Home
Class 12
MATHS
The value of x, for which the ninth term...

The value of x, for which the ninth term in the
expansion of `{sqrt(10)/((sqrt(x))^(5log _(10)x ))+ x.x^(1/(2log_(10)x))}^(10)`
is 450 is equal to

A

10

B

`10^(2)`

C

`sqrt(10)`

D

`10^(-2//5)`

Text Solution

Verified by Experts

The correct Answer is:
b, d
Let `log_(10 )x =lambda rArr x = 10^(lambda) `
Given, `T_(9) =450`
`rArr ""^(10)C_(8) cdot (sqrt(10)/(10^(5(lambda^(2))/2)))^(2) cdot (10^(lambda) cdot10^(1//2))^(8) = 450`
`rArr ""^(10)C_(2)cdot 10/(10^(5lambda^(2))) cdot 10 ^(8^(lambda)) cdot 10^(4) = 450`
`rArr 18 ^(8lambda +4-5lambda^(2))=1=10^(0)`
`rArr 8 lambda + 4 - 5 lambda ^(2) = 0`
`rArr 5lambda^(2) - 8 lambda - 4 = 0 `
` rArr lambda = 2, -2 //5`
`rArr x= 10^(2), 10^(-2//5)` [ from Eq. (i)]
Promotional Banner

Similar Questions

Explore conceptually related problems

Find the general term in the expansion of (x+3y)^(10)

Find the middle terms in the expansions of (x/3 + 9Y)^10 .

((log)_(10)(x-3))/((log)_(10)(x^2-21))=1/2

Find the middle term (terms ) in the expansion of (x/a =a/x)^(10)

The real value of x for which the statement 2log_(10)x-log_(10)(2x-75)=2 is

The term of the term independent of x in the expansion of (sqrt(x/3)+3/(2x^(2)))^(10)" is " ..........

Find the number of terms in the expansion of the following : (x+2a)^(10)+(x-2a)^(10)

Find the domain of the function : f(x)=1/(sqrt((log)_(1/2)(x^2-7x+13)))

If the constant term in expansion of (sqrt(x)-k/(x^(2)))^(10) is 405 then find the value of k .

Find the domain of f(x)=sqrt((log)_(0. 4)((x-1)/(x+5)))