Home
Class 12
MATHS
Let a, n in N such that a ge n^(3). Then...

Let `a, n in N` such that `a ge n^(3)`. Then `root3(a+1)-root3(a)` is always

A

less than `(1)/(3n^(2))`

B

less than `(1)/(2n^(3))`

C

more than `(1)/(n^(3))`

D

more than `(1)/(4n^(2))`

Text Solution

Verified by Experts

The correct Answer is:
A
Let `f(x)=x^(1//3)`
`rArr" "f'(x)=(1)/(3x^(2//3))`
Applying LMVT in `[a,a+1]`, we get one ` cin (a,a+1)`
`f'(c)=(f(a+1)-f(a))/(a+1-a)`
`rArr" "root3(a+1)-root3a=(1)/(3c^(2//3))lt(1)/(3c^(2//3))lt(1)/(3n^(2))`
`rArr" "root3(a+1)-root3alt(1)/(3n^(2))AA a ge n^(3)`
Promotional Banner

Topper's Solved these Questions

  • APPLICATIONS OF DERIVATIVES

    CENGAGE PUBLICATION|Exercise Multiple Correct Answer Type|8 Videos

  • APPLICATIONS OF DERIVATIVES

    CENGAGE PUBLICATION|Exercise Comprehension Type|5 Videos

  • APPLICATION OF INTEGRALS

    CENGAGE PUBLICATION|Exercise All Questions|143 Videos

  • AREA

    CENGAGE PUBLICATION|Exercise Comprehension Type|2 Videos

Similar Questions

Explore conceptually related problems

For every natural number n, show that 7^(2n)+2^(3n-3)*3^(n-1) is always divisible by 25.

If n is natural number & n ge 1, then (3^(2n) - 1) is always divisible by

Let n=3^(100) , then for n

If Aa n dB are two events such that P(A)=1/2a n dP(B)=2/3 . Then show that P(A U B) ge 2/3 .

If n is a natural number, then (4^(n) -3n -1) is always divisible by-

If n in N,then prove by mathematical induction that 7^(2n)+2^3(n-1).3^(n-1) is always a multipe of 25.

If for all ninNN and nge1 , then (3^(2^(n))-1) is always divisible by

Let {a_n}(ngeq1) be a sequence such that a_1=1,a n d3a_(n+1)-3a_n=1 for all ngeq1. Then find the value of a_(2002.)

lim_(nrarroo) (1-x+x.root n e)^(n) is equal to

show that lim_(nrarr0)(root(3)(n+1)-1)/n=1/3