The sum of the ages of 'n' siblings of a family is equal to 140 years. If the ages of these 'n' siblings are integers that form an arithmetic progression with a common
difference of years, which of the following is a valid pair of values of 'n' and 'd'?
Answers
Given : The sum of the ages of 'n' siblings of a family is equal to 140 years. If the ages of these 'n' siblings are integers that form an arithmetic progression with a common difference of years,
To Find : which of the following is a valid pair of values of 'n' and 'd'?
a. 4,7
b.7,7,
c. 10,2
d. 14,1
Solution:
Let say ages are
a , a + d , a + d , _________ a + (n-1)d
Sum = (n/2)(2a + (n-1)d) = 140
=> n (2a + (n - 1)d) = 280
check n = 4 and d = 7
=> 4(2a + 3*7) = 280
=> 2a + 21 = 70
=> 2a = 49
=> a = 24.5
not an integer
check n = 7 and d = 7
7(2a + 6*7) = 280
=> 2a + 42 = 40
=> 2a = -2
=> a = -1
Age can not be negative
check n = 10 and d = 2
10(2a + 9*2) = 280
=> 2a + 18 = 28
=> 2a = 10
=> a = 5
Satisfies
check n = 14 and d = 1
14(2a + 13*1) = 280
=> 2a + 13 = 20
=> 2a = 7
=> a = 2.5
not an integer
Hence valid pair of values of 'n' and 'd' is 10 , 2
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