Math, asked by sNeHaQuEeN20, 1 year ago

find four numbers in an ap whose sum is 20 and sum of whose square is 120.

Answers

Answered by ilikeme
7

Let the four numbers in A.P be a-3d, a-d,a+d,a+3d.    ---- (1)


Given that Sum of the terms = 20.


= (a-3d) + (a-d) + (a+d) + (a+3d) = 20


4a = 20


 a = 5.    ---- (2)



Given that sum of squares of the term = 120.


= (a-3d)^2 + (a-d)^2 + (a+d)^2 + (a+3d)^2 = 120


= (a^2 + 9d^2 - 6ad) + (a^2+d^2-2ab) + (a^2+d^2+2ad) + (a^2+9d^2+6ad) = 120


= 4a^2 + 20d^2 = 120


Substitute a = 5 from (2) .


4(5)^2 + 20d^2 = 120


100 + 20d^2 = 120


20d^2 = 20


d = +1 (or) - 1.


Since AP cannot be negative.


Substitute a = 5 and d = 1 in (1), we get


a - 3d, a-d, a+d, a+3d = 2,4,6,8.

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