Maharashtra State Board 8th Standard Mathematics Syllabus - Free PDF Download
Maharashtra State Board Syllabus 2025-26 8th Standard: The Maharashtra State Board 8th Standard Mathematics Syllabus for the examination year 2025-26 has been released by the MSBSHSE, Maharashtra State Board. The board will hold the final examination at the end of the year following the annual assessment scheme, which has led to the release of the syllabus. The 2025-26 Maharashtra State Board 8th Standard Mathematics Board Exam will entirely be based on the most recent syllabus. Therefore, students must thoroughly understand the new Maharashtra State Board syllabus to prepare for their annual exam properly.
The detailed Maharashtra State Board 8th Standard Mathematics Syllabus for 2025-26 is below.
Academic year:
Maharashtra State Board 8th Standard Mathematics Revised Syllabus
Maharashtra State Board 8th Standard Mathematics and their Unit wise marks distribution
Maharashtra State Board 8th Standard Mathematics Course Structure 2025-26 With Marking Scheme
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Syllabus
1 Rational and Irrational Numbers
2 Parallel Lines and Transversal
- Concept of Transversal Lines
- Introduction
- Angles Formed by Two Lines and Their Transversal
- When Two Parallel Lines Are Cut by a Transversal
- Example 1
- Parallel Lines
- Introduction
- Definition: Parallel Lines
- Properties of Parallel Lines
- Key Points Summary
- To Draw a Line Parallel to the Given Line Through a Point Outside the Given Line Using Set-square.
- To Draw a Parallel Line to a Given Line at a Given Distance.
3 Indices and Cube Root
4 Altitudes and Medians of a Triangle
- Altitudes of a Triangle
- Introduction
- Definition: Altitude
- Altitudes and Their Point of Convergence
- Key Points Summary
- Constructing an Altitude of a Triangle
- Median of a Triangle
- Definition: Median
- Properties of Medians
- The Centroid
- Key Points Summary
5 Expansion Formulae
6 Factorisation of Algebraic Expressions
7 Variation
- Types of Variation
- Definition: Direct Variation
- Definition: Inverse Variation
- Example 1
- Example 2
- Example 3
- Example 4
- Key Points Summary
- Time, Work, Speed
8 Quadrilateral : Constructions and Types
- Constructing a Quadrilateral
- To construct a quadrilateral, whose four sides and one angle are given.
- To construct a quadrilateral, whose three sides and two consecutive angles are given.
- To construct a quadrilateral, whose four sides and one diagonal are given.
- To construct a quadrilateral, whose three sides and two diagonals are given.
- To construct a quadrilateral if two adjacent sides and any three angle are given.
- Properties of Rectangle
- Properties of a Square
- Properties of Rhombus
- Properties of a Parallelogram
- Properties of Trapezium
- Properties of Kite
9 Discount and Commission
- Concept of Discount
- Commission
- Rebate
10 Division of Polynomials
- Polynomial and its Degree
- Introduction
- Definition: Polynomial in One Variable
- Definition: Degree
- Definition: Polynomials of Two or More Variables
- Real-Life Application
- Key Points Summary
- Degree of Polynomial
- Polynomial in one variable
- Polynomial in more than one variable
- Division of Algebraic Expressions
- Divide a Polynomial by a Binomial
11 Statistics
- Arithmetic Mean - Raw Data
- Subdivided Bar Graph
- Percentage Bar Graph
12 Equations in One Variable
- Solution of Equations in One Variable
- Word Problems of Equation in One Variable
13 Congruence of Triangles
- Congruence of Triangles
- Criteria for Congruence of Triangles
- AAS (Or SAA) Test
14 Compound Interest
15 Area
- Area of a Parallelogram
- Area of a Rhombus
- Area of the rhombus if base and height are given.
- Area of the rhombus if the diagonals are given.
- Area of Trapezium
- Area of a Triangle
- Area of Figures Having Irregular Shape
- Circumference of a Circle
- Area of Circle
16 Surface Area and Volume
- Standard Unit of Volume
- Surface Area of Cylinder
- Right Circular Cylinder
- Hollow Cylinder
- Volume of a Cylinder
- Euler's Formula
17 Circle - Chord and Arc
- Properties of Chord of a Circle
- Arcs Corresponding to the Chord of a Circle
