Question

Using the remainder theorem, find the remainders obtained when x³ + (kx + 8 )x + k is divided by x + 1 and x − 2. 

Hence, find k if the sum of the two remainders is 1.

Answer 1

Remainder theorem :
Dividend = Divisors ×  Quotient + Remainder

∴ Let f(x) = x³ + (kx + 8 )x + k

= x³ + kx² + 8x + k

Dividing f(x) by x + 1 gives remainder as  R₁

∴ f (−1) = R₁ 

Also, f(2) = R₂

∴ f (−1) = (−1)³ + k(−1)² + 8(−1) + k

= −1 + k − 8 + k

= 2k − 9 = R₁

f(2) = (2)³ + k (2)² + 8(2) + k

= 8 + 4k + 16 + k

= 5k + 24 = R₂

Also,Sum of remainders = R₁ + R₂ = 1

∴ (2k − 9) + (5k +24) = 1 

7k + 15 = 1

7k = −14 

k = −2