Arrange 9 integers from 1 to 9 without repetition in a 3*3 size square box (total 9 small boxes) in such a manner that sum of 3 integers (S) of 3 horizontal, 3 vertical and 2 diagonal lines are same. What will be S?
Use digits from 1 to 9 once in such a way that each digit is used in the boxes and are not repeated.
With the help of the mathematical signs, the digits are supposed from the top to bottom and form a mathematical equation where each digit is used only once.
Fill the Boxes with Numbers : 1 , 2 , 3 , 4 , 5 , 6 , 7 , 8 , 9 No Repetition
Arrange the number 1 to 9 in the boxes below so that each line of 3 boxes sums to 14(3 numbers have already been placed)
How many numbers can be formed from 1, 2, 3, 4, 5 (without repetition), when the digit at the units place must be greater than that in the ten's place?
In the figure below, there are 6 squares: 4 small squares, 1 medium-sized square, and 1 large square. There are 9 circles, which will be filled with all the integers 1 through 9 such that the sum of each square is 20.
