In the formulae S(n)=(n)/(2){2a+(n-1)d} ...

In the formulae `S_(n)=(n)/(2){2a+(n-1)d}` make d as the subject
The following steps are involved in solving the above problem. Arrange them in sequential order.
(A) `(n-1)d=(2S_(n))/(n)-2a`
(B) Given, `S_(n)=(n)/(2)[2a+(n-1)d]rArrn[2a+(n-1)d]`
=`2S_(n)`
(C) `rArr d=(2)/(n-1)[(S_(n))/(n)-a]`
(D) `2a+(n-1)d=(2S_(n))/(n)`

Similar Questions

Explore conceptually related problems

In the formula S=(n)/(2)[2a+(n-1)d] , make a as the subject of the formula.

(a) In the formula S_(n)=(n)/(2){2a+(n-1)d} , make d as the subject. (b) Find the value of d, when S_(n)=240,n=10, and a=6 .

a+(a+d)+(a+2d)+....+[a+(n-1)d]=(n)/(2)(2a+(n-1)d)

The arithmetic mean of 1,2,3,...n is (a) (n+1)/(2) (b) (n-1)/(2) (c) (n)/(2)(d)(n)/(2)+1

Prove the following by the principle of mathematical induction: a+(a+d)+(a+2d)++(a+(n-1)d)=(n)/(2)[2a+(n-1)d]

Explain the terms in the formula. S_(n) = n/2 [2a+(n-1)d] .

The common difference of an A.P., the sum of whose n terms is S_n , is (a) S_n-2S_(n-1)+S_(n-2) (b) S_n-2S_(n-1)-S_(n-2) (c) S_n-S_(n-2) (d) S_n-S_(n-1)

Similar Questions

Recommended Questions