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Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x < 3.="" why="" |-45|="" />
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Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction?
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Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction? for Quant 2024 is part of Quant preparation. The Question and answers have been prepared according to the Quant exam syllabus. Information about Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction? covers all topics & solutions for Quant 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction?.
Solutions for Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction? in English & in Hindi are available as part of our courses for Quant. Download more important topics, notes, lectures and mock test series for Quant Exam by signing up for free.
Here you can find the meaning of Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction? defined & explained in the simplest way possible. Besides giving the explanation of Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction?, a detailed solution for Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction? has been provided alongside types of Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction? theory, EduRev gives you an ample number of questions to practice Absolute value of a number:The modulus of a number is the absolute value of the number or we can say the distance of the number from the origin. The absolute value of a number a is defined as|a| = a, if a ≥ 0= - a, if a ≤ 0|a| is read as MODULUS of a pr Mod aExample: |79| = 79 & | - 45| = - (- 45) = 45Also, | x - 3 | = x - 3, if x ≥ 3= 3 - x, if x Related: Number Systems - Introduction? tests, examples and also practice Quant tests.
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