Download App
Google Android
Apple iOS
Huawei
English
English
Malay
Guest
Login
Register
Home
Quiz
Battle
Practice
Class
Classes List
Timetable
Assignments
Learn
Learning Hub
Quick Notes
Videos
Experiments
Textbooks
Login
Register
Download App
Google Android
Apple iOS
Huawei
EN
MS
Learn
Quick Notes
List
Gradient
Gradient
10.1
Gradient
Definition
Gradient is the degree of steepness.
The steepness of a straight line is determined by its gradient value.
The greater the gradient value,
\(m\)
the steeper the slope of the straight line.
The negative or positive gradient value determines the direction of the slope of the straight line.
Gradient is the ratio of the vertical distance to the horizontal distance:
Formula
\(\text{Gradient, }m = \dfrac{\text{Vertical distance}}{\text{Horizontal distance}}\)
Formula of gradient of a straight line on a Cartesian plane:
Formula
(i)
\(\text{Gradient, }m= \dfrac{y_2 -y_1}{x_2 - x_1}\)
(ii)
\(\text{Gradient, }m = -\dfrac{\text{y-intercept}}{\text{x-intercept}}\)
Gradient for a straight line:
Types of Gradient
(a)
The value of the gradient is positive.
(b)
The value of the gradient is negative.
(c)
The value of the gradient is
\(0\)
.
(d)
The value of the gradient is undefined
\((\infty)\)
.
Gradient
10.1
Gradient
Definition
Gradient is the degree of steepness.
The steepness of a straight line is determined by its gradient value.
The greater the gradient value,
\(m\)
the steeper the slope of the straight line.
The negative or positive gradient value determines the direction of the slope of the straight line.
Gradient is the ratio of the vertical distance to the horizontal distance:
Formula
\(\text{Gradient, }m = \dfrac{\text{Vertical distance}}{\text{Horizontal distance}}\)
Formula of gradient of a straight line on a Cartesian plane:
Formula
(i)
\(\text{Gradient, }m= \dfrac{y_2 -y_1}{x_2 - x_1}\)
(ii)
\(\text{Gradient, }m = -\dfrac{\text{y-intercept}}{\text{x-intercept}}\)
Gradient for a straight line:
Types of Gradient
(a)
The value of the gradient is positive.
(b)
The value of the gradient is negative.
(c)
The value of the gradient is
\(0\)
.
(d)
The value of the gradient is undefined
\((\infty)\)
.
Chapter : Gradient of a Straight Line
Topic : Gradient
Form 2
Mathematics
View all notes for Mathematics Form 2
Related notes
Patterns
Sequences
Patterns and Sequences
Expansion
Factorisation
Algebraic Expressions and Basic Arithmetic Operations
Algebraic Formulae
Regular Polygon
Interior Angles and Exterior Angles of Polygons
Properties of Circles
Report this note
Report Card
Evaluate your academic performance through detailed report
Learn more
Register for a free Pandai account now
Edit content
×
Loading...
Quiz
Videos
Notes
Account