Insert in between ` sqrt5 and sqrt7 - (a)` a rational number, (b) an irrational number ,

Insert in between 5/7 and 9/11 (a) a rational number (b) an irrational number

(a) (i) By taking any two irrational numbers, prove that their sum is a rational number. (ii) By taking any two irrational numbers, prove that their difference is a rational number. (b) Insert in between 1/7 and 2/7 (i) a rational number : (ii) an irrational number.

If tantheta=sqrt n , where n in N, >= 2 , then sec2theta is always (a) a rational number (b) an irrational number (c) a positive integer (d) a negative integer

Write the component statements of each of the folloing compound statements : sqrt(3) is a rational number or an irrational number .

Identify the type of ''Or'' used in the following statements and check whether the statements are true or false: sqrt2 is a rational number or an irrational number

Find the component statements of the following and check whether they are true or not. sqrt2 is a rational number or an irrational number.

The 10th term of (3-sqrt((17)/4+3sqrt(2)))^(20) is (a) a irrational number (b) a rational number (c) a positive integer (d) a negative integer

The number of irrational numbers in between any two irrational numbers is

Prove that number (log)_2 7 is an irrational number.

Prove the following by contradiction : "The sum of a rational and irrational number is an irrational number ."