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Roots 1. Which of the following can be perfect equere? (1) A number ending in 3 or 7 (i) A number ending with odd number of wo (iii) A number ending with even number of zeros v) A number ending in 2 2. Which of the following can be the square of a natural number ? () sum of the squares of first n natural murbors 01) sum of the first n natural numbers (1) sum of first (n-1) natural nurbars v) sum of first odd natural rumors 3. Which of the following is the number hon perfect square numbers between the square of the numbers and +17 (1) 2 (v) 2n-1 4. Which of the following is the difference between the squares of two consecutive natural number in () sum of the two numbers (i) difference of the numbers (1) twice the surs of the two numbers Ov) twice the differenos between the two numbers 5. Which of the following is the number of non-perfect square number hetween 172 and 1827 () 613 (1) 35 (1) 34 6. Which of the following is the difference between the squares of 21 and 22? (1) 21 (1) 22 (1) 42 7. Which of the following is the number of zerou in the square of 900 (1) 5 XIlth Account Express Course Enroll Now STUDY MATERIAL FOR COSE CLASS MATH Chapter 1- Algebraic Expressions and Identities Chapter 2-Comparing Quantities Chapter 3-Cubes and Cube Roots Chapter 4-Dats handling Chapter 5 Direct and inverse. Proportions Chapter e-Exponents and (iv) 70 (iv) 43 (iv) 2 8. If a number of r-digits is a perfect square and 'n' is an even nurber, then which of the following is the number of digits of its aquare root?

Answers

Answered by Misspagli74
72

How to check if a number is a Perfect Square?

Squares of all integers are known as perfect squares. In this lesson, we will discuss a very interesting Mathematical shortcut: How to check whether a number is a perfect square or not. There are some properties of perfect squares which can be used to test if a number is a perfect square or not. They can definitely say if it is not the square. (i.e. Converse is not necessarily true).

All perfect squares end in 1, 4, 5, 6, 9 or 00 (i.e. Even number of zeros). Therefore, a number that ends in 2, 3, 7 or 8 is not a perfect square.

For all the numbers ending in 1, 4, 5, 6, & 9 and for numbers ending in even zeros, then remove the zeros at the end of the number and apply following tests:

Digital roots are 1, 4, 7 or 9. No number can be a perfect square unless its digital root is 1, 4, 7, or 9. You might already be familiar with computing digital roots. (To find digital root of a number, add all its digits. If this sum is more than 9, add the digits of this sum. The single digit obtained at the end is the digital root of the number.)

If unit digit ends in 5, ten’s digit is always 2.

If it ends in 6, ten’s digit is always odd (1, 3, 5, 7, and 9) otherwise it is always even. That is if it ends in 1, 4, and 9 the ten’s digit is always even (2, 4, 6, 8, 0).

If a number is divisible by 4, its square leaves a remainder 0 when divided by 8.

Square of even number not divisible by 4 leaves remainder 4 while square of an odd number always leaves remainder 1 when divided by 8.

Total numbers of prime factors of a perfect square are always odd.

4539 ends in 9, digit sum is 3. Therefore, 4539 is not a perfect square

5776 ends in 6, digit sum is 7. Therefore, 5776 may be a perfect square

Step 1: A perfect square never ends in 2, 3, 7 or 8

This is the first observation you will make to check if the number is a perfect square or not. For example, consider the example 15623.

15623

By just noticing the number itself, we can conclude that 15623 cannot be a perfect square. We do not have to go to Step 2.

Step 2: Obtain the digital root of the number:

How does the digital root of a number would help in determining if a number is a perfect square or not. It turns out; a perfect square will always have a digital root of 0, 1, 4 or 7.

Take the number 15626 for example. This number ends in digits 6. So it satisfies Step 1. But still we cannot conclude, this number as a perfect square.

Let’s take the digital root of this number.

1 5 6 2 6 = 5 + 6 = 11 = 1 + 1 = 2

So, the digital root of this number is 2. A perfect square will never have a digital root 2. Hence, we can conclude 15626 is not a perfect square.

Now, there is a rider for this shortcut though, even if both Steps are satisfied, that does not guarantee that the number is a perfect square.

Let us take up an example here. Consider the number 623461, which is not a perfect square.

Notice that the unit digit is 1. This number could be a perfect square. Let us take the digital root.

6 2 3 4 6 1

The digital root of 623461 is 4. So it satisfies both Step 1 and 2. Still we cannot conclude that 623461 is a perfect square though.

However, this shortcut comes in really handy to eliminate obvious choices which are not a perfect square to solve competitive examination where you need to find the perfect squares.

Is 14798678562 a perfect square? Is 15763530163289 a perfect square?

Examine both the units digits and the digital roots of perfect squares to help determine whether or not a given number is a perfect square.

How-to-check-if-a-number-is-a-perfect-square. As we know a perfect square can only end in a 0, 1, 4, 5, 6, or 9; this should allow us to determine whether the first of our numbers is a perfect square. However, it isn't sufficient to draw a conclusion about the second number.

Again as we know that if a perfect square ends in 9; it’s tens digit is always even. Alas, even if we do this, it won't rule out numbers ending in 89, because '...89' is a possible square.

However, as we know no number can be a perfect square unless its digital root is 1, 4, 7, or 9; so, find the digital root of our second number. It’s 5. As 5 isn't in this list, then the number is definitely not a perfect square.

So, we can conclude, a number cannot be an exact or perfect square if

- it ends in 2, 3,7 or 8

- it terminates in an odd number of zeros

- its last digit is 6 but its penultimate (tens) digit is even

- its last digit is not 6 but its penultimate (tens) digit is odd

- its last digit is 5 but its penultimate (tens) digit is other than 2

- its last 2 digits are not divisible by 4 if it is even number

Given up, in bold writing is how to find if a number can be a perfect square.

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