B.sc Agriculture 1st Semester Mathematical Important Questions 2024

In this post, b.sc agriculture 1st semester mathematical important questions have been given for the 2024 session. 

These questions will take your exam preparation to the next level. 

Solving this practice set will increase your confidence level and clear your concepts. 

Share these questions with your friends too. 

Many questions in this set of questions have been taken from the question papers of previous exams.

You can use this set as a b.sc agri model question paper for maths 1st semester. 

Before solving these questions, write them in your notebook or save them on the computer. 

After that read the chapter related to the textbook given by the university carefully 3 to 4 times. 

Now solve these questions. 

Try to write answers to b.sc 1st sem agriculture math important questions in your own words. 

With this, you will be able to assimilate them easily in the future and also revise before the exam. 

This process will also save you time and improve your confidence.

It has been seen many times that the questions have been taken from the previous year's question paper. 

Those questions are also included in the b.sc agriculture first semester maths important questions paper.

So do not take these questions lightly and prepare them well. 

The questions of this set are also useful for mathematical agriculture questions for quiz contests. 

Many such sets are available on the internet in the form of b sc agriculture 1st sem maths important questions pdf, which can be helpful for your practice. 

You use them too.

Let's start to solve these questions.


B.sc Agriculture Math Question Paper For 2024

Bsc 1st Semester Mathematical Methods In Agriculture Important Questions

  • Find the first term and the 40th term of A.P. whose term is 34 and the 15th term is 74.
  • If c is a constant. Then the derivative of c W.r.t. x is what?
  • How many signals can be given with five flags of different colors?
  • What will be called "A matrix having only one column".
  • State the formula for the angle between two intersecting lines. 
  • Prove that the elements on the main diagonal of a skew-symmetric matrix are all zero.
  • What will be the Middle term in the Binomial expansion of (x + y)2? 
  • Find the angle between the lines 3x + y - 7 = 0 and x + 2y + 9 = O.
  • How many different teams or I() football players call he chosen 1'1"(1111 12 players.
  • Find the length of the perpendicular from (4,2) to the line 5x - 12y - 9 = o.
  • What will be the the distance between origin and the point (0. 4).
  • Find the value of cos 15°.
  • Find the equation of the straight line passing through the points (1, 2) and (3, 4).
  • Show that - Cos9+sin(2700+9)-sin(2700-9)+Cos(1800+9)=0.
  • Find the differential coefficient of sin x using the method of the first principle.
  • Find the value of tan 75'.
  • Solve the equation - 2x - y + 3z = 13, x + 3y + 2z = 1, 3x - 4y - z = 8.
  • Solve the equations - 2x+3y+1Oz = 4, 4x-6y+Sz = 1, 6x+9y-20z = 2.
  • Reduce to the intercept form and hence find its intercept on the axes.
  • Find the point of intersection of the lines - 2x - Y + 2 = 0 and 3x + 2y- 11=0.
  • Show that - tan 70° = 2 tan 50° + tan 20°.
  • Define matrix. Write any six types of matrices with examples.
  • Show that tan 75° + cot 75° = 4.
  • Differentiate the function x sinx w. r. t 'x' from the first principle.
  • Differentiate the function cos ax w.r.t. 'x' from the first principle.
  • State the condition of the concurrency of lines in a plane.
  • Define the intercept form of a straight line and then find the equation of a straight line that passes through the point (3,4) and has intercept on the axes equal in magnitude but opposite in sign.
  • Find the distance between points (6,4) and (10,3).
  • Define the normal form of a straight line. 
  • Find the slope of a line passing through (3,0) and (-2,-1).
  • State the formula for finding the area under the curve with the necessary diagram.
  • Write the rules for evaluating integrals of functions. 
  • State any four standard forms of limits of algebraic functions.
  • Define circle. State the equations of the circle in the form of (a) center radius (b) diameter and (c) general equation. 
  • State the derivatives of any four standard functions.
  • Define function. State any three different ways of representing a function with the illustration.

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