If the equation a(x-1)2+b(x2-3 x+2)+x-a2=0 is satisfied for all x ∈ R then the number of ordered pairs of (a, b) can be

Question

If the equation a(x-1)2+b(x2-3 x+2)+x-a2=0 is satisfied for all x ∈ R then the number of ordered pairs of (a, b) can be (A) 0 (B) 1 (C) 2 (D) infinite

Tardigrade Admin · Accepted Answer

Equation is an identity ⇒ coefficient of x2=0= coefficient of x= constant term ∴ a+b=0 ......(1) - 2a - 3b + 1 = 0 ....(2) and a+2 b-a2=0....(3) from (1) and (2) a=-1 and b=1 which also satisfies (3) ⇒ (a, b)=(-1,1) ⇒(B)

Q. If the equation a(x−1)2+b(x2−3x+2)+x−a2=0 is satisfied for all x∈R then the number of ordered pairs of (a,b) can be

0

1

2

infinite

Equation is an identity ⇒ coefficient of x2=0= coefficient of x= constant term ∴a+b=0 ......(1) −2a−3b+1=0 ....(2) and a+2b−a2=0....(3) from (1) and (2) a=−1 and b=1 which also satisfies (3)⇒(a,b)=(−1,1)⇒(B)

Q. If the equation $a (x - 1)^{2} + b (x^{2} - 3 x + 2) + x - a^{2} = 0$ is satisfied for all $x \in R$ then the number of ordered pairs of $(a, b)$ can be