By giving a counter example, show that the following statement is false. If n is an odd integer, then n is prime.

By giving a counter example, show that the following statement is false. "If n is an odd positive integer, then n is prime."

By giving an example,show that the following statement is false.If n is an odd integer,then n is prime

By giving counter example , show that the following statements are not true : (I) In n is an odd integer, then n is prime. (ii) The equation x^(2) - 4 =0 does not a root lying between 0 and 3.

By giving a counter example, show that the following statement are not true : If n is an even integer, then n is not prime.

By giving a counter example , show that the following statements are false (i) If sqrtp is an irrational number then p is prime number (ii) Square of every rational number is greater than the number itself (iii) If all the angles of a quadrilateral is equal then it is regular

By giving a counter-example, show that the following statement is false: p: If all the sides of a triangle are equal, then the triangle is obtuse angled.

By giving a counter example,show that the following statement is not true: p: if all the angles of a triangle are equal,then the triangle is an obtuse angled triangle.

By giving a counter example, show that the following statement is not true. p : The equation x^(2) -1=0 does not have a root lying between 0 and 2.

By giving counter example show that following statement are false (a) p : Square of a real number is always integer (b) p : The equation x^2-9=0 does not have a root lying between 0 and 4

By giving a counter example, show that the following statement are not true : The equation x^(2) - 4 = 0 does not have a root lying between 0 and 3.