AM, GM, HM denote the Arithmetic mean, G...

AM, GM, HM denote the Arithmetic mean, Geometric mean and Harmonic mean respectively the relationship between this is:

`AM lt GM lt HM`

`AM le GM le HM`

`AM gt GM gt HM`

`AM ge GM ge HM`

Text Solution

Verified by Experts

The correct Answer is:

Topper's Solved these Questions

BINOMIAL THEOREMN,SEQUENCES AND SERIES
PREMIERS PUBLISHERS|Exercise PROBLEMS FOR PRACTICE(Answer the following questions)|15 Videos
BASIC ALGEBRA
PREMIERS PUBLISHERS|Exercise PROBLEMS FOR PRACTICE I -Choose the correct option for the following(MCQ)|37 Videos
COMBINATORICS AND MATHEMATICAL INDUCTION
PREMIERS PUBLISHERS|Exercise PROBLEMS FOR PRACTICE (Choose the correct option for the following)|34 Videos

Similar Questions

Explore conceptually related problems

Let A_1 , G_1, H_1 denote the arithmetic, geometric and harmonic means respectively, of two distinct positive numbers. For n >2, let A_(n-1),G_(n-1) and H_(n-1) has arithmetic, geometric and harmonic means as A_n, G_N, H_N, respectively.

Let n in N ,n > 25. Let A ,G ,H deonote te arithmetic mean, geometric mean, and harmonic mean of 25 and ndot The least value of n for which A ,G ,H in {25 , 26 , n} is a. 49 b. 81 c.169 d. 225

Insert 6 Arithmetic Means between 3 and 24.

If A_1, A_2, G_1, G_2, ; a n dH_1, H_2 are two arithmetic, geometric and harmonic means respectively, between two quantities aa n db ,t h e na b is equal to

Find the Arithmetic mean of the following data

Let A;G;H be the arithmetic; geometric and harmonic means between three given no. a;b;c then the equation having a;b;c as its root is x^3-3Ax^2+3G^3/H x-G^3=0

Insert three Geometric means between 1 and 256.

If a is the arithmetic mean and g is the geometric mean of two numbers, then

PREMIERS PUBLISHERS-BINOMIAL THEOREMN,SEQUENCES AND SERIES -PROBLEMS FOR PRACTICE(Choose the correct option for the following)

match the following
Text Solution
|
Find the odd man out: For any two positive integers:
Text Solution
|
AM, GM, HM denote the arithmetic, geometric and harmonic means of a an...
Text Solution
|
Find the odd man out in the following:
Text Solution
|
Find the correct statement:
Text Solution
|
Find the correct statement:
Text Solution
|
Find the incorrect statement:
Text Solution
|
Assertion (A): In the expansion of (a +b)^(n) n in N the coefficient a...
Text Solution
|
Assertion: If a and b are distinct integers then (a - b) is a factor ...
Text Solution
|
With usual notation C(0) + C(2) + C(4) + ... is:
Text Solution
|
In the expansion of (2x + 3)^(5) the coefficient of x^(2) is:
Text Solution
|
In the expansion of (I + x)^(22) which term is the middle term:
Text Solution
|
AM, GM, HM denote the Arithmetic mean, Geometric mean and Harmonic mea...
Text Solution
|
The sum of the first n terms of the series 1/(sqrt(2) + sqrt(5)) + 1/(...
Text Solution
|
The sum of series 1 + 2x + 3x^(2) + 4x^(3) + ...... up to infinity whe...
Text Solution
|
1/(1!) + 1/(3!) + 1/(5!) + … is.
Text Solution
|
sqrt((1-2x)/(1+2x)) is approximately equal to:
Text Solution
|
Expansion of log(sqrt((1+x)/(1-x))) is :
Text Solution
|
The value of 1- 1/2(3/4) + 1/3(3/4)^(2) -1/4(3/4)^(3) + ... is:
Text Solution
|
Coefficient of x^(2) in (x^(2) + 1/x)^(6) is 1 (ii)1,4, 7 are in H.P...
Text Solution
|