n an arithmetic sequence, 5t5 = 9t, then prove that t14 = 0.
Answers
Answer:
vvThe first term, u1, of an arithmetic sequence is 145. ... Sun (24, + ( n d. ) Find S20, the sum of the first twenty terms of the sequence. ... Tu-1913-1=0:19 ... A few years later, a second level was added to increase the amphitheatre's capacity by ... 9 DC. Sn = ņ ( 24, +(n-1) d) = 1600 calc. Y = 4n2+36h. (2(70) + (n=134) = 1600.
Step-by-step explanation:
Answer:
Given sequence is,
3,6,12,24,...…
first term of this A.P is a1=3
second term of this A.P is a2=6
third term of this A.P is a3=12
the condition for an sequence to be an A.P is their must be a common difference (i.e.,d=an+1−an)
putting n=1 in above equation
d=a2−a1=6−3=3
putting n=2 in above equation
d=a3−a2=12−6=6
as we can see we get two values of d,
but in an A.P their must be a single value of d which means for this sequence we can't define a common difference.
hence this sequence not form an A.P