Question
Prove that it is not possible to arrange the integers 1 to 240 in a table with 15 rows and 16 columns in such a way that the sum of the numbers in each of the columns is the same.
176
likes879 views
Answer to a math question Prove that it is not possible to arrange the integers 1 to 240 in a table with 15 rows and 16 columns in such a way that the sum of the numbers in each of the columns is the same.
Miles
4.9114 Answers
sum of natural numbers from 1 to 240
=\frac{240\times241}{2}=28920
number of columns = 16
for equality, each slumn should have the sum as 28920/16 = 1807.5 which is a fractional number
we are only putting integers, and hence sum of each column has to be an integer and Not a fraction.
Hence the given statement is proved
Frequently asked questions (FAQs)
Question: What is the value of the constant c if the function f(x) = c is horizontal and equal to 5 for all values of x?
+
Question: What is the value of (2^3 * 3^2) / (2^2 * 3^3) when simplified?
+
Question: What is the factored form of the quadratic equation x^2 + 5x + 6 = 0?
+
New questions in Mathematics