SAT Exam  >  SAT Notes  >  Mathematics for Digital SAT  >  Important Formulas of Linear Inequalities

Important Formulas of Linear Inequalities | Mathematics for Digital SAT PDF Download

  • Inequalities: Two real numbers or two algebraic expressions related by the symbols <, >, < or > form an inequality. For example: 3x<20, 4x+y<12.
  • Equal numbers may be added to (or subtracted from) both sides of an inequality.
  • Both sides of an inequality can be multiplied (or divided) by the same positive number. But when both sides are multiplied (or divided) by a negative number, then the inequality is reversed.
  • Linear Inequality: An inequality is said to be linear, if each variable occurs in first degree only and there is no term involving the product of the variables. For example: ax + b < 0, ax + b ≤ 0, ax + by + c > 0, ax + by + c ≥ 0.
  • Closed Interval: If a and b are real numbers, such that a < b, then the set of all real numbers x such that a ≤ x ≤ b is called a closed interval and is denoted by
    [a, b]. Therefore, [a, b] — {x : a ≤ x ≤ 6, x ∈ R}.
  • Open Interval: If a and b are real numbers, such that a < b, then the set of all real numbers x such that a < x < b is called a open interval and is denoted by (a, b) or
    ]a, b[. Therefore, (a, b) — {x : a < x < b, x ∈ R}.
  • Solution of an Inequality: The values of x, which make an inequality a true statement, are called solutions of the inequality.
  • To represent x < a (or x > a) on a number line, put a circle on the number and dark line to the left (or right) of the number a.
  • To represent x ≤ a (or x ≥ a) on a number line, put a dark circle on the number and dark the line to the left (or right) of the number x.
  • If an inequality is having < or > symbol, then the points on the line are also included in the solutions of the inequality and the graph of the inequality lies left (below) or right (above) of the graph of the equality represented by dark line that satisfies an arbitrary point in that part.
  • If an inequality is having < or > symbol, then the points on the line are not included in the solutions of the inequality and the graph of the inequality lies to the left (below) or right (above) of the graph of the corresponding equality represented by dotted line that satisfies an arbitrary point in that part.
  • To remove the denominator when the sign of the value of the denominator is unknown, may be +ve or -ve: We multiply by the square of the denominator. Square of the denominator is always positive. On multiplication of an inequation by a positive number the sign of inequality does not change.
  • Solution of a system of Linear Inequality: The solution set of a system of linear inequality in one variable is defined as the intersection of the solution sets of the linear inequality of the system. For example: If we have two solution sets x > 4 and x > 6, then solution of the system is the intersection of x > 4 and x > 6, i.e., x > 6.
  • Properties of absolute values:
    (i) |x| < a ⇔ -a < x < a i.e., x ∈ (—a, a)
    (ii) |x| ≤ a ⇔ - a ≤ x ≤ a i.e., x ∈ [—a, a]
    (iii) |x| > a ⇔ x < —a or x > a i.e., x ∈ (—∞, —a) U (a, ∞)
    (iv) |z| ≥ a ⇔ x ≤ -a or x ≥ a i.e., x ∈ (—∞, —a) U (a, ∞)
  • Triangle Inequality: |x + y| ≤ |x| + |y|, |x - y| ≥  |x| - |y|

To find plane containing the origin:

  • If the origin satisfies the inequality of the half of the half plane, then the half plane contains the origin. This inequality represents the half plane containing origin. 
  • If the origin does not satisfy the inequality of the half of the half plane, then the half plane does not contain the origin. This inequality represent the half plane, which does not contain the origin. 
  • Shading: A line divides the plane in two half planes. We check whether the given half plane contains the origin. If so, then the inequality represents the half plane containing the origin and we shade the half plane. 
  • If the origin does not satisfy the inequality, then the inequality represents the other half plane not containing origin and we shade this half plane. 
  • Graphical Solution of Linear Inquality in two variables: After identification of the half plane, we shade the half planes of the given inequality. The points of the enclosed area of the shaded portion are the solution of the given system of inequality.
The document Important Formulas of Linear Inequalities | Mathematics for Digital SAT is a part of the SAT Course Mathematics for Digital SAT.
All you need of SAT at this link: SAT
185 videos|124 docs|75 tests

Top Courses for SAT

185 videos|124 docs|75 tests
Download as PDF
Explore Courses for SAT exam

Top Courses for SAT

Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
10M+ students study on EduRev
Related Searches

ppt

,

Summary

,

Extra Questions

,

past year papers

,

study material

,

pdf

,

MCQs

,

practice quizzes

,

Free

,

Previous Year Questions with Solutions

,

Exam

,

Important questions

,

Semester Notes

,

Important Formulas of Linear Inequalities | Mathematics for Digital SAT

,

mock tests for examination

,

Important Formulas of Linear Inequalities | Mathematics for Digital SAT

,

Sample Paper

,

Viva Questions

,

Important Formulas of Linear Inequalities | Mathematics for Digital SAT

,

shortcuts and tricks

,

video lectures

,

Objective type Questions

;