Arithmetic
Additive Identity
Arithmetic Progression
Associative Property
Averages
Brackets
Closure Property
Commutative Property
Conversion of Measurement Units
Cube Root
Decimal
Distributivity of Multiplication over Addition
Divisibility Principles
Equality
Exponents
Factors
Fractions
Fundamental Operations
H.C.F / G.C.D
Integers
L.C.M
Multiples
Multiplicative Identity
Multiplicative Inverse
Numbers
Percentages
Profit and Loss
Ratio and Proportion
Simple Interest
Square Root
Unitary Method
Algebra
Cartesian System
Order Relation
Polynomials
Probability
Standard Identities & their applications
Transpose
Geometry
Basic Geometrical Terms
Circle
Curves
Angles
Define Line, Line Segment and Rays
Non-Collinear Points
Parallelogram
Rectangle
Rhombus
Square
Three dimensional object
Trapezium
Triangle
Quadrilateral
Trigonometry
Trigonometry Ratios
Data-Handling
Arithmetic Mean
Frequency Distribution Table
Graphs
Median
Mode
Range

Videos
Solved Problems
Home >> Non-Collinear Points >> Examples

Define Non-Collinear Points : Solved Examples

Collinear Points

In the following diagram, mark collinear and non-collinear points.


In the given diagram:-



Points b, d, o, a and c are collinear points because they all fall on the same Line L1.

Points s, p, o, r and q are also collinear points because they all fall on the same Line L2.

Points h, i, n, x, k, m and y all are non-collinear points because they don't fall on any line.

Related Question Examples

  • Demonstrate how three non-collinear points, when joined together, makes a polygon, and name the resultant polygon.
  • In the following diagram, mark collinear and non-collinear points.


  • Mark three non-collinear points X, Y and Z in such a way that they form a triangle.
  • Mark four non-collinear points a, b, c and d in such a way that they form a closed figure. And name the closed figure thus formed.
  • In the following diagram, mark collinear and non-collinear points.


  • In the following diagram, mark collinear and non-collinear points.

  • Copyright@2022 Algebraden.com (Math, Algebra & Geometry tutorials for school and home education)