MathematicsFind the HCF and LCM of 6, 72 and 120 using the fundamental theorem of arithmetic.

Find the HCF and LCM of 6, 72 and 120 using the fundamental theorem of arithmetic.


  1. A
    HCF = 6 and LCM = 360
  2. B
    HCF = 5 and LCM = 120
  3. C
    HCF = 3 and LCM = 360
  4. D
    HCF = 6 and LCM = 240 

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    Solution:

    Given are three numbers 6, 72 and 120.
    The prime factorization of 6,72   and 120  is,
    6=2×3 72=2×2×2×3×3 72= 2 3 × 3 2  
    And,
    120=2×2×2×3×5 120= 2 3 ×3×5  
    So, the HCF of 6, 72 and 120 is,
    HCF= 2 1 × 3 1 HCF=2×3 HCF=6  
    Hence the HCF of 6, 72 and 120 is 6.
    Now, the LCM of 6, 72 and 120 is,
    LCM= 2 3 × 3 2 × 5 1 LCM=8×9×5 LCM=360  
    Hence the HCF and LCM are 6 and 360 respectively.
    Therefore the correct answer is option (1).
     
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