Arithmetic mean of two numbers whose sum is equal to 28, is equal to the geometrical mean of two perfect square numbers. Sum of these perfect square number out of given ten option will be
1) 42 2) 45 3) 48 4) 49 5) 51 6) 52 7) 53 8) 56 9) 58 10)60
28/2 = (49*4)^2------through given condition So sum of 49+4 = 53 So option 7 is correct
An arithmetic sequence formed of 11 terms, and the sum of all its terms equals to 220. Find the middle term in that sequence.
If 1^3 + 2^3 + 3^3 = m^2 where m is also an integer. What are the next three consecutive positive integers such that the sum of their individual cubes is equal to a perfect square?