# CBSE Class 12 Mathematics 2017 Sample Paper – II

Get latest CBSE Sample Paper for Class 12 Maths 2017 board exam. With this article, students can download the complete sample paper along with marking scheme and hints of the same.  CBSE Class 12 Mathematics Sample Paper

CBSE Sample Paper for class 12 Mathematics 2017 board exam is available for download in PDF format along with hint and marking scheme of the same.

About CBSE class 12 Mathematics sample paper, 2017

CBSE has released a new sample paper for class 12 Maths exam 2017. The pattern of CBSE class 12 Maths paper has been changed. The analysis of the CBSE sample paper for class 12 Maths shows that more flexibility is provided in terms of choices of questions. For CBSE class 12 Maths board exam 2017, the board had releases two sample of CBSE class 12 Maths.

CBSE Sample Paper for Class 12 Mathematics 2017 - I

A snapshot of General Instructions for CBSE Sample Paper for Class 12

Some sample question from CBSE sample for class 12 Maths 2017

 What is the principal value of tan‒1(tan 2π/3). A and B are square matrices of order 3 each, |A| = 2 and |B| = 3. Find |3AB|. What is the distance of the point (p, q, r) from the x-axis? Let f : R → R be defined by f (x) = 2 x2 ‒ 5 and g: R → R is defined by g (x) = x/(x2 ‒ 1). Find gof How many equivalence relations on the set {1,2,3} containing (1,2) and (2,1) are there in all ? Justify your answer. A couple has 2 children. Find the probability that both are boys, if it is known that (i) one of them is a boy (ii) the older child is a boy. The sides of an equilateral triangle are increasing at the rate of 2 cm/sec. Find the rate at which its area increases, when side is 10 cm long. If a 20 year old girl drives her car at 25 kilometers per hour, she has to spend Rs 4 per kilometer on petrol. If she drives her car at 40 kilometers per hour, the petrol cost increases to Rs 5 per kilometer. She has Rs 200 to spend on petrol and wishes to find the maximum distance she can travel within one hour. Express the above problem as a Linear Programming Problem. Write any one value reflected in the problem.