Let r quantities be in an A.P. with comm...

Let r quantities be in an A.P. with common difference 'a'. The A.M. of squares of these quantitiesa exceed the square of A.M. of these quantities by 'k' and, `(a(r+1))/(3k)=lambda/(a(r-1)),` then `lambda` is

Similar Questions

Explore conceptually related problems

Let n quantities be in A.P.d being the common difference.Let the arithmetic mean of the squares of these quantities exceed the square of the arithmetic mean of these quantities by a quantity p.Then p

Let n quantities be in A.P., d being the common difference. Let the arithmetic mean of the squares of these quantities exceed the square of the arithmetic mean of these quantities by a quantity p. Then p

In a Delta ABC if r+r_(1)+r_(2)-r_(3)=lambda^(2)R cos C then lambda is

The A.M. of two integral numbers exceeds their G.M. by 2 and the ratio of the numbers is 1 : 4. Find them.

We are given an A.P. with 1st term a and common difference d. If each of its terms is increased by the same quantity k, is the resulting progression also an A.P. ? If so, find its common difference.

If there be m quantities in a G.P. whose common ratio is r and S_(m) denote the sum of first m terms, prove that the sum of their products taken two and two together is (r)/(r+1)*S_(m)*S_(m-1) .

If the A.M. between two positive numbers exceeds their G.M. by 2 and the ratio of the numbers be 1: 4 find the numbers .

Let r quantities be in an A.P. with common difference 'a'. The A.M. of squares of these quantitiesa exceed the square of A.M. of these quantities by 'k' and, `(a(r+1))/(3k)=lambda/(a(r-1)),` then `lambda` is

Similar Questions

Recommended Questions