CBSE 2026 Class 10 Maths Expected MCQ Question: The Central Board of Secondary Education will be conducting board exams from February 17, 2026, onwards, and Mathematics is the first paper. Students worried about the difficulty level of questions can refer to the expected questions and also previous year papers. Mathematics can be both a scoring and challenging subject that requires effective practice.
Per the question paper pattern followed by CBSE, a total of 100 marks will be allotted to Mathematics, with 80 marks for the theory paper and the remaining 20 for internal assessments. Students have to attempt 50% of compete based questions, including MCQs and case studies. We have provided a list of CBSE 2026 Class 10 Maths expected MCQ questions for 17 February exam on this page.
Also Check | CBSE Class 10 Maths Formula List PDF 2026 For Exam Day
CBSE 2026 Class 10 Maths Exam: List of Expected MCQs
Students who have been preparing for Mathematisc exam might be confused regarding the type of objective questions they can expect. To help students, we have prepared CBSE Class 10 Maths expected MCQ questions for exam day here:
| CBSE 10th MCQ Questions | Answer |
| The pair of linear equations 2x=5y+6 and 15y= 6x-18 represents two lines which are:IntersectingParallelCoincidentEither intersecting or parallel | c) Coincident |
| 2) The area of the sector of a circle with radius 12cm is 60πcm2. The central angle of this sector is:120 degree6 degree75 degree150 degree | d) 150 degrees |
| 3) If a pole 6m high casts a shadow 2√3 m long on the ground, then the sun’s elevation is60 degree45 degree30 degree90 degree | 60 degree |
| 4) The distance of teh point (-6,8) from the origin is:6-6810 | d) 10 |
| 5) the next term of AP: √7, √28, √63√70√80√97√112 | d) 112 |
| 6) Two dice are thrown together. The probability of getting the difference of numbers on their upper faces equal to 3 is:1/92/9⅙1/12 | c) ⅙ |
| 7) A card is drawn at random from a well-shuffled pack of 52 cards. The probability that the card drawn is not an ace is:1/139/134/1312/13 | d) 12/13 |
| 8) The roots of the equation x2+3x-10=0 are:2,-5-2,52,5--2,-5 | 2,-5 |
| 9) The area of teh square inscribed in a circle of radius 5√2 cm is:50 cm2100 cm225 cm2200 cm2 | b) 100 |
| 10) If the difference of mode and median of data is 24, find ot difference of median and mean:1224836 | 12 |
| 11) Three numbers in AP have the sum 30. What is its middle term?410168 | b) 10 |
| 12) For an evnet E, if P(E) + P (not E)=q then value of of q2-4 is-335-5 | -3 |
| 13) If a polynomial p(x) is given by p(x)= x2-5x+b, value of p(1) +P(4) is:042-4 | b) 4 |
| 14) If x=ab3 and y= a3b, where a and b are prime numbers, then [HCF(x,y) x LCM(x,y) is equal to 1-a3b3ab(1-ab)Ab-a4b4a4b4 | d) a4b4 |
| 15) The value for a for which ax2+x+a=0 has equal and positive roots is:2-2½-1/2 | c) 1/2 |
| 16) Which of the following is true for a polynomial p(x) of degree 3?p(x) has at most two distinct zeroesp(x) has at least two distinct zeroesp(x) has exactly three distinct zeroesp(x) has at most three distinct zeroes | d) p(x) has at most three distinct zeroes |
| 17) Assertion A): The probability that a leap year has 53 Sundays is 2/7.Assertion B): The probability that a non-leap year has 53 Sundays is 5/7.Both A and R are true, and R is the correct explanation of A.Both A and R are true, but R is not a correct explanation of A.A is true, but R is false.A is false, but R is true. | c) A is true, but R is false. |