(i) If x – 1 is a factor of polynomial p (x) = x² + x + k, then

p (1) = 0

(1)² + 1+ k = 0

2 + k = 0

k = -2

Therefore, value of k is -2

(ii) If x – 1 is a factor of polynomial p (x) = 2x² + kx + , then

p (1) = 0

2(1)² + k (1) + = 0

2 + k + = 0

k = -2 -

= - (2 + )

Therefore, value of k is – (2 + )

(iii) If x – 1 is a factor of given polynomial p(x) = kx² - x + 1, then

p (1) = 0

k (1)² - (1) + 1 = 0

k - + 1 = 0

k = - 1

Therefore, value of k is √2 – 1

(iv) If x – 1 is a factor of the given polynomial p(x) = kx² – 3x + k, then

p (1) = 0

k(1)² + 3(1) + k = 0

k – 3 + k = 0

2k – 3 = 0

k =

Therefore, value of k is