Let `a_1,a_2,a_3,...` be in A.P. With `a_6=2.` Then the common difference of the A.P. Which maximises the product `a_1a_4a_5` is :

If an A.P a_6 = 2 then common difference for which a_1.a_3.a_6 is least is

Let a_1,a_2,a_3…… ,a_n be in G.P such that 3a_1+7a_2 +3a_3-4a_5=0 Then common ratio of G.P can be

If a_1, a_2, a_3,...a_20 are A.M's inserted between 13 and 67 then the maximum value of the product a_1 a_2 a_3...a_20 is

Let a_1,a_2,....a11 are in incresing A.P.and if varience of these number is 90 then value of common difference of A.P. is.

If a_1, a_2, a_3,...a_n are in A.P with common difference d !=0 then the value of sind(coseca_1 coseca_2 +cosec a_2 cosec a_3+...+cosec a_(n-1) cosec a_n) will be

If a_1,a_2,a_3,...,a_n be in AP whose common difference is d then prove that sum_(i=1)^n a_ia_(i+1)=n{a_1^2+na_1d+(n^2-1)/3 d^2} .

We know that, if a_1, a_2, ..., a_n are in H.P. then 1/a_1,1/a_2,.....,1/a_n are in A.P. and vice versa. If a_1, a_2, ..., a_n are in A.P. with common difference d, then for any b (>0), the numbers b^(a_1),b^(a_2),b^9a_3),........,b^(a_n) are in G.P. with common ratio b^d. If a_1, a_2, ..., a_n are positive and in G.P. with common ration, then for any base b (b> 0), log_b a_1 , log_b a_2,...., log_b a_n are in A.P. with common difference logor.If x, y, z are respectively the pth, qth and the rth terms of an A.P., as well as of a G.P., then x^(z-x),z^(x-y) is equal to

Positive integers a_1, a_2, ........ form an A.P. If a_1, = 10 and a_(a_2), =100, then(A) common difference of A.P. is equal to 6. (B) The value of a_3, is equal to 20.(C) The value of a_22, is equal to 136. (D) The value of a_(a_3), is equal to 820.