If α , β are the roots of equation 8x2-3x+27=0 , then the value of ( (α 2/β ) )1/3+( (β 2/α ) )1/3 is

Question

If α , β are the roots of equation 8x2-3x+27=0 , then the value of ( (α 2/β ) )1/3+( (β 2/α ) )1/3 is (A)  (1/3)  (B)  (1/4)  (C)  (7/2)  (D)  4

Tardigrade Admin · Accepted Answer

Since, α , β are the roots of the equation 8x2-3x+27=0 ∴ α +β =( -(3/8) )=(3/8) α β =(27/8)=( (3/2) )3 Now, ( (α 2/β ) )1/3+( (β 2/α ) )1/3 =(α 2/3⋅ α 1/3+β 2/3⋅ β 1/3/(α β )1/3) =(α +β /(α β )1/3) =((3/8)/( (27)8 )1/3)=(3/8)⋅ (2/3)=(1/4)

Q. If $α, β$ are the roots of equation $8 x^{2} - 3 x + 27 = 0$ , then the value of $(\frac{α ^{2}}{β})^{1/3} + (\frac{β ^{2}}{α})^{1/3}$ is

$\frac{1}{3}$

$\frac{1}{4}$

$\frac{7}{2}$

$4$

Q. If α,β are the roots of equation 8x2−3x+27=0 , then the value of (βα2​)1/3+(αβ2​)1/3 is

31​

41​

27​

4

Since, α,β are the roots of the equation 8x2−3x+27=0 ∴ α+β=(−83​)=83​ αβ=827​=(23​)3 Now, (βα2​)1/3+(αβ2​)1/3 =(αβ)1/3α2/3⋅α1/3+β2/3⋅β1/3​ =(αβ)1/3α+β​ =(827​)1/383​​=83​⋅32​=41​

Q. If $α, β$ are the roots of equation $8 x^{2} - 3 x + 27 = 0$ , then the value of $(\frac{α ^{2}}{β})^{1/3} + (\frac{β ^{2}}{α})^{1/3}$ is

$\frac{1}{3}$

$\frac{1}{4}$

$\frac{7}{2}$

$4$