They are: 9, 16 and 25
The smallest perfect squares that end with 9 are 9 (the square of 3) 49 (the square of 7). Their difference is 40.
101
No- the closest perfect squares are 36 (perfect square of 6) and 49 (perfect square of 7)
Itself or 7 because 700*700 = 490,000 and 700*7 = 4,900 both of which are perfect squares
There is no limit to the number of perfect squares. To find a perfect square, you simply need to pick a number and square it. E.g. 7^2=49, so 49 is a perfect square. As there is infinitely many numbers to pick, and as the larger a number the larger it's square, there are infinitely many perfect squares and they just keep on getting larger!
The smallest perfect squares that end with 9 are 9 (the square of 3) 49 (the square of 7). Their difference is 40.
49(7*7)-9(3*3) = 40
101
No- the closest perfect squares are 36 (perfect square of 6) and 49 (perfect square of 7)
No. The two closest squares are 49 and 36. The square root of 49 being 7 and the square root of 36 being 6. you can conclude that the square root of 42 isn't a perfect square, but it's square root is between 7 and 6.
Itself or 7 because 700*700 = 490,000 and 700*7 = 4,900 both of which are perfect squares
A perfect square has the condition that it must be any positive integer multiplied by itself. The closest perfect squares to 50 are 7*7 = 72 = 49 and 8*8 = 82 = 64 since 50 lies between 49 and 64, it must be it is not the square of a positive integer and, therefore, is not a perfect square.
It can be, only it is not a perfect square. 72 = 7*7 = 49 and 82 = 8*8 = 64 So 63 lies between the squares of 7 and 8 and so there is no whole number whose square is 63.
There is no limit to the number of perfect squares. To find a perfect square, you simply need to pick a number and square it. E.g. 7^2=49, so 49 is a perfect square. As there is infinitely many numbers to pick, and as the larger a number the larger it's square, there are infinitely many perfect squares and they just keep on getting larger!
In terms of prime factors, 1008 = 24*32*7 Then since 24 and 32 are perfect squares, all that is required is to make 7q a perfect square and so q = 7.
There is only one number of this type which is 7744=88^2 where a is 7 and b is 4
The numbers to the side and top indicate how many black squares there are in the row. Each number has at least one white space in between it and the next number. For instance, if the numbers are 3, 5, and 7, you will first have a group of three black squares, one or more white squares, next a group of 5 black squares, one or more white squares, and 7 black squares. The black squares can be right next to the edge or there can be several white squares between the edge and the first or last set of black squares. I hope this helps!