If x(1), x(2) and x(3) are the positive ...

If `x_(1)`, `x_(2)` and `x_(3)` are the positive roots of the equation `x^(3)-6x^(2)+3px-2p=0`, `pinR`, then the value of `sin^(-1)((1)/(x_(1))+(1)/(x_(2)))+cos^(-1)((1)/(x_(2))+(1)/(x_(3)))-tan^(-1)((1)/(x_(3))+(1)/(x_(1)))` is equal to

`(pi)/(4)`

`(pi)/(2)`

`(3pi)/(4)`

`pi`

Text Solution

Verified by Experts

The correct Answer is:

`(a)` `x^(3)-6x^(2)+3px-2p=0`
`A.M.=(x_(1)+x_(2)+x_(3))/(3)=(6)/(3)=2`
`H.M.=(3)/((1)/(x_(1))+(1)/(x_(2))+(1)/(x_(3)))=(3x_(1)x_(2)x_(3))/(sumx_(1)x_(2))=2`
`:, A.M.=H.M.impliesx_(1)=x_(2)=x_(3)=2`
`sin^(-1)((1)/(x_(1))+(1)/(x_(2)))+cos^(-1)((1)/(x_(2))+(1)/(x_(3)))-tan^(-1)((1)/(x_(3))+(1)/(x_(1)))`
`=(pi)/(2)+0-(pi)/(4)=(pi)/(4)`

Topper's Solved these Questions

INEQUALITIES INVOLVING MEANS
CENGAGE|Exercise Comprehension|2 Videos
INEQUALITIES INVOLVING MEANS
CENGAGE|Exercise Examples|37 Videos
INEQUALITIES AND MODULUS
CENGAGE|Exercise Single correct Answer|21 Videos
INTEGRALS
CENGAGE|Exercise Solved Examples And Exercises|324 Videos

Similar Questions

Explore conceptually related problems

If x_1, x_2, and x_3 , are the positive roots of the equation x^3 - 6x^2 +3px -2p=0 , p in R then the value of sin^-1(1/x_1+1/x_2)+cos^-1(1/x_2+1/x_3)-tan^-1(1/x_3+1/x_1)

Solve 3sin^(-1)((2x)/(1+x^(2)))-4cos^(-1)((1-x^(2))/(1+x^(2)))+2tan^(-1)((2x)/(1-x^(2)))=(pi)/(3)

If x_(1),x_(2),x_(3) are the roots of the equation x^(3)-3px^(2)+3qx-1=0 then find the centroid of the co-ordinates of whose vertices are (x_(1),(1)/(x_(1)))(x_(2),(1)/(x_(2))) and (x_(3),(1)/(x_(3)))

If x^(4) - 3x^(2) - 1 = 0 , then the value of (x^(6)-3x^(2)+(3)/(x^(2))-(1)/(x^(6))+1) is :

If x_(1),x_(2),x_(3) are the roots of the equation x^(3)-3px^(2)+3qx-1=0 then find the centroid of the /_ the co-ordinates of whose vertices are (x_(1),(1)/(x_(1))),(x_(2),(1)/(x_(2))) and (x_(3),(1)/(x_(3)))

let x_(1),x_(2),x_(3) be the roots of equation x^(3)+3x+5=0 what is the value of the expression (x_(1)+(1)/(x_(1)))(x_(2)+(1)/(x_(2)))(x_(3)+(1)/(x_(3)))=?

Solve cot^(-1) ((3x^(2) + 1)/(x)) = cot^(-1) ((1 - 3x^(2))/(x)) - tan^(-1) 6x

CENGAGE-INEQUALITIES INVOLVING MEANS -Exercise (Numerical) & JEE Previous Year

If x(1), x(2) and x(3) are the positive roots of the equation x^(3)-6x...
Text Solution
|
For xge 0 , the smallest value of the function f(x)=(4x^2+8x+13)/(6(1+...
Text Solution
|
Let x^2-3x+p=0 has two positive roots a and b, the minimum value of ((...
Text Solution
|
If x,y,and z are positive real numbers and x=(12-yz)/(y+z). The maximu...
Text Solution
|
If a,b, and c are positive and 9a+3b+c=90, then the maximum value of (...
Text Solution
|
Given that x,y,z are positive reals such that xyz=32 . The minimum val...
Text Solution
|
If x,y,in R^(+) satisfying x+y=3, then the maximum value of x^2y is .
Text Solution
|
For any x,y, in R,xygt0 . Then the minimum value of (2x)/(y^3)+(x^3y)/...
Text Solution
|
Let a,b,c,d and e be positive real numbers such that a+b+c+d+e=15 and ...
Text Solution
|
Consider the system of equations x1+x(2)^(2)+x(3)^(3)+x(4)^(4)+x(5)^(5...
Text Solution
|
The least value of a in RR for which 4ax^2+1/x >= 1, for all x > 0, ...
Text Solution
|
The minimum value of the sum of real number a^(-5),a^(-4),3a^(-3),1,a^...
Text Solution
|