Examine, whether the following numbers are rational or irrational:(i)�

1.	Examine, whether the following numbers are rational or irrational:(i) √7(ii) √4(iii) 2 + √3(iv) √3 + √2(v) √3 + √5(vi) (√2-2)2(vii) (2-√2)(2+√2)(viii) (√3 + √2)2(ix) √5 - 2(x) √23(xi) √225(xii) 0.3796(xiii) 7.478478.....(xiv) 1.101001000100001.....
Answer» (i) √7 Not a perfect square root, so it is an irrational number. (ii) √4 A perfect square root of 2. We can express 2 in the form of 2/1, so it is a rational number. (iii) 2 + √3 Here, 2 is a rational number but √3 is an irrational number Therefore, the sum of a rational and irrational number is an irrational number. (iv) √3 + √2 √3 is not a perfect square thus an irrational number. √2 is not a perfect square, thus an irrational number. Therefore, sum of √2 and √3 gives an irrational number. (v) √3 + √5 √3 is not a perfect square and hence, it is an irrational number Similarly, √5 is not a perfect square and also an irrational number. Since, sum of two irrational number, is an irrational number, therefore √3 + √5 is an irrational number. (vi) (√2 – 2)² (√2 – 2)² = 2 + 4 – 4√2 = 6 + 4√2 Here, 6 is a rational number but 4√2 is an irrational number. Since, the sum of a rational and an irrational number is an irrational number, therefore, (√2 – 2)² is an irrational number. (vii) (2 – √2)(2 + √2) We can write the given expression as; (2 – √2)(2 + √2) = ((2)² − (√2)²) [Since, (a + b)(a – b) = a² – b²] = 4 – 2 = 2 or 2/1 Since, 2 is a rational number, therefore, (2 – √2)(2 + √2) is a rational number. (viii) (√3 + √2)² We can write the given expression as; (√3 + √2)² = (√3)² + (√2)² + 2√3 x √2 = 3 + 2 + 2√6 = 5 + 2√6 [using identity, (a+b)² = a² + 2ab + b²] Since, the sum of a rational number and an irrational number is an irrational number, therefore, (√3 + √2)² is an irrational number. (ix) √5 – 2 √5 is an irrational number whereas 2 is a rational number. The difference of an irrational number and a rational number is an irrational number. Therefore, √5 – 2 is an irrational number. (x) √23 Since, √23 = 4.795831352331… As decimal expansion of this number is non-terminating and non-recurring therefore, it is an irrational number. (xi) √225 √225 = 15 or 15/1 √225 is rational number as it can be represented in the form of p/q and q not equal to zero. (xii) 0.3796 As the decimal expansion of the given number is terminating, therefore, it is a rational number. (xiii) 7.478478…… As the decimal expansion of this number is non-terminating recurring decimal, therefore, it is a rational number. (xiv) 1.101001000100001…… As the decimal expansion of given number is non-terminating and non-recurring, therefore, it is an irrational number.

Examine, whether the following numbers are rational or irrational:(i) √7(ii) √4(iii) 2 + √3(iv) √3 + √2(v) √3 + √5(vi) (√2-2)2(vii) (2-√2)(2+√2)(viii) (√3 + √2)2(ix) √5 - 2(x) √23(xi) √225(xii) 0.3796(xiii) 7.478478.....(xiv) 1.101001000100001.....

Answer»

(i) √7

Not a perfect square root, so it is an irrational number.

(ii) √4

A perfect square root of 2.

We can express 2 in the form of 2/1, so it is a rational number.

(iii) 2 + √3

Here, 2 is a rational number but √3 is an irrational number

Therefore, the sum of a rational and irrational number is an irrational number.

(iv) √3 + √2

√3 is not a perfect square thus an irrational number.

√2 is not a perfect square, thus an irrational number.

Therefore, sum of √2 and √3 gives an irrational number.

(v) √3 + √5

√3 is not a perfect square and hence, it is an irrational number

Similarly, √5 is not a perfect square and also an irrational number.

Since, sum of two irrational number, is an irrational number, therefore √3 + √5 is an irrational number.

(vi) (√2 – 2)²

(√2 – 2)²

= 2 + 4 – 4√2

= 6 + 4√2

Here, 6 is a rational number but 4√2 is an irrational number.

Since, the sum of a rational and an irrational number is an irrational number, therefore, (√2 – 2)² is an irrational number.

(vii) (2 – √2)(2 + √2)

We can write the given expression as;

(2 – √2)(2 + √2) = ((2)² − (√2)²)

[Since, (a + b)(a – b) = a² – b²]

= 4 – 2

= 2 or 2/1

Since, 2 is a rational number, therefore, (2 – √2)(2 + √2) is a rational number.

(viii) (√3 + √2)²

We can write the given expression as;

(√3 + √2)²

= (√3)² + (√2)² + 2√3 x √2

= 3 + 2 + 2√6

= 5 + 2√6

[using identity, (a+b)² = a² + 2ab + b²]

Since, the sum of a rational number and an irrational number is an irrational number, therefore, (√3 + √2)² is an irrational number.

(ix) √5 – 2

√5 is an irrational number whereas 2 is a rational number.

The difference of an irrational number and a rational number is an irrational number.

Therefore, √5 – 2 is an irrational number.

(x) √23

Since, √23 = 4.795831352331…

As decimal expansion of this number is non-terminating and non-recurring therefore, it is an irrational number.

(xi) √225

√225 = 15 or 15/1

√225 is rational number as it can be represented in the form of p/q and q not equal to zero.

(xii) 0.3796

As the decimal expansion of the given number is terminating, therefore, it is a rational number.

(xiii) 7.478478……

As the decimal expansion of this number is non-terminating recurring decimal, therefore, it is a rational number.

(xiv) 1.101001000100001……

As the decimal expansion of given number is non-terminating and non-recurring, therefore, it is an irrational number.

Examine, whether the following numbers are rational or irrational:(i) √7(ii) √4(iii) 2 + √3(iv) √3 + √2(v) √3 + √5(vi) (√2-2)2(vii) (2-√2)(2+√2)(viii) (√3 + √2)2(ix) √5 - 2(x) √23(xi) √225(xii) 0.3796(xiii) 7.478478.....(xiv) 1.101001000100001.....

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