If p =
18. 9 = 2/6 and r=
then verify that (p + q) + r = p + (q + r)
Answers
Answer:
Then S3 = 1 + 2 + 3 = 6 S2 = 1 + 2 = 3, S = 1 4S, 6×4 3(S, -S) 3(3–1) Using ai = 1, a direct computation gives ax + 1, as = 0, a 4 = 0, as = 2 and ac = 1. So, it repeats after cycle of 4. => There will be (50 = 12 × 4 + 2), 12 Such numbers equal to 2. r is arithmetic mean of p and q = r lies between p and q. ... pgr 14 × 3 × 9 14 × 3 × 9 Let the GP be, 2, 6, 18, 54, x. ... Then b = 18. Product of 3 terms, p = 2 × 6 × 18 = 216 = 6°. = p^ = 6°. Putting these values in the options, to check if p = 6".
Step-by-step explanation:
Then S3 = 1 + 2 + 3 = 6 S2 = 1 + 2 = 3, S = 1 4S, 6×4 3(S, -S) 3(3–1) Using ai = 1, a direct computation gives ax + 1, as = 0, a 4 = 0, as = 2 and ac = 1. So, it repeats after cycle of 4. => There will be (50 = 12 × 4 + 2), 12 Such numbers equal to 2. r is arithmetic mean of p and q = r lies between p and q. ... pgr 14 × 3 × 9 14 × 3 × 9 Let the GP be, 2, 6, 18, 54, x. ... Then b = 18. Product of 3 terms, p = 2 × 6 × 18 = 216 = 6°. = p^ = 6°. Putting these values in the options, to check if p = 6".\