Let P ( x ) be quadratic polynomial with real coefficients such that for all real x the relation 2(1+ P ( x ))= P ( x -1)+ P ( x +1) holds. If P (0)=8 and P (2)=32 then Sum of all the coefficients of P(x) is

Question

Let P ( x ) be quadratic polynomial with real coefficients such that for all real x the relation 2(1+ P ( x ))= P ( x -1)+ P ( x +1) holds. If P (0)=8 and P (2)=32 then Sum of all the coefficients of P(x) is (A) 20 (B) 19 (C) 17 (D) 15

Tardigrade Admin · Accepted Answer

Put x=1 in 2(1+P(x))=P(x-1)+P(x+1) 2(1+ P (1))= P (0)+ P (2) ⇒ 2+2 P (1)=8+32 ⇒ 2 P (1)=38 ⇒ P (1)=19 hence sum of all the coefficient is 19

Q. Let $P (x)$ be quadratic polynomial with real coefficients such that for all real $x$ the relation $2 (1 + P (x)) = P (x - 1) + P (x + 1)$ holds. If $P (0) = 8$ and $P (2) = 32$ then
Sum of all the coefficients of $P (x)$ is

20

19

17

15

Put $x = 1$ in $2 (1 + P (x)) = P (x - 1) + P (x + 1)$
$2 (1 + P (1)) = P (0) + P (2) \Rightarrow 2 + 2 P (1) = 8 + 32 \Rightarrow 2 P (1) = 38 \Rightarrow P (1) = 19$
hence sum of all the coefficient is 19

Q. Let P(x) be quadratic polynomial with real coefficients such that for all real x the relation 2(1+P(x))=P(x−1)+P(x+1) holds. If P(0)=8 and P(2)=32 then Sum of all the coefficients of P(x) is

20

19

17

15

Put x=1 in 2(1+P(x))=P(x−1)+P(x+1) 2(1+P(1))=P(0)+P(2)⇒2+2P(1)=8+32⇒2P(1)=38⇒P(1)=19 hence sum of all the coefficient is 19

Q. Let $P (x)$ be quadratic polynomial with real coefficients such that for all real $x$ the relation $2 (1 + P (x)) = P (x - 1) + P (x + 1)$ holds. If $P (0) = 8$ and $P (2) = 32$ then
Sum of all the coefficients of $P (x)$ is

Put $x = 1$ in $2 (1 + P (x)) = P (x - 1) + P (x + 1)$
$2 (1 + P (1)) = P (0) + P (2) \Rightarrow 2 + 2 P (1) = 8 + 32 \Rightarrow 2 P (1) = 38 \Rightarrow P (1) = 19$
hence sum of all the coefficient is 19