If the mean of numbers 27, 31, 89, 107, 156 is 82, then the mean of 130, 126, 68, 50, 1 is

There are 50 numbers. Each number is subtracted from 53 and the mean of the numbers so obtained is found to be -3.5. The mean of the given number is:

If the mean deviation about the median of the numbers: a, 2a,......., 50a is 50, then | a | equals :

The mean of first 11 terms of Fibonacci sequence : 1,1,2, 3, 5, 8, 13, 21, 34, 55, 89 is 21.1. Calculate the standard deviation.

Construct a grouped frequency table with class intervals 0-5, 5 -10 and so on for the following marks obtained in Biology (out of 50) by a group of 35 students in an examination : 0, 5, 6, 7, 10, 12, 14, 15, 20, 22, 25, 26, 27, 8, 11, 17, 3, 6, 9, 17, 19, 21, 22, 29, 31, 35,37, 40, 42, 45, 49, 4, 50, 16 and 20.: Which group contains the maximum number of students ?

The harmonic mean of two numbers is 4. Their arithmetic mean A and the geometric mean G satisfy the relation 2A+G^2=27. Find two numbers.

Nuclei with magic no. of proton Z=2, 8,20,28,50,52 and magic no. of neutrons N=2,8,20,28,50,82 and 126 are found to be very stable. What does the existence of magic number indicate?

If the geometric mea is (1)/(n) times the harmonic mean between two numbers, then show that the ratio of the two numbers is 1+sqrt(1-n^(2)):1-sqrt(1-n^(2)) .

Nuclei with magic no. of proton Z=2, 8,20,28,50,52 and magic no. of neutrons N=2,8,20,28,50,82 and 126 are found to be very stable. Verify this by the calculating the proton separation energy S_p for "^120Sn(Z=50) and "^121Sb=(Z=51) . The proton separation energy for a nuclide is the minimum energy required to separate the least rightly bound proton from a nucleus of that nuclide. It is given by S_p=(M_(z-1,N)+M_H-M_(Z,N))c^2 Given "^119ln=118.9058u , "^120Sn=119.902199u , "^121Sb=120.903824u , "^1H=1.0078252u .

The harmonic mean of two numbers is 21.6. If one of the numbers is 27, then what is the other number ?