The correct option is A 179:321
Let the sum of nth terms of two AP be denoted by sn and Sn. The first term and common difference of two AP's be denoted by a & d and A & D respectively
snSn=5n+49n+6⇒n2(2a+(n−1)d)n2(2A+(n−1)D)=5n+49n+6⇒(2a+(n−1)d)(2A+(n−1)D)=5n+49n+6Dividing Numerator and denominator by 2,a+(n−1)2dA+(n−1)2D=5n+49n+6
The ratio of 18th term of two A.P. is
a18A18=a+17dA+17DComparing with a+(n−1)2dA+(n−1)2D=5n+49n+6 ...(1] we get,(n−1)2=17⇒n=35Putting n=35 in (1], we geta18A18=5(35)+49(35)+6=179321