Maths Specimen Paper 2023 Solved for ICSE Class-10

Maths Specimen Paper 2023 Solved for ICSE Class-10.  Step by step solutions as council prescribe guideline of model sample question paper.  During solutions of Maths specimen paper we explain with figure , graph, table whenever necessary so that student can achieve their goal in next upcoming exam of council. Visit official website CISCE for detail information about ICSE Board Class-10.

ICSE Class-10 Maths Specimen Paper 2023 Solved

Board ICSE
Class  10th (x)
Subject Maths
Topic  Specimen Paper Solved
Syllabus  Revised Syllabus
Session 2022-23
Question Type Sec-A MCQs
Total question 3 with Part
Max mark 80

ICSE Maths Specimen Paper 2023 Solved Class-10

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ICSE SPECIMEN QUESTION PAPER 2023

MATHEMATICS

Maximum Marks: 80

  • Time allowed: Two and half hours Answers to this Paper must be written on the paper provided separately.
  • You will not be allowed to write during first 15 minutes.
  • This time is to be spent in reading the question paper.
  • The time given at the head of this Paper is the time allowed for writing the answers.

Attempt all questions from Section A and any four questions from Section B.

  • All working, including rough work, must be clearly shown, and must be done on the same sheet as the rest of the answer.
  • Omission of essential working will result in loss of marks. The intended marks for questions or parts of questions are given in brackets [ ]
  • Mathematical tables are provided.

SECTION A Maths ICSE Specimen Paper Solved 2023 Class-10

(Attempt all questions from this Section.)

Question 1: Choose the correct answers to the questions from the given options: [15]

(i) The SGST paid by a customer to the shopkeeper for an article which is priced at %500 is 15. The rate of GST charged is:

(a) 1.5%
(b) 3%
(c) 5%
(d) 6%

(ii) When the roots of a quadratic equation are real and equal then the discriminant of the quadratic equation is:

(a) Infinite

(b) Positive

(c) Zero

(d) Negative

(iii) If (x — 1) is a factor of 2x² — ax — 1, then the value of ‘a’ is:

(a) —1
(b) 1
(c) 3
(d) -3

(iv) Given [ac bd] x X = [pq] The order of matrix X is :

(a) 2X2
(b) 1×2
(c) 2×1
(d) 1×1

(v) 57, 54, 51, 48, ……… are in Arithmetic Progression. The value of the 8th term is:

(a) 36
(b) 78
(c) -36
(d) -78

(vi) The point A (p,q) is invariant about x = p under reflection. The coordinates of it’s image A’ is:
(a) A’(p,— 4)
(b) A'(—p, q)
(c) A’(p, q)
(d) A’ (-p,- 49)

(vii) In the given diagram the triangle ABC is similar to triangle DEF by the axiom:

(vii) In the given diagram the triangle ABC is similar to triangle DEF by the axiom:

(a) SSS

(b) SAS

(c) AAA

(d) RHS

(viii) The volume of a right circular cone with same base radius and height as that of a right circular cylinder, is 120 cm³. The volume of the cylinder is:

(a) 240 cm³

(b) 60cm³

(c) 360cm³

(d) 480 cm³

(ix) The solution set for the given inequation is: —

-8≤2x<8,x €W

(a) {-4, -3, -2, -1, 0, 1,2, 3, 4}
(b) {-4, -3, -2, -1}
(c) {0, 1, 2, 3}
(d) {-8, -7, -6, -5, -4, -3, -2, -1, 0, 1,2, 3, 4, 5,6 7, 8}

(x) The probability of the Sun rising from the east is P(S). The value of P(S) is:

(a) P(S)=0
(b) P(S)<0
(c) PS)=1
(d) P)>1

(xi) math class 10 specimen img 2

The value of x is:

(a) 2

(b) 3

(c) 4

(d) 5

(xii)  The centroid of a triangle ABC is G (6, 7). If the coordinates of the vertices A, B and C are (a, 5), (7, 9) and (5, 7) respectively. The value of a is:

(a) 9

(b) 6

(c) 3

(d) 7

(xiii) In the given diagram AC is a diameter of the circle and ZADB=35°

(xiii) In the given diagram AC is a diameter of the circle and ZADB=35°

The degree measure of x is:
(a) 55°
(b) 35°
(c) 45°

(d) 70°

(xiv) If the nth term of an Arithmetic Progression (A.P.) is (n + 3), then the first three terms of the A.P. are:

(a) 1,2,3
(b) 2,4,6
(c) 4,5,6
(d) 7,8,9

(xv) The median of a grouped frequency distribution is found graphically by drawing:

(a) a linear graph
(b) a histogram
(c) a frequency polygon

(d) a cumulative frequency curve

Question: 2

(i) Salman deposits 1200 every month in a recurring deposit account for 2 % years. If the rate of interest is 6% per annum, find the amount he will receive on maturity.

(ii) 3, 9, m, 81 and n are in continued proportion. Find the values of m and n.

(iii) Prove that :

(iii) Prove that : 

Question 3:

(i) The inner circumference of the rim of a circular metal tub is 44 cm.

(i) The inner circumference of the rim of a circular metal tub is 44 cm.

Find:

(a) The inner radius of the tub

(b) The volume of the material of the tub if it’s outer radius is 8 cm.
Use π = 22/7

Give your answer correct to three significant figures.

(ii) From the given figure:

(ii) From the given figure:

(a) Write down the coordinates of A and B.
(b) If P divides AB in the ratio 2:3, find the coordinates of point P
(c) Find the equation of a line parallel to line AB and passing through origin.

(iii) Use graph sheet for this question. Take 2 cm = 1 unit along the axes.

Plot the triangle OAB, where O (0,0), A (3,—2), B (2,—3).

(a) Reflect the AOAB through the origin and name it as AOA’B’.
(b) Reflect the AOA’B’on the y — axis and name it as AOA” B”.
(c) Reflect the AOA’B’on the x — axis and name it as AOA’”B’”.

(d) Join the points AA”B”B’A’A’’B”B and give the geometrical name of the closed figure so formed.

SECTION A Maths ICSE Specimen Paper Solved 2023 Class-10 PDF Solution

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