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Question

Solve 1,2,3 :

Q. LINKED COMPREHENSION TYPE

Read the following write up carefully and answer the following questions :

α and β are the roots of the equation ax2 + bx + c = 0 and α4,β4 are the roots of the equation lx2 + mx + n = 0 (α , β are real and distinct ). Let f (x) = a2 lx2 – 4aclx + 2c2l + a2m = 0, then

1. Roots of f (x) = 0 are

(A) real and same in sign (B) real and opposite in sign

(C) equal (D) data is insufficient


2. One root of the f(x) = o is

(A) a2b2 (B) ​b2a2

(C) b/a (D) a/b


3. If α3 + β3 = 0 (b 0) , then

(A) a, b, c, are in G. P. (B) 2a , b, c are in G. P.

(C) 3a, b, c are in G.P. (D) 4a , b, c are in G. P.

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Solution

Dear student


NOTE: If px2+qx+r is a quadratic equations.Then Sum of roots=-Coeff. of xCoeff. of x2=-qpand product of roots=Constant termCoeff. of x2=rpQue 1Since α and β are the roots of ax2+bx+c=0.Then α+β=-baand αβ=ca ....(1)Also, α4 and β4 are the roots of lx2+mx+n=0Then α4+β4=-ml ...(2)and α4β4=nlNow, Consider,f(x)=a2lx2-4aclx+2c2l+a2m=0Then x=4acl±4acl2-4a2l2c2l+a2m2a2lx=4acl±16a2c2l2-8a2c2l2-4a4lm2a2lx=4acl±8a2c2l2-4a4lm2a2lx=4acl±2al2c2-a2ml2a2lx=2ca±1a2c2a2a2-a2mlx=2ca±aa2c2a2-mlx=2αβ±2α2β2+α4+β4 using 1 and 2x=2αβ±α2+β22x=2αβ±α2+β2
x=2αβ±α+β2-2αβ x+y2=x2+y2+2xyx=2αβ+α+β2-2αβ or x=2αβ-α+β2-2αβSo, f(x) has real and opposite in sign roots because α and β are real and distinct.
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