और अंग्रेजी दोनों भाषा में छपे हैं।
यदि हिन्दी भाषा में कोई संदेह है, तो अंग्रेजी भाषा को ही प्रामाणिक माना जाएगा। • एक ही प्रश्न के विभिन्न भागों के उत्तर अनिवार्य रूप से एक-साथ ही लिखे जाएँ तथा उनके बीच में अन्य प्रश्नों के उत्तर न लिखे जाएँ।

Questions (page 2)

Q1.

(a) For A = \beginbmatrix 1 & 0 & 0 \\ 1 & 0 & 1 \\ 0 & 1 & 0 \endbmatrix show that Aⁿ = A^n-2 + A² - I, n ≥ 3
यदि A = \beginbmatrix 1 & 0 & 0 \\ 1 & 0 & 1 \\ 0 & 1 & 0 \endbmatrix, तो सिद्ध करें कि Aⁿ = A^n-2 + A² - I, n ≥ 3

(b) Find the maximal linearly independent subsystem of the system of vectors :
\veca₁ = (1, -1, -2), \ \veca₂ = (1, 9, 3),
\veca₃ = (-2, -4, 1), \ \veca₄ = (3, 7, -1)
निम्न सदिश राशियों के समूह से उच्चतम संख्या का स्वतन्त्र सदिश उपसमूह प्राप्त करें :
\veca₁ = (1, -1, -2), \ \veca₂ = (1, 9, 3),
\veca₃ = (-2, -4, 1), \ \veca₄ = (3, 7, -1)

Q2.

(a) Prove that between any two real roots of e^x sin x = 1, there is at least one real root of e^x cos x + 1 = 0.
सिद्ध करें कि समीकरण e^x sin x = 1 के किन्हीं दो वास्तविक हलों के मध्य एक वास्तविक हल समीकरण e^x cos x + 1 = 0 का अवश्य होगा।

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Frequently asked questions

What is the name of the exam?

The exam is the Assistant Conservator of Forests Competitive Examination conducted by BPSC.

Which paper is this question set for?

This question set is for Mathematics Paper-I.

What is the total maximum marks for this paper?

The maximum marks for this paper is 75.

What is the time duration allowed for this paper?

The time allowed for this paper is 1.5 hours.

Who conducts the Assistant Conservator of Forests Competitive Examination?

The examination is conducted by BPSC (Bihar Public Service Commission).

Are the questions available in multiple languages?

Yes, all questions are printed in both Hindi and English. The English version is considered authentic in case of any ambiguity.

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