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.

Name: Solved: 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. - MathMaster
Brand: MathMaster
Rating: 4.9 (176 reviews)

176

likes

879 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.

$Expert avatar$

Miles

4.9

116 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)

Math question: Convert 4.2 x 10^3 to standard notation.

What is 40% of a number if the number is 250?

What is the sine of an angle with a hypotenuse of 10 and an opposite side of 8?

New questions in Mathematics

A=m/2-t isolate t

Find the measures of the sides of ∆KPL and classify each triangle by its sides k (-2,-6), p (-4,0), l (3,-1)

4X^2 25

4x-3y=5;x+2y=4

If f(x,y)=6xy^2+3y^3 find (∫3,-2) f(x,y)dx.

The equation of the straight line that passes through the coordinate point (2,5) and is parallel to the straight line with equation x 2y 9 = 0 is

find x in the equation 2x-4=6