The sum to infinity if a GP is 16 and the sum of the first 4 terms is 15. Find the first four terms?
1 Answer
The first four terms may either be
#8, 4, 2, 1#
OR
#24, -12, 6, -3#
Explanation:
We know that the sum of an infinite geometric series is
#s_n = a/(1 - r)#
The question tells us that
#16 = a/(1 - r) -> 16(1 - r) = a#
Next we recall that the sum of the first n terms of a geometric progression is
#s_N = (a(1 - r^n))/(1 -r)#
#15 = (a(1 - r^4))/(1 - r)#
We can simplify the equation a little before combining it with the other one.
#15 =(a(1 - r^2)(1 + r^2))/(1 -r)#
#15 = (a(1 + r)(1 - r)(1 + r^2))/(1 - r)#
#15/((1 + r)(r^2 + 1)) = a#
We can now see that
#16(1 - r) = 15/((1 +r)(r^2 + 1))#
#16(1 -r)(r^3 + r^2+ r + 1) = 15#
#16(r^3 + r^2 + r + 1 - r^4 - r^3 - r^2 - r) = 15#
#16 - 16r^4 = 15#
#1 = 16r^4#
#1/16 = r^4#
#r = +- 1/2#
We have two possible situations here.
When
#16 = a/(1 - 1/2) -> a = 16(1/2) = 8#
The first four terms here are
#8, 4, 2, 1#
When
#16 = a/(3/2) -> a =16(3/2) = 24#
The first four terms here are
#24, -12, 6, -3#
Hopefully this helps!
