Let R₁ and R₂ are the remainders when polynomials x³ + 2x² – 5ax – 7 and x³ + ax² – 12x + 6 are divided by (x + 1) and (x – 2) respectively. If 2R₁ + R₂ = 6, find value of a.

Concept Used:

Remainder theorem: If a polynomial f(x) is divided by (x – a) then f(a) will give the remainder.

Explanation:

Let f(x) = x³ + 2x² – 5ax – 7

And g(x) = x³ + ax² – 12x + 6

Now, f(–1) = R₁ and g(2) = R₂

Therefore,

f(–1) = (–1)³ + 2(–1)² – 5a(–1) – 7

f(–1) = –1 + 2 + 5a – 7

f(–1) = 5a – 6

And,

g(2) = (2)³ + a(2)² – 12.2 + 6

g(2) = 8 + 4a – 24 + 6

g(2) = 4a – 10

It is given that,

2R₁ + R₂ = 6

2(5a – 6) + 4a – 10 = 6

10a – 12 + 4a – 10 = 6

14a – 22 = 6

14a = 28

a = 2

Hence, the value of a is 2.