Of the three numbers, the first number is twice of the second and the second is thrice of the third number. If the average of these 3 numbers is 20, then the sum of the largest and smallest numbers is
Options:
A . 54
B . 60
C . 24
D . 42
Answer: Option D Answer: (d)Let the third number be x. ∴ Second number = 3x and first number = 6x ∴ 6x + 3x + x = 3 × 20 ⇒ 10x = 60 ⇒ x = 6 ∴ Required sum = 6x + x = 7x = 7 × 6 = 42 Aliter : Using Rule 15,From three numbers, first number is 'a’ times of 2nd number, 2nd number is 'b’ times of 3rd number and the average of all three numbers is x, then, First number = $\text"3ab"/ \text"1+b+ab"$ x ; Second number = $\text"3b"/ \text"1+b+ab"$ x ; Third number = $\text"3b"/ \text"1+b+ab"$ x Here, a = 2, b = 3, x = 20 Largest Number= $\text"3ab"/ \text"1+b+ab"$ x = ${3×2×3}/{1+3+2×3}$×20 =$18/10$×20 = 36 Smallest Number = $3/\text"1+b+ab"$ ×x = $3/{1+3+2×3}$×20= $3/10$×20 = 6Sum = 36 + 6 = 42
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