If k + 2 , 4k - 6 , 3k- 2 are the consecutive terms of an A.P then the value of k is ………………….

If k + 2 ,4k - 6, 3k - 2 are the 3 consecutive terms of an A.P, then the value of k i s ......

If k + 2, 4K - 6, 3K - 2 are the 3 consecutive terms of an A,P, then value of K is ……..

If a , b , c are consecutive positive integers and (log(1+a c)=2K , then the value of K is logb (b) loga (c) 2 (d) 1

If -5, k, -1 are in A.P., then the value of k is equal to

If -i+3 is a root of x^(2)-6x+k=0 . Then the value of k is :

Find the sum to n terms of the A.P., whose k^("th") term is 5k + 1.

If the points (7,-2) (3,-6) and (5,k) are collinear then the value of k is :

If p,q and r ( pneq ) are terms ( not necessarily consecutive) of an A.P., then prove that there exists a rational number k such that (r-q)/(q-p) =k. hence, prove that the numbers sqrt2,sqrt3 and sqrt5 cannot be the terms of a single A.P. with non-zero common difference.

The frequency distribution is given below. {:(x,k,2k,3k,4k,5k,6k),(f,2,1,1,1,1,1):} In the table, k is a positive integer, has a varience of 160. Determine the value of k.

The frequency distribution is given below. {:(x,k,2k,3k,4k,5k,6k),(f,2,1,1,1,1,1):} In the table, k is a positive integer, has a varience of 160. Determine the value of k.