Can we decide that a number is a perfect square from its last digit alone?

If x is a natural number.If x^2+ax+b is a perfect square prove that a^2=4b .

Consider 'the arithmetic sequence 10,17,24,…. i) What is its algebraic form? ii) Prove that there is no perfect square in this sequence.

How many two digits perfect squares are there ?

Given the digits 1,2,3 and 8 How many one digit numbers can be formed from the given digits?

If x is a natural number.if x^2+ax+16 is a perfect square which number is 'a'?

A five digit number is formed at random by using the digits 1, 2, 3, 4, 5, 6 and 7. Find the chance that the number formed has none of its digits is repeated.

Given the digits 1,2,3 and 8 If repetition of digits is not allowed, find the number of numbers which can be formed from the given digits

A man is asked to say a 3 digit number.What is the probability that the last two digits be ’0’?

Consider the number 2751. The sum of its digital is 2+7+5+1=15 . Adding the digits of 15 we get 1+5=6 . This number 6 is called the 'digital root' of the number 2751. That is, to find the digital root of a number, find the sum of its digits (Don't forget to find the sum of the digits again, if the first sum has more than one digit) Let us see one more example. The sum of the digits of the numbe 679412 is 6+7+9+4+1+2=29 . Sum of digits of 29=2+9=11 . Sum of digits of 11=1+1=2 . Therefore the digital root of 679412 is 2 . Digital roots have an interesting property. To see this, consider the product 43times27=1161 . The digital roots of the numbers 43 and 27 are 4+3=7 and 2+7=9 . Product of the digital roots= 7times9=63 . Digital root of 63=6+3=9 . The Digital root of 1161 is also 9(1+1+6+1=9) that is the digital root of 1161=The digital root of 63 , where 63 is the product of the digital roots of 43 and 27. This property is true for all other natural numbers. The digital root of the number 63square5 is 8 (square represents a missing digit). Find the missing digit.

Consider the number 2751. The sum of its digital is 2+7+5+1=15 . Adding the digits of 15 we get 1+5=6 . This number 6 is called the 'digital root' of the number 2751. That is, to find the digital root of a number, find the sum of its digits (Don't forget to find the sum of the digits again, if the first sum has more than one digit) Let us see one more example. The sum of the digits of the numbe 679412 is 6+7+9+4+1+2=29 . Sum of digits of 29=2+9=11 . Sum of digits of 11=1+1=2 . Therefore the digital root of 679412 is 2 . Digital roots have an interesting property. To see this, consider the product 43times27=1161 . The digital roots of the numbers 43 and 27 are 4+3=7 and 2+7=9 . Product of the digital roots= 7times9=63 . Digital root of 63=6+3=9 . The Digital root of 1161 is also 9(1+1+6+1=9) that is the digital root of 1161=The digital root of 63, where 63 is the product of the digital roots of 43 and 27. This property is true for all other natural numbers. 121times92=11square32 . Find the missing digit.