The numbers 1,4,16 can be three terms ( not necessarily consecutive ) of `:`

Let x,y,z be three positive prime numbers. The progression in which sqrt( x) , sqrt( y ) , sqrt( z) can be three terms ( not necessarily consecutive ) is :

Atomic mass of an element is not necessarily a whole number because :

Statement 1 4,8,16, are in GP and 12,16,24 are in HP. Statement 2 If middle term is added in three consecutive terms of a GP, resultant will be in HP.

Statement-1: The smallest positive integer n such that n! can be expressed as a product of n-3 consecutive integers, is 6. Statement-2: Product of three consecutive integers is divisible by 6.

If a,b,c are three consevutive terms of an AP and x,y,z are three consecutive terms of a GP, then the value of X^(b-c).Y^(c-a). Z^(a-b) is

A number x is selected at random from the numbers 1,2,3, and 4. another number y is selected at random from numbers 1,4,9, and 16. find the probability that product of x and y is less than 16.

If the lines y=4-3 x, a y=x+10 and 2 y+b x+9=0 represent the three consecutive sides of a rectangle, then a b=

If a, b, c are three consecutive terms of an A.P. and x,y,z are three consecutive terms of a G.P., then the value of x^(b-c).y^(c-a).Z^(a-b) is

In a class of 10 students there are 3 girls. The number of ways they can be arranged in a row, so that no 2 girls are consecutive is k .8 ! , where k=

What is the common difference between the consecutive terms of an A.P.